CFD ACI 318 14

User Manual: CFD-ACI-318-14

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Concrete Frame Design Manual
ACI 318-14

Concrete Frame
Design Manual
ACI 318-14
For SAP2000®

ISO SAP102816M24 Rev. 0
Proudly developed in the United States of America

October 2016

Copyright
Copyright  Computers & Structures, Inc., 1978-2016
All rights reserved.
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copyrighted products. Worldwide rights of ownership rest with Computers & Structures,
Inc. Unlicensed use of these programs or reproduction of documentation in any form,
without prior written authorization from Computers & Structures, Inc., is explicitly prohibited.
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or stored in a database or retrieval system, without the prior explicit written permission of
the publisher.
Further information and copies of this documentation may be obtained from:
Computers & Structures, Inc.
www.csiamerica.com
info@csiamerica.com (for general information)
support@csiamerica.com (for technical support)

DISCLAIMER
CONSIDERABLE TIME, EFFORT AND EXPENSE HAVE GONE INTO THE
DEVELOPMENT AND DOCUMENTATION OF THIS SOFTWARE. HOWEVER,
THE USER ACCEPTS AND UNDERSTANDS THAT NO WARRANTY IS
EXPRESSED OR IMPLIED BY THE DEVELOPERS OR THE DISTRIBUTORS ON
THE ACCURACY OR THE RELIABILITY OF THIS PRODUCT.
THIS PRODUCT IS A PRACTICAL AND POWERFUL TOOL FOR STRUCTURAL
DESIGN. HOWEVER, THE USER MUST EXPLICITLY UNDERSTAND THE BASIC
ASSUMPTIONS OF THE SOFTWARE MODELING, ANALYSIS, AND DESIGN
ALGORITHMS AND COMPENSATE FOR THE ASPECTS THAT ARE NOT
ADDRESSED.
THE INFORMATION PRODUCED BY THE SOFTWARE MUST BE CHECKED BY A
QUALIFIED AND EXPERIENCED ENGINEER. THE ENGINEER MUST
INDEPENDENTLY VERIFY THE RESULTS AND TAKE PROFESSIONAL
RESPONSIBILITY FOR THE INFORMATION THAT IS USED.

Contents

Chapter 1

Chapter 2

Introduction
1.1 Organization

1-2

1.2 Recommended Reading/Practice

1-3

Design Prerequisites
2.1 Design Load Combinations

2-1

2.2 Seismic Load Effects

2-3

2.3 Design and Check Stations

2-3

2.4 Identifying Beams and Columns

2-4

2.5 Design of Beams

2-4

2.6 Design of Columns

2-5

2.7 Design of Joints

2-6

Concrete Frame Design ACI 318-14

Chapter 3

2.8 P-Delta Effects

2-6

2.9 Element Unsupported Length

2-7

2.10 Choice of Input Units

2-7

Design Process
3.1 Notation

3-1

3.2 Design Load Combinations

3-4

3.3 Limits on Material Strength

3-6

3.4 Column Design

3-6

3.4.1
3.4.2
3.4.3
3.4.4

Generation of Biaxial Interaction Surface
Calculate Column Capacity Ratio
Required Reinforcing Area
Design Column Shear Reinforcement

3.5 Beam Design
3.5.1
3.5.2
3.5.3

Design Beam Flexural Reinforcement
Design Beam Shear Reinforcement
Design Beam Torsion Reinforcement

3.6 Joint Design
3.6.1
3.6.2
3.6.3
3.6.4

3-28
3-28
3-37
3-42
3-47

Determine the Panel Zone Shear Force
Determine the Effective Area of Joint
Check Panel Zone Shear Stress
Beam-Column Flexural Capacity Ratios

3-47
3-50
3-50
3-51

3.7 Summary of Special Considerations for Seismic
Design

3-53

Appendix A Second Order P-Delta Effects

3-7
3-12
3-16
3-17

Contents
Appendix B Member Unsupported Lengths and Computation of
K-Factors
Appendix C Concrete Frame Design Preferences
Appendix D Concrete Frame Overwrites
References

Chapter 1
Introduction

The design of concrete frames is seamlessly integrated within the program.
Initiation of the design process, along with control of various design parameters,
is accomplished using the Design menu.
Automated design at the object level is available for any one of a number of
user-selected design codes, as long as the structures have first been modeled and
analyzed by the program. Model and analysis data, such as material properties
and member forces, are recovered directly from the model database, and no
additional user input is required if the design defaults are acceptable.
The design is based on a set of user-specified loading combinations. However,
the program provides default load combinations for each design code supported.
If the default load combinations are acceptable, no definition of additional load
combinations is required.
In the design of columns, the program calculates the required longitudinal and
shear reinforcement. However, the user may specify the longitudinal steel, in
which case a column capacity ratio is reported. The column capacity ratio gives
an indication of the stress condition with respect to the capacity of the column.

1-1

Concrete Frame Design ACI 318-14
The biaxial column capacity check is based on the generation of consistent
three-dimensional interaction surfaces. It does not use any empirical formulations that extrapolate uniaxial interaction curves to approximate biaxial action.
Interaction surfaces are generated for user-specified column reinforcing configurations. The column configurations may be rectangular, square or circular,
with similar reinforcing patterns. The calculation of moment magnification
factors, unsupported lengths, and strength reduction factors is automated in the
algorithm.
Every beam member is designed for flexure, shear, and torsion at output stations
along the beam span.
All beam-column joints are investigated for existing shear conditions.
For special moment resisting frames (ductile frames), the shear design of the
columns, beams, and joints is based on the probable moment capacities of the
members. Also, the program will produce ratios of the beam moment capacities
with respect to the column moment capacities, to investigate weak beam/strong
column aspects, including the effects of axial force.
Output data can be presented graphically on the model, in tables for both input
and output data, or on the calculation sheet prepared for each member. For each
presentation method, the output is in a format that allows the engineer to quickly
study the stress conditions that exist in the structure and, in the event the member
reinforcing is not adequate, aids the engineer in taking appropriate remedial
measures, including altering the design member without rerunning the entire
analysis.

1.1

Organization
This manual is designed to help you quickly become productive with the
concrete frame design options of the ACI 318-14. Chapter 2 provides detailed
descriptions of the Deign Prerequisites used for the code. Chapter 3 provides
detailed descriptions of the code-specific process used for the code. The
appendices provide details on certain topics referenced in this manual.

1-2

Organization

Chapter 1 - Introduction

1.2

Recommended Reading/Practice
It is strongly recommended that you read this manual and review any applicable
“Watch & Learn” Series™ tutorials, which are found on our web site,
http://www.csiamerica.com, before attempting to design a concrete frame. Additional information can be found in the on-line Help facility available from
within the program’s main menu.

Recommended Reading/Practice

1-3

Chapter 2
Design Prerequisites

This chapter provides an overview of the basic assumptions, design preconditions, and some of the design parameters that affect the design of concrete
frames.
In writing this manual it has been assumed that the user has an engineering
background in the general area of structural reinforced concrete design and
familiarity with the ACI 318-14 code.

2.1

Design Load Combinations
The design load combinations are used for determining the various combinations of the load cases for which the structure needs to be designed/checked. The
load combination factors to be used vary with the selected design code. The load
combination factors are applied to the forces and moments obtained from the
associated load cases and are then summed to obtain the factored design forces
and moments for the load combination.
For multi-valued load combinations involving response spectrum, time history,
moving loads and multi-valued combinations (of type enveloping, square-root
of the sum of the squares or absolute) where any correspondence between interacting quantities is lost, the program automatically produces multiple sub

2-1

Concrete Frame Design ACI 318-14

combinations using maxima/minima permutations of interacting quantities.
Separate combinations with negative factors for response spectrum cases are not
required because the program automatically takes the minima to be the negative
of the maxima for response spectrum cases and the permutations just described
generate the required sub combinations.
When a design combination involves only a single multi-valued case of time
history or moving load, further options are available. The program has an option
to request that time history combinations produce sub combinations for each
time step of the time history. Also an option is available to request that moving
load combinations produce sub combinations using maxima and minima of each
design quantity but with corresponding values of interacting quantities.
For normal loading conditions involving static dead load, live load, snow load,
wind load, and earthquake load, or dynamic response spectrum earthquake load,
the program has built-in default loading combinations for each design code.
These are based on the code recommendations and are documented for each
code in the corresponding manuals.
For other loading conditions involving moving load, time history, pattern live
loads, separate consideration of roof live load, snow load, and so on, the user
must define design loading combinations either in lieu of or in addition to the
default design loading combinations.
The default load combinations assume all load cases declared as dead load to be
additive. Similarly, all cases declared as live load are assumed additive. However, each load case declared as wind or earthquake, or response spectrum cases,
is assumed to be non additive with each other and produces multiple lateral load
combinations. Also wind and static earthquake cases produce separate loading
combinations with the sense (positive or negative) reversed. If these conditions
are not correct, the user must provide the appropriate design combinations.
The default load combinations are included in design if the user requests them to
be included or if no other user-defined combination is available for concrete
design. If any default combination is included in design, all default combinations
will automatically be updated by the program any time the design code is
changed or if static or response spectrum load cases are modified.

2-2

Design Load Combinations

Chapter 2 - Design Prerequisites

Live load reduction factors can be applied to the member forces of the live load
case on an element-by-element basis to reduce the contribution of the live load
to the factored loading.
The user is cautioned that if moving load or time history results are not requested
to be recovered in the analysis for some or all of the frame members, the effects
of those loads will be assumed to be zero in any combination that includes them.

2.2

Seismic Load Effects
IBC 2012 requires that all structural element design resists earthquake motions
in accordance with ASCE 7-10 (IBC 1605.1). The software allows users to activate Special seismic load effects using appropriate commands on the Define
menu. The special seismic loads are computed in accordance with ASCE 7-10
sections 12.3.4 and 12.4.
The reliability factor, ρ , and DL multiplier are automatically applied to all
program default design combinations when the ACI 318-14 code is selected.
The DL multiplier represents the 0.2SDS factor in Equation 12.4-4 of ASCE
7-10. When seismic load E is combined with the effects of other loads, the following load combination shall be used in lieu of the seismic load combinations
in section 5.3.1 of the code.
(0.9 - 0.2SDS) D ± ρ E
(1.2 + 0.2SDS) D + 1.0L ± ρ E
(1.2 + 0.2SDS) D + 1.0L + 0.2S ± ρ E

2.3

(ASCE 7-10 12.4.2.3)
(ASCE 7-10 12.4.2.3)
(ASCE 7-10 12.4.2.3)

Design and Check Stations
For each load combination, each element is designed or checked at a number of
locations along the length of the element. The locations are based on equally
spaced segments along the clear length of the element. The number of segments
in an element is requested by the user before the analysis is performed. The user
can refine the design along the length of an element by requesting more segments.
When using the ACI 318-14 design code, requirements for joint design at the
beam-to-column connections are evaluated at the top most station of each

Seismic Load Effects

2-3

Concrete Frame Design ACI 318-14

column. The program also performs a joint shear analysis at the same station to
determine if special considerations are required in any of the joint panel zones.
The ratio of the beam flexural capacities with respect to the column flexural
capacities considering axial force effect associated with the weakbeam/strong-column aspect of any beam/column intersection are reported.

2.4

Identifying Beams and Columns
In the program, all beams and columns are represented as frame elements, but
design of beams and columns requires separate treatment. Identification for a
concrete element is accomplished by specifying the frame section assigned to
the element to be of type beam or column. If any brace element exists in the
frame, the brace element also would be identified as a beam or a column element, depending on the section assigned to the brace element.

2.5

Design of Beams
In the design of concrete beams, in general, the program calculates and reports
the required areas of steel for flexure and shear based on the beam moments,
shears, load combination factors, and other criteria, which are described in detail
in the code-specific manuals. The reinforcement requirements are calculated at a
user-defined number of stations along the beam span.
All beams are designed for major direction flexure, shear, and torsion only.
Effects caused by any axial forces and minor direction bending that may exist in
the beams must be investigated independently by the user.
In designing the flexural reinforcement for the major moment at a particular
section of a particular beam, the steps involve the determination of the maximum
factored moments and the determination of the reinforcing steel. The beam
section is designed for the maximum positive and maximum negative factored
moment envelopes obtained from all of the load combinations. Negative beam
moments produce top steel. In such cases, the beam is always
designed as a Rectangular section. Positive beam moments produce bottom
steel. In such cases, the beam may be designed as a Rectangular beam or a
T-beam. For the design of flexural reinforcement, the beam is first designed as a
singly reinforced beam. If the beam section is not adequate, the required compression reinforcement is calculated.

2-4

Identifying Beams and Columns

Chapter 2 - Design Prerequisites

In designing the shear reinforcement for a particular beam for a particular set of
loading combinations at a particular station associated with beam major shear,
the steps involve the determination of the factored shear force, the determination
of the shear force that can be resisted by concrete, and the determination of the
reinforcement steel required to carry the balance.
As noted previously, special considerations for seismic design are incorporated
into the program for the ACI 318-14 code.

2.6

Design of Columns
In the design of the columns, the program calculates the required longitudinal
steel, or if the longitudinal steel is specified, the column stress condition is
reported in terms of a column capacity ratio, which is a factor that gives an
indication of the stress condition of the column with respect to the capacity of
the column. The design procedure for the reinforced concrete columns of the
structure involves the following steps:


Generate axial force-biaxial moment interaction surfaces for all of the different concrete section types in the model.



Check the capacity of each column for the factored axial force and bending
moments obtained from each loading combination at each end of the column. This step is also used to calculate the required reinforcement (if none
was specified) that will produce a capacity ratio of 1.0.

The generation of the interaction surface is based on the assumed strain and
stress distributions and some other simplifying assumptions. These stress and
strain distributions and the assumptions are documented in Chapter 3.
The shear reinforcement design procedure for columns is very similar to that for
beams, except that the effect of the axial force on the concrete shear capacity
must be considered.
For certain special seismic cases, the design of columns for shear is based on the
capacity shear. The capacity shear force in a particular direction is calculated
from the moment capacities of the column associated with the factored axial
force acting on the column. For each load combination, the factored axial load is
calculated using the load cases and the corresponding load combination factors.
Then, the moment capacity of the column in a particular direction under the inDesign of Columns

2-5

Concrete Frame Design ACI 318-14

fluence of the axial force is calculated, using the uniaxial interaction diagram in
the corresponding direction, as documented in Chapter 3.

2.7

Design of Joints
To ensure that the beam-column joint of special moment resisting frames possesses adequate shear strength, the program performs a rational analysis of the
beam-column panel zone to determine the shear forces that are generated in the
joint. The program then checks this against design shear strength.
Only joints that have a column below the joint are designed. The material
properties of the joint are assumed to be the same as those of the column below
the joint. The joint analysis is performed in the major and the minor directions of
the column. The joint design procedure involves the following steps:


Determine the panel zone design shear force



Determine the effective area of the joint



Check panel zone shear stress

The joint design details are documented in Chapter 3.

2.8

P-Delta Effects
The program design process requires that the analysis results include P-delta
effects. The P-delta effects are considered differently for “braced” or
“non-sway” and “unbraced” or “sway” components of moments in columns or
frames. For the braced moments in columns, the effect of P-delta is limited to
“individual member stability.” For unbraced components, “lateral drift effects”
should be considered in addition to individual member stability effect. The
program assumes that “braced” or “nonsway” moments are contributed from the
“dead” or “live” loads, whereas, “unbraced” or “sway” moments are contributed
from all other types of loads.
For the individual member stability effects, the moments are magnified with
moment magnification factors, as documented in Chapter 3 of this manual.
For lateral drift effects, the program assumes that the P-delta analysis is performed and that the amplification is already included in the results. The mo-

2-6

Design of Joints

Chapter 2 - Design Prerequisites

ments and forces obtained from P-delta analysis are further amplified for individual column stability effect if required by the governing code, as in the ACI
318-14 code.
Users of the program should be aware that the default analysis option is turned
OFF for P-delta effect. The user can turn the P-delta analysis ON and set the
maximum number of iterations for the analysis. The default number of iteration
for P-delta analysis is 1. Further details about P-delta analysis are provided in
Appendix A of this design manual.

2.9

Element Unsupported Lengths
To account for column slenderness effects, the column unsupported lengths are
required. The two unsupported lengths are l33 and l22. These are the lengths
between support points of the element in the corresponding directions. The
length l33 corresponds to instability about the 3-3 axis (major axis), and l22 corresponds to instability about the 2-2 axis (minor axis).
Normally, the unsupported element length is equal to the length of the element,
i.e., the distance between END-I and END-J of the element. The program,
however, allows users to assign several elements to be treated as a single
member for design. This can be accomplished differently for major and minor
bending, as documented in Appendix B of this design manual.
The user has options to specify the unsupported lengths of the elements on an
element-by-element basis.

2.10 Choice of Input Units
English as well as SI and MKS metric units can be used for input. The codes are
based on a specific system of units. All equations and descriptions presented in
the subsequent chapters correspond to that specific system of units unless otherwise noted. For example, the ACI code is published in inch-pound-second
units. By default, all equations and descriptions presented in the “Design Process” chapter correspond to inch-pound-second units. However, any system of
units can be used to define and design a structure in the program.

Element Unsupported Lengths

2-7

Chapter 3
Design Process

This chapter provides a detailed description of the code-specific algorithms used
in the design of concrete frames when the ACI 318-14 code have been selected.
For simplicity, all equations and descriptions presented in this chapter correspond to inch-lbs-second units unless otherwise noted.

3.1

Notation
The various notations used in this chapter are described herein:

Acp

Area enclosed by outside perimeter of concrete cross-section, in2

Acv

Area of concrete used to determine shear stress, in2

Gross area of concrete, in2

Gross area enclosed by shear flow path, in2

Aoh

Area enclosed by centerline of the outermost closed transverse
torsional reinforcement, in2

Area of tension reinforcement, in2

A′s

Area of compression reinforcement, in2

3-1

Concrete Frame Design ACI 318-14

Area of longitudinal torsion reinforcement, in2

At /s

Area of transverse torsion reinforcement (closed stirrups) per unit
length of the member, in2/in

As(required) Area of steel required for tension reinforcement, in2

3-2

Ast

Total area of column longitudinal reinforcement, in2

Area of shear reinforcement, in2

Av /s

Area of shear reinforcement per unit length of the member, in2/in

Coefficient, dependent upon column curvature, used to calculate
moment magnification factor

Modulus of elasticity of concrete, psi

Modulus of elasticity of reinforcement, assumed as 29x1006 psi
(ACI 20.2.22)

Moment of inertia of gross concrete section about centroidal axis,
neglecting reinforcement, in4

Ise

Moment of inertia of reinforcement about centroidal axis of
member cross-section, in4

Clear unsupported length, in

Smaller factored end moment in a column, lb-in

Larger factored end moment in a column, lb-in

Factored moment to be used in design, lb-in

Mns

Non-sway component of factored end moment, lb-in

Sway component of factored end moment, lb-in

Factored moment at a section, lb-in

Mu2

Factored moment at a section about 2-axis, lb-in

Mu3

Factored moment at a section about 3-axis, lb-in

Axial load capacity at balanced strain conditions, lb

Critical buckling strength of column, lb

Notation

Chapter 3 - Design Process

Pmax

Maximum axial load strength allowed, lb

Axial load capacity at zero eccentricity, lb

Factored axial load at a section, lb

Shear force resisted by concrete, lb

Shear force caused by earthquake loads, lb

VD+L

Shear force from span loading, lb

Vmax

Maximum permitted total factored shear force at a section, lb

Shear force computed from probable moment capacity, lb

Shear force resisted by steel, lb

Factored shear force at a section, lb

Depth of compression block, in

Depth of compression block at balanced condition, in

amax

Maximum allowed depth of compression block, in

Width of member, in

Effective width of flange (T-Beam section), in

Width of web (T-Beam section), in

Depth to neutral axis, in

Depth to neutral axis at balanced conditions, in

Distance from compression face to tension reinforcement, in

d′

Concrete cover to center of reinforcing, in

Thickness of slab (T-Beam section), in

f′ c

Specified compressive strength of concrete, psi

Specified yield strength of flexural reinforcement, psi.

fyt

Specified yield strength of shear reinforcement, psi.

Overall depth of a column section, in

Notation

3-3

Concrete Frame Design ACI 318-14

3.2

Effective length factor

pcp

Outside perimeter of the concrete cross-section, in

Perimeter of centerline of outermost closed transverse torsional
reinforcement, in

Radius of gyration of column section, in

Reinforcing steel overstrength factor

Modification factor reflecting the reduced mechanical properties
of light-weight concrete, all relative to normal weight concrete of
the same compressive strength

β1

Factor for obtaining depth of compression block in concrete

βdns

Absolute value of ratio of maximum factored axial dead load to
maximum factored axial total load

δs

Moment magnification factor for sway moments

δns

Moment magnification factor for non-sway moments

εc

Strain in concrete

εc, max

Maximum usable compression strain allowed in extreme concrete
fiber (0.003 in/in)

εs

Strain in reinforcing steel

εs, min

Minimum tensile strain allowed in steel rebar at nominal strength
for tension controlled behavior (0.005 in/in)

Strength reduction factor

Design Load Combinations
The design load combinations are the various combinations of the prescribed
response cases for which the structure is to be checked. The program creates a
number of default design load combinations for a concrete frame design. Users
can add their own design load combinations as well as modify or delete the
program default design load combinations. An unlimited number of design load
combinations can be specified.

3-4

Design Load Combinations

Chapter 3 - Design Process

To define a design load combination, simply specify one or more response cases,
each with its own scale factor. The scale factors are applied to the forces and
moments from the load cases to form the factored design forces and moments for
each design load combination. There is one exception to the preceding. For
spectral analysis modal combinations, any correspondence between the signs of
the moments and axial loads is lost. The program uses eight design load combinations for each such loading combination specified, reversing the sign of
axial loads and moments in major and minor directions.
As an example, if a structure is subjected to dead load, D, and live load, L, only,
the ACI 318-14 design check may need one design load combination only,
namely, 1.2 D +1.6 L. However, if the structure is subjected to wind, earthquake,
or other loads, numerous additional design load combinations may be required.
The program allows live load reduction factors to be applied to the member
forces of the reducible live load case on a member-by-member basis to reduce
the contribution of the live load to the factored responses.
The design load combinations are the various combinations of the load cases for
which the structure needs to be checked. For this code, if a structure is subjected
to dead (D), live (L), pattern live (PL), wind (W), earthquake (E), and snow (S)
loads, and considering that wind and earthquake forces are reversible, the following load combinations may need to be defined (ACI 5.3.1, Table 5.3.1,
R5.3.1; ASCE 7-10 2.3.2):

1.4D

(ACI 5.3.1a)

1.2D + 1.6L + 0.5Lr
1.2D + 1.0L + 1.6Lr

(ACI 5.3.1b)
(ACI 5.3.1c)

1.2D + 1.6(0.75 PL) + 0.5Lr
1.2D + 1.6L + 0.5S
1.2D + 1.0L + 1.6S

(ACI 5.3.1b, 6.4)
(ACI 5.3.1b)
(ACI 5.3.1c)

0.9D ± 1.0W
1.2D + 1.0L + 0.5Lr ± 1.0W
1.2D + 1.6Lr ± 0.5W

(ACI 5.3.1f)
(ACI 5.3.1d)
(ACI 5.3.1c)

1.2D + 1.6S ± 0.5W
1.2D + 1.0L + 0.5S ± 1.0W

(ACI 5.3.1c)
(ACI 5.3.1d)
Design Load Combinations

3-5

Concrete Frame Design ACI 318-14

0.9D ± 1.0E
1.2D + 1.0L + 0.2S ± 1.0E

(ACI 5.3.1g)
(ACI 5.3.1e)

These are also the default design load combinations in the program whenever the
ACI 318-14 code is used. Also, refer to Section 2.2 Seismic Load Effects when
special seismic load effects are included that modify the scale factors for Dead
and Earthquake loads. The user should use other appropriate design load combinations if other types of loads are present. PL is the live load multiplied by the
Pattern Live Load Factor. The Pattern Live Load Factor can be specified in the
Preferences.
Live load reduction factors can be applied to the member forces of the live load
analysis on a member-by-member basis to reduce the contribution of the live
load to the factored loading.
When using this code, the program assumes that a P-Delta analysis has been
performed.

3.3

Limits on Material Strength
The concrete compressive strength, f′c, should not be less than 2500 psi (ACI
19.2.1.1, TABLE 19.2.1.1). The upper limit of the reinforcement yield strength,
fy, is taken as 80 ksi (ACI 9.4) and the upper limit of the reinforcement shear
strength, fyt, is taken as 80 ksi (ACI 21.2.2.4a, TABLE 20.2.2.4a).
ETABS does not enforce the upper material strength limits for flexure and shear
design of beams, columns and slabs or for torsion design of beams. However, for
special seismic systems, the upper limit for fy should be taken as 60 ksi (ACI
Table 20.2.2.4a). Also, for special seismic systems or for beams of all framing
types, where torsion is significant, fyt should be limited to 60 ksi (ACI Table
20.2.2.4a). The input material strengths are taken as the upper limits if they are
defined in the material properties as being greater than the limits. The user is
responsible for ensuring that the minimum and minimum strength is satisfied.

3-6

Limits on Material Strength

Chapter 3 - Design Process

3.4

Column Design
The program can be used to check column capacity or to design columns. If the
geometry of the reinforcing bar configuration of each concrete column section
has been defined, the program will check the column capacity. Alternatively, the
program can calculate the amount of reinforcing required to design the column
based on provided reinforcing bar configuration. The reinforcement requirements are calculated or checked at a user-defined number of check/design
stations along the column span. The design procedure for the reinforced concrete
columns of the structure involves the following steps:
 Generate axial force-biaxial moment interaction surfaces for all of the
different concrete section types of the model. A typical biaxial interacting
diagram is shown in Figure 3-1. For reinforcement to be designed, the
program generates the interaction surfaces for the range of allowable
reinforcement: 1 to 8 percent for Ordinary and Intermediate Moment Resisting
Frames (ACI 10.6.1.2) and 1 to 6 percent for Special Moment Resisting
Frames (ACI 18.7.4.1).
 Calculate the capacity ratio or the required reinforcing area for the factored
axial force and biaxial (or uniaxial) bending moments obtained from each
loading combination at each station of the column. The target capacity ratio is
taken as the Utilization Factor Limit when calculating the required reinforcing
area.
 Design the column shear reinforcement.
The following three sections describe in detail the algorithms associated with
this process.

3.4.1

Generation of Biaxial Interaction Surfaces
The column capacity interaction volume is numerically described by a series of
discrete points that are generated on the three-dimensional interaction failure
surface. In addition to axial compression and biaxial bending, the formulation
allows for axial tension and biaxial bending considerations. A typical interaction
surface is shown in Figure 3-1.

Column Design

3-7

Concrete Frame Design ACI 318-14

Figure 3-1 A typical column interaction surface

The coordinates of these points are determined by rotating a plane of linear strain
in three dimensions on the section of the column, as shown in Figure 3-2. The
linear strain diagram limits the maximum concrete strain, εc, at the extremity of
the section, to 0.003 (ACI 22.2.2.1). The formulation is based consistently on the
general principles of ultimate strength design (ACI 22.2).
The stress in the steel is given by the product of the steel strain and the steel
modulus of elasticity, εsEs, and is limited to the yield stress of the steel, fy (ACI
22.2.3.1, 20.2.2.1, R20.2.2.1). The area associated with each reinforcing bar is
assumed to be placed at the actual location of the center of the bar, and the algorithm does not assume any further simplifications with respect to distributing
the area of steel over the cross-section of the column, as shown in Figure 3-2.

3-8

Column Design

Chapter 3 - Design Process

Figure 3-2 Idealized strain distribution for generation of interaction surface

The concrete compression stress block is assumed to be rectangular, with a stress
value of 0.85f′c (ACI 22.2.2.4.1), as shown in Figure 3-3.

Column Design

3-9

Concrete Frame Design ACI 318-14

Figure 3-3 Idealization of stress and strain distribution in a column section

The interaction algorithm provides correction to account for the concrete area
that is displaced by the reinforcement in the compression zone. The depth of the
equivalent rectangular block, a, is taken as:
a = β1 c

(ACI 22.2.2.4.1)

where c is the depth of the stress block in compression strain and,
 f ′ − 4000 
β1 = 0.85 − 0.05  c
,
 1000 

0.65 ≤ β1 ≤ 0.85.

(ACI 22.2.2.4.3)

The effect of the strength reduction factor, φ, is included in the generation of the
interaction surface. The value of φ used in the interaction diagram varies from
compression controlled φ to tension controlled φ based on the maximum tensile
strain in the reinforcing at the extreme edge, εt (ACI 21.2.1, 21.2.2, Table 21.2.1,
Table 21.2.2).
Sections are considered compression controlled when the tensile strain in the
extreme tension steel is equal to or less than the compression controlled strain
limit at the time the concrete in compression reaches its assumed strain limit of
εc.max, which is 0.003. The compression controlled strain limit is the tensile strain

3 - 10

Column Design

Chapter 3 - Design Process

in the reinforcement at balanced strain condition, which is taken as the yield
fy
strain of the steel reinforcing,
(ACI 21.2.2.1, Table 21.2.2).
E
Sections are tension controlled when the tensile strain in the extreme tension
steel is equal to or greater than 0.005, just as the concrete in compression reaches
its assumed strain limit of 0.003 (Table 21.2.2, Fig R21.2.26).
Sections with εt between the two limits are considered to be in a transition region
between compression controlled and tension controlled sections (Table 21.2.2,
Fig R21.2.26).
When the section is tension controlled, a φ factor for tension control is used.
When the section is compression controlled, a φ factor for compression control is
used. When the section is within the transition region, φ is linearly interpolated
between the two values (ACI 21.2.2, Table 21.2.2), as shown in the following:
 φc
if εt ≤ ε y


 0.005 − εt 
φ = φt − ( φt − φc ) 
 if ε y < εt ≤ 0.005, (ACI 21.2.2, Table 21.2.2)

 0.005 − ε y 
φ
if εt ≥ 0.005, where
 t

φt = φ for tension controlled sections,
which is 0.90 by default

(ACI 21.2.2, Table 21.2.2)

φc = φ for compression controlled sections
= 0.75 (by default) for column sections
with spiral reinforcement
= 0.65 (by default) for column sections
with tied reinforcement

(ACI 21.2.2, Table 21.2.2)
(ACI 21.2.2, Table 21.2.2)

Default values for φc and φt are provided by the program but can be overwritten
using the Preferences.
The maximum compressive axial load is limited to φ Pn,max, where
φPn,max = 0.85φPo, spiral

(ACI Table 22.4.2)

Column Design

3 - 11

Concrete Frame Design ACI 318-14

φPn(max) = 0.80φPo, tied

(ACI Table 22.4.2.1)

where,
φPo

= 0.85f′c (Ag − Ast) + fy Ast

(ACI 22.4.2.2)

In calculating the φPn,max, the φ for a compression controlled case is used. A limit
of 80,000 psi on fy has been imposed (ACI Table 21.2.2).
fy ≤ 80,000 psi

(ACI 22.2.2.4a)

If input fy is larger than the preceding limit, fy is set equal to the limiting value
during calculations.

3.4.2 Calculate Column Capacity Ratio
The column capacity ratio is calculated for each design load combination at each
output station of each column. The following steps are involved in calculating
the capacity ratio of a particular column for a particular design load combination
at a particular location:


Determine the factored moments and forces from the load cases and the
specified load combination factors to give Pu, Mu2, and Mu3.



Determine the moment magnification factors for the column moments.



Apply the moment magnification factors to the factored moments. Determine if the point, defined by the resulting axial load and biaxial moment set,
lies within the interaction volume.

The factored moments and corresponding magnification factors depend on the
identification of the individual column as either “sway” or “non-sway.”
The following three sections describe in detail the algorithms associated with
that process.

3.4.2.1 Determine Factored Moments and Forces
The loads for a particular design load combination are obtained by applying the
corresponding factors to all of the load cases, giving Pu, Mu2, and Mu3. The fac-

3 - 12

Column Design

Chapter 3 - Design Process

tored moments are further increased, if required, to obtain minimum eccentricities of (0.6 + 0.03h) inches, where h is the dimension of the column in the corresponding direction (ACI 6.6.4.5.4). The minimum eccentricity is applied in
only one direction at a time. The minimum eccentricity moments are amplified
for second order effects (ACI 6.6.4.5.4, R6.6.4.5.4).

3.4.2.2 Determine Moment Magnification Factors
The moment magnification factors are calculated separately for sway (overall
stability effect), δs, and for non-sway (individual column stability effect), δns.
Also, the moment magnification factors in the major and minor directions are, in
general, different (ACI 6.6.4.1, R6.6.4.1).
The moment obtained from analysis is separated into two components: the sway
Ms and the non-sway Mns components. The sway components are identified by
the “s” subscript. The sway moments are primarily caused by lateral loads and
are related to the cause of sidesway. The non-sway components, which are
identified by “ns” subscripts, are primarily caused by gravity load.
For individual columns or column-members, the magnified moments about two
axes at any station of a column can be obtained as
M = Mns +δs Ms

(ACI 6.6.4.6.1)

The factor δs is the moment magnification factor for moments causing sidesway.
The program takes this factor to be 1 because the component moments Ms and
Mns are assumed to be obtained from a second order elastic ( P-∆ ) analysis (ACI
6.6.4.4.3, R6.6.4.4.3). For more information about P-∆ analysis, refer to Appendix A.
For the P-∆ analysis, the analysis combination should correspond to a load of1.2
(dead load) + 1.6 (live load) (ACI 5.3.1). See also White and Hajjar (1991). The
user should use reduction factors for the moments of inertia in the program as
specified in ACI 6.6.3.1.1 and ACI 6.6.3.1.2. The moment of inertia reduction
for sustained lateral load involves a factor βds (ACI 10.10.4.2). This βds for sway
frames in second-order analysis is different from the one that is defined later for
nonsway moment magnification (ACI 6.6.4.6.2, R6.6.4.6.2, 6.6.4.4.4, 6.6.3.1.1).
The default moment of inertia factor in this program is 1.

Column Design

3 - 13

Concrete Frame Design ACI 318-14

The computed moments are further amplified for individual column stability
effect (ACI 6.6.4.5.1) by the nonsway moment magnification factor, δns, as
follows:
Mc = δnsM

(ACI 6.6.4.5.2)

Mc is the factored moment to be used in design.
The nonsway moment magnification factor, δns, associated with the major or
minor direction of the column is given by
=
δns

Cm
≥ 1.0 where
Pu
1−
0.75 Pc

Ma

, with no transverse load,
0.6 + 0.4
Mb
Cm = 

with transverse load,
1.0,

(ACI 6.6.4.5.3a)

(ACI 6.6.4.5.3)

where Ma and Mb are the moments at the ends of the column, and Mb is numerically larger than Ma. Ma ⁄ Mb is negative for single curvature bending and positive for double curvature bending.
The preceding expression of Cm is valid if there is no transverse load applied
between the supports. If transverse load is present on the span, or the length is
overwritten, Cm = 1. The user can overwrite Cm on an object-by-object basis.

Pc =

π2 ( EI )eff

( klu )

(ACI 6.6.4.4.2)

k is conservatively taken as 1; however, the program allows the user to overwrite
this value (ACI 6.6.4.4.2). lu is the unsupported length of the column for the
direction of bending considered. The two unsupported lengths are l22 and l33,
corresponding to instability in the minor and major directions of the object,
respectively, as shown in Figure B-1 in Appendix B. These are the lengths
between the support points of the object in the corresponding directions.
Refer to Appendix B for more information about how the program automatically
determines the unsupported lengths. The program allows users to overwrite the

3 - 14

Column Design

Chapter 3 - Design Process

unsupported length ratios, which are the ratios of the unsupported lengths for the
major and minor axes bending to the overall member length.
EIeff is associated with a particular column direction:

EI eff =
=
βdns

0.4 Ec I g
1 + βdns

maximumfactored axial sustained (dead) load
maximum factored axial total load

(ACI 6.6.4.4.4a)

≤ 1.0 (ACI 6.6.4.4.4)

The magnification factor, δns, must be a positive number and greater than one.
Therefore, Pu must be less than 0.75Pc. If Pu is found to be greater than or equal
to 0.75Pc, a failure condition is declared.
The preceding calculations are performed for major and minor directions separately. That means that δn, δns, Cm, k, lu, EI, and Pc assume different values for
major and minor directions of bending.
If the program assumptions are not satisfactory for a particular member, the user
can explicitly specify values of δn and δns.

3.4.2.3 Determine Capacity Ratio
As a measure of the stress condition of the column, a capacity ratio is calculated.
The capacity ratio is basically a factor that gives an indication of the stress
condition of the column with respect to the capacity of the column.
Before entering the interaction diagram to check the column capacity, the moment magnification factors are applied to the factored loads to obtain Pu, Mu2,
and Mu3. The point (Pu, Mu2, Mu3) is then placed in the interaction space shown as
point L in Figure 3-4. If the point lies within the interaction volume, the column
capacity is adequate. However, if the point lies outside the interaction volume,
the column is overstressed.
This capacity ratio is achieved by plotting the point L and determining the location of point C. Point C is defined as the point where the line OL (if extended
outwards) will intersect the failure surface. This point is determined by
three-dimensional linear interpolation between the points that define the failure

Column Design

3 - 15

Concrete Frame Design ACI 318-14

surface, as shown in Figure 3-4. The capacity ratio, CR, is given by the ratio OL
⁄ OC.
 If OL = OC (or CR = 1), the point lies on the interaction surface and the
column is stressed to capacity.
 If OL < OC (or CR < 1), the point lies within the interaction volume and the
column capacity is adequate.
 If OL > OC (or CR > 1), the point lies outside the interaction volume and the
column is overstressed.
The maximum of all values of CR calculated from each design load combination
is reported for each check station of the column along with the controlling Pu,
Mu2, and Mu3 set and associated design load combination name.

Figure 3-4 Geometric representation of column capacity ratio

3 - 16

Column Design

Chapter 3 - Design Process

3.4.3 Required Reinforcing Area
If the reinforcing area is not defined, the program computes the reinforcement
that will give a column capacity ratio equal to the Utilization Factor Limit, which
is set to 1.0 by default.

3.4.4 Design Column Shear Reinforcement
The shear reinforcement is designed for each design combination in the major
and minor directions of the column. The following steps are involved in
designing the shear reinforcing for a particular column for a particular design
load combination resulting from shear forces in a particular direction:
 Determine the factored forces acting on the section, Pu and Vu. Note that Pu is
needed for the calculation of Vc.
 Determine the shear force, Vc, which can be resisted by concrete alone.
 Calculate the reinforcement steel required to carry the balance.
For Intermediate Moment Frames (seismic design), the shear design of the
columns is based on the smaller of the following two conditions:
a) The shear associated with the development of nominal moment strengths of
the columns at each restrained end of the unsupported length (ACI
18.4.3.1a),
b) The maximum shear obtained from design load combinations that include
earthquake load (E), with E increased by a factor of Ωo (ACI 18.4.3.1b).
For Special Moment Frames (seismic design), the shear design of the columns is
based on the maximum probable strength at the end of each member or the
maximum shear obtained from design load combinations that include earthquake load (E) (ACI 18.7.6.1.1).
Columns of Ordinary Moment Frames that have a clear-height-to-plan dimension ratio of 5 or less and that are assigned a Seismic Design Category B or
higher are designed for capacity shear force in accordance with ACI 18.3.3 in
addition to the factored shear force (IBC 1901.2, ACI 18.3.3). In this case, the
design shear force Vu is taken as the lesser of the two following cases:

Column Design

3 - 17

Concrete Frame Design ACI 318-14

a) The shear associated with the development of nominal moment
strengths of the column at each restrained end of the unsupported length.
The column flexural strength is calculated for the factored axial force,
consistent with the direction of the lateral forces considered, resulting in
the highest flexural strength (ACI 18.3.3a).
b) The maximum shear obtained from design load combinations that include earthquake load (E), with ΩoE substituted for E (ACI 18.3.3b)
Effects of the axial forces on the column moment capacities are included in the
formulation for all three cases stated above.
The following three sections describe in detail the algorithms associated with
this process.

3.4.4.1 Determine Section Forces
 In the design of the column shear reinforcement of an Ordinary Moment
Resisting concrete frame, the forces for a particular design load combination,
namely, the column axial force, Pu, and the column shear force, Vu, in a
particular direction are obtained by factoring the load cases with the
corresponding design load combination factors.
 In the shear design of Special Moment Frames (i.e., seismic design), the shear
capacity of the column is checked for capacity shear in addition to the requirement for the Ordinary Moment Resisting Frames. The capacity shear
force in the column, Vu, is determined from consideration of the maximum
forces that can be generated at the column. Two different capacity shears are
calculated for each direction (major and minor). The first is based on the
maximum probable moment strength of the column, while the second is
computed from the maximum probable moment strengths of the beams
framing into the column. The design strength is taken as the minimum of these
two values, but never less than the factored shear obtained from the design
load combination.

{

}

=
Vu min Vec ,Veb ≥ Vu,factored

where

3 - 18

Column Design

(ACI 18.7.6.1.1)

Chapter 3 - Design Process

Vec = Capacity shear force of the column based on the maximum probable
flexural strengths of the two ends of the column.

Veb = Capacity shear force of the column based on the maximum probable
moment strengths of the beams framing into the column.
In calculating the capacity shear of the column, Vec , the maximum probable
flexural strength at the two ends of the column is calculated for the existing
factored axial load. Clockwise rotation of the joint at one end and the associated counter-clockwise rotation of the other joint produces one shear force.
The reverse situation produces another capacity shear force, and both of these
situations are checked, with the maximum of these two values taken as the Vec .
For each design load combination, the factored axial load, Pu, is calculated.
Then, the maximum probable positive and negative moment strengths,
−
+
, of the column in a particular direction under the influence of
M pr
and M pr
the axial force Pu is calculated using the uniaxial interaction diagram in the
corresponding direction. Then the capacity shear force is obtained by applying
the calculated maximum probable ultimate moment strengths at the two ends
of the column acting in two opposite directions. Therefore, Vec is the maximum
of Vec1 and Vec2 ,

{

Vec = max Vec1 , Vec2

}

(ACI 18.7.6.1.1, Fig. R18.6.5, R18.7.6.1)

where,
c
e1

c
e2

M I+ , M I− =

M I− + M J+
L

M I+ + M J−
,
L

(ACI 18.7.6.1.1, Fig. R18.6.5)

Positive and negative maximum probable moment strengths

+
pr

)

−
at end I of the column using a steel yield stress
, M pr

value of αfy and no reduction factor (ϕ =1.0),

Column Design

3 - 19

Concrete Frame Design ACI 318-14

M J+ , M J− =

Positive and negative maximum probable moment capacities

+
pr

)

−
at end J of the column using a steel yield stress
, M pr

value of αfy and no reduction factor (ϕ =1.0), and
L

Clear span of the column.

The maximum probable moment strengths are determined using a strength
reduction factor of 1.0 and the reinforcing steel stress equal to α fy , where α is
set equal to 1.25 (ACI 18.7.6.1.1, R18.7.6.1.1, Fig. R18.6.5). If the column
section was identified as a section to be checked, the user-specified reinforcing
is used for the interaction curve. If the column section was identified as a
section to be designed, the reinforcing area envelope is calculated after
completing the flexural (P-M-M) design of the column. This envelope of
reinforcing area is used for the interaction curve.
If the column section is a variable (non-prismatic) section, the cross-sections
at the two ends are used, along with the user-specified reinforcing or the envelope of reinforcing for check or design sections, as appropriate. If the user
overwrites the length factor, the full span length is used. However, if the length
factor is not overwritten by the user, the clear span length will be used. In the
latter case, the maximum of the negative and positive moment capacities will
be used for both the positive and negative moment capacities in determining
the capacity shear.
In calculating the capacity shear of the column based on the flexural strength
of the beams framing into it, Veb , the program calculates the maximum probable positive and negative moment strengths of each beam framing into the top
joint of the column. Then the sum of the beam moments is calculated as a resistance to joint rotation. Both clockwise and counter-clockwise rotations are
considered separately, as well as the rotation of the joint in both the major and
minor axis directions of the column. The shear force in the column is determined assuming that the point of inflection occurs at mid-span of the columns
above and below the joint. The effects of load reversals are investigated and
the design is based on the maximum of the joint shears obtained from the two
cases.

{

Veb = max Veb1 , Veb2

3 - 20

Column Design

}

(ACI 18.7.6.1.1)

Chapter 3 - Design Process

where,

Veb1 = Column capacity shear based on the maximum probable flexural
strengths of the beams for clockwise joint rotation,

Veb2 = Column capacity shear based on the maximum probable flexural
strengths of the beams for counter-clockwise joint rotation,

Veb1 =

M r1
,
H

Veb2 =

Mr2
,
H

M r1 = Sum of beam moment resistances with clockwise joint rotations,
M r 2 = Sum of beam moment resistances with counter-clockwise joint rotations, and
H =

Distance between the inflection points, which is equal to the mean
height of the columns above and below the joint. If there is no column
at the top of the joint, the distance is taken as one-half of the height of
the column at the bottom of the joint.

For the case shown in Figure 3-5, Ve1 can be calculated as follows:

Veb1 ==

M uL + M uR
H

It should be noted that the points of inflection shown in Figure 3-5 are taken at
midway between actual lateral support points for the columns, and H is taken
as the mean of the two column heights. If no column is present at the top of the
joint, H is taken to be equal to one-half the height of the column below the
joint.
The expression Veb is applicable for determining both the major and minor
direction shear forces. The calculated shear force is used for the design of the
column below the joint. When beams are not oriented along the major and
minor axes of the column, the appropriate components of the flexural

Column Design

3 - 21

Concrete Frame Design ACI 318-14

capacities are used. If the beam is oriented at an angle θ with the column major
axis, the appropriate component—Mpr cosθ or Mpr sinθ—of the beam flexural
strength is used in calculating Mr1 and Mr2. Also the positive and negative
moment capacities are used appropriately based on the orientation of the beam
with respect to the column local axis.
 For Intermediate Moment Frames (seismic design), the shear capacity of the
column also is checked for the capacity shear based on the nominal moment
capacities at the ends and the factored gravity loads, in addition to the check
required
for
Ordinary Moment Resisting Frames. The design shear force is taken to be the
minimum of that based on the nominal (φ = 1.0) moment capacity and modified factored shear force.

{

}

=
Vu min Ve ,Vef ≥ Vu ,factored

3 - 22

Column Design

(ACI 18.4.2.3, Fig R18.4.2)

Chapter 3 - Design Process

Figure 3-5 Column shear force Vu

where, Ve is the capacity shear force in the column determined from the
nominal moment capacities of the column and the beams framing into it.


Ve = min Vec ,Veb 



(ACI 18.4.2.3a, Fig. R18.4.2)

Column Design

3 - 23

Concrete Frame Design ACI 318-14

where, Vec is the capacity shear force of the column based on the nominal
flexural strength of the column ends alone. Veb is the capacity shear force of
the column based on the nominal flexural strengths of the beams framing into
it. The calculation of Vec and Veb is the same as that described for Special
Moment Frames, except that in determining the flexural strengths of the
column and the beams, the nominal capacities are used. In that case, φ is taken
as 1.0 as before, but α is taken as 1.0 rather than 1.25 (ACI 18.4.3.2a, Fig.
R18.4.2).
Vef is the shear force in the column obtained from the modified design load
combinations. In that case, the factored design forces (Pu, Vu, Mu) are based on
the specified design load factors, except that the earthquake load factors are
increased by a factor of Ωo (ACI 18.4.2.3b). When designing for this modified
shear force, the modified Pu and Mu are used for calculating concrete shear
strength. However, the modified Pu and Mu are not used for the P-M-M interaction.
In designing for Ve, the factored Pu and Mu are used for calculating concrete
shear strength. In no case is the column designed for a shear force less than the
original factored shear force.
 For columns of Ordinary Moment Frames that are assigned a Seismic Design
Category B or higher (seismic design) and columns for which the
clear-height-to-maximum- plan-dimension ratio is 5 or less, the shear capacity
is checked based on the nominal moment capacities at the ends and the factored gravity loads, in addition to the check required for other Ordinary Moment Resisting Frames (ACI 18.3.3). This special case is similar to the
Intermediate Moment Frames (ACI 18.4.3.1). The design shear force is taken
to be the minimum of that based on the nominal (φ = 1.0) moment capacity and
modified factored shear force.

{

}

=
Vu min Ve ,Vef ≥ Vu ,factored

(ACI 18.3.3, R18.4.2)

Ve, Veff, and Vu,factored are calculated exactly in the same way as they are calculated for a column in an Intermediate Moment Resisting Frame.

3 - 24

Column Design

Chapter 3 - Design Process

3.4.4.2 Determine Concrete Shear Capacity
Given the design force set Pu and Vu, the shear force carried by the concrete, Vc,
is calculated as follows:
 If the column is subjected to axial compression, i.e., Pu is positive,

Pu
2λ f ′c  1 +
Vc =

2, 000 Ag


Vc ≤ 3.5λ

The term

f ′c


Pu
 1 +
500
Ag



 Acv , where


(ACI 22.5.6.1)


 Acv .


(ACI 22.5.6.1)

Pu
must have psi units. Acv is the effective shear area, which is
Ag

shown shaded in Figure 3-6. For circular columns, Acv is taken to be equal to
the gross area of the section (ACI 22.5.2.2, R22.5.2.2).
If the column is subjected to axial tension, Pu is negative

Pu
Vc =
2λ f c' 1 +
 500 Ag



 Acv ≥ 0



(ACI 22.5.7.1)

 For Special Moment Frame design, if the factored axial compressive force, Pu,
including the earthquake effect, is small Pu < f c′ Ag 20 , if the shear force

(

)

contribution from earthquake, VE, is more than half of the total factored
maximum shear force Vu (VE ≥ 0.5Vu ) over the length of the member, and if
the station is within a distance lo from the face of the joint, then the concrete
capacity Vc is taken as zero (ACI 18.7.6.2.1). Note that for capacity shear design, Ve is considered to be contributed solely by earthquakes, so the second
condition is automatically satisfied. The length lo is taken as the section width,
one-sixth the clear span of the column, or 18 in, whichever is larger (ACI
18.5.7.1).

Column Design

3 - 25

Concrete Frame Design ACI 318-14

Figure 3-6 Shear stress area, Acv

3.4.4.3 Determine Required Shear Reinforcement
Given Vu and Vc, the required shear reinforcement in the form of stirrups or ties
within a spacing, s, is given for rectangular and circular columns by the following:
 The shear force is limited to a maximum of

(

)

Vmax= Vc + 8 f c′ Acv

(ACI 22.5.1.2)

 The required shear reinforcement per unit spacing, Av /s, is calculated as follows:

3 - 26

Column Design

Chapter 3 - Design Process

If Vu ≤ (Vc 2 ) φ,
Av
= 0,
s

(ACI 10.6.2.1)

else if (Vc 2 ) φ < Vu ≤ φVmax ,
Av (Vu − φVc )
,
=
s
φ f ys d

(ACI 22.5.1.1, 22.5.10.1, 22.5.10.5.3)

 0.75 f c′
Av
50 
≥ max 
bw ,
bw 

s
f ys
f ys 


(ACI 10.6.2.2)

else if Vu > φVmax ,
a failure condition is declared.

(ACI 22.5.1.2)

In the preceding expressions, for a rectangular section, bw is the width of the
column, d is the effective depth of the column, and Acv is the effective shear area,
which is equal to bw d . For a circular section, bw is replaced with D, which is the
external diameter of the column, and d is replaced with 0.8D and Acv is replaced
with the gross area

πD2
(ACI 11.4.7.3, 11.2.3, R11.2.3).
4

In the preceding expressions, the strength reduction factor φ is taken by default
as 0.75 for non-seismic cases (ACI 21.2.1), and as 0.60 for seismic cases (ACI
21.2.1, 21.2.4). However, those values can be overwritten by the user, if so desired.
If Vu exceeds its maximum permitted value φVmax, the concrete section size
should be increased (ACI 22.5.1.2).
The maximum of all calculated Av s values, obtained from each design load
combination, is reported for the major and minor directions of the column, along
with the controlling combination name.
The column shear reinforcement requirements reported by the program are
based purely on shear strength consideration. Any minimum stirrup require-

Column Design

3 - 27

Concrete Frame Design ACI 318-14

ments to satisfy spacing considerations or transverse reinforcement volumetric
considerations must be investigated independently of the program by the user.

3.5

Beam Design
In the design of concrete beams, the program calculates and reports the required
areas of steel for flexure and shear based on the beam moments, shear forces,
torsions, design load combination factors, and other criteria described in the text
that follows. The reinforcement requirements are calculated at a user-defined
number of check/design stations along the beam span.
All beams are designed for major direction flexure, shear and torsion only.
Effects resulting from any axial forces and minor direction bending that may
exist in the beams must be investigated independently by the user.
The beam design procedure involves the following steps:
 Design flexural reinforcement
 Design shear reinforcement
 Design torsion reinforcement

3.5.1

Design Beam Flexural Reinforcement
The beam top and bottom flexural steel is designed at check/design stations
along the beam span. The following steps are involved in designing the flexural
reinforcement for the major moment for a particular beam for a particular section:
 Determine the maximum factored moments
 Determine the reinforcing steel

3.5.1.1 Determine Factored Moments
In the design of flexural reinforcement of Special, Intermediate, or Ordinary
Moment concrete frame beams, the factored moments for each design load
combination at a particular beam section are obtained by factoring the

3 - 28

Beam Design

Chapter 3 - Design Process

corresponding moments for different load cases with the corresponding design
load combination factors.
The beam section is then designed for the factored moments obtained from all of
the design load combinations. Positive moments produce bottom steel. In such
cases, the beam may be designed as a Rectangular or a T-Beam. Negative
moments produce top steel. In such cases, the beam is always designed as a
rectangular section.

3.5.1.2 Determine Required Flexural Reinforcement
In the flexural reinforcement design process, the program calculates both the
tension and compression reinforcement. Compression reinforcement is added
when the applied design moment exceeds the maximum moment capacity of a
singly reinforced section. The user has the option of avoiding the compression
reinforcement by increasing the effective depth, the width, or the grade of concrete.
The design procedure is based on the simplified rectangular stress block, as
shown in Figure 3-7 (ACI 22.2). Furthermore, it is assumed that the net tensile
strain of the reinforcing steel shall not be less than 0.005 (tension controlled)
(ACI 9.3.3). When the applied moment exceeds the moment capacity at this
design condition, the area of compression reinforcement is calculated on the
assumption that the additional moment will be carried by compression and
additional tension reinforcement.
The design procedure used by the program for both rectangular and flanged
sections (T-Beams) is summarized in the following subsections. It is assumed
that the design ultimate axial force does not exceed φ ( 0.1 f ′c Ag ) (ACI 9.3.3,
9.5.2.1); hence, all of the beams are designed ignoring axial force.
3.5.1.2.1

Design for Rectangular Beam

In designing for a factored negative or positive moment, Mu (i.e., designing top
or bottom steel), the depth of the compression block is given by a (see Figure
3-7), where,

Beam Design

3 - 29

Concrete Frame Design ACI 318-14

Figure 3-7 Rectangular beam design

a =−
d
d2 −

2 Mu
,
0.85 f c′φ b

(ACI 22.2)

where, the value φ is taken as that for a tension controlled section, which is 0.90
by default (ACI 21.2.1, 21.2.2, Table 21.2.1, Table 21.2.2) in the preceding and
the following equations.
The maximum depth of the compression zone, cmax, is calculated based on the
limitation that the tensile steel tension shall not be less than εs,min, which is equal
to 0.005 for tension controlled behavior (ACI 9.3.3.1, 21.2.2. Fig R21.2.2b):
cmax =

3 - 30

εc max
d
εc ,max + ε s ,min

where,

(ACI 22.2.1.2)

εc,max = 0.003

(ACI 21.2.2, Fig R21.2)

εs,min = 0.005

(ACI 21.2.2, Fig R21.2.26)

Beam Design

Chapter 3 - Design Process

Please note that the code allows the user to set εs,min to be equal to 0.004 (ACI
9.3.3.1) for beams. This allows a larger depth of the compression block. However, it is associated with a reduced value of φ factor (ACI 21.2.2, Table 21.2.2).
For simplicity, the program enforces εs,min=0.005.
The maximum allowable depth of the rectangular compression block, amax, is
given by
amax = β1cmax

(ACI 22.2.2.4.1)

where β1 is calculated as follows:
 f ′ − 4000 
β=
0.85 − 0.05  c
1
,
 1000 

0.65 ≤ β1 ≤ 0.85

(ACI 22.2.2.4.3)

 If a ≤ amax (ACI 9.3.3.1, 21.2.2), the area of tensile steel reinforcement is
then given by:
As =

Mu
a

φ fy  d − 
2


This steel is to be placed at the bottom if Mu is positive, or at the top if Mu is
negative.
 If a > amax, compression reinforcement is required (ACI 9.3.3.1, 21.2.2, Fig
21.2.26, 22.2.2.4.1) and is calculated as follows:
The compressive force developed in concrete alone is given by:
C = 0.85 f ′c bamax ,

(ACI 22.2.2.4.1)

the moment resisted by concrete compression and tensile steel is:
a

M uc =C  d − max
2



 φ.


Therefore, the moment resisted by compression steel and tensile steel is:
M=
M u − M uc .
us

Beam Design

3 - 31

Concrete Frame Design ACI 318-14

So the required compression steel is given by:
As′ =

M us
, where
( f ′s − 0.85 f ′c ) ( d − d ′) φ

c − d′
f ′s =
Es εc max  max
 ≤ fy.
 cmax 

(ACI 9.2.1.2, 9.5.2.1, 20.2.2, 22.2.1.2)

The required tensile steel for balancing the compression in concrete is
As1 =

M uc
, and
amax 

f y d −
φ
2 


the tensile steel for balancing the compression in steel is given by
As 2 =

M us
.
f y ( d − d ′) φ

Therefore, the total tensile reinforcement is As = As1 + As2, and the total
compression reinforcement is As′ . As is to be placed at the bottom and As′ is
to be placed at the top if Mu is positive, and As′ is to be placed at the bottom
and As is to be placed at the top if Mu is negative.
3.5.1.2.2

Design for T-Beam

In designing a T-beam, a simplified stress block, as shown in Figure 3-8, is
assumed if the flange is under compression, i.e., if the moment is positive. If the
moment is negative, the flange comes under tension, and the flange is
ignored. In that case, a simplified stress block similar to that shown in Figure 3-8
is assumed in the compression side (ACI 22.2).

3 - 32

Beam Design

Chapter 3 - Design Process

Figure 3-8 T-beam design

Flanged Beam Under Negative Moment
In designing for a factored negative moment, Mu (i.e., designing top steel), the
calculation of the steel area is exactly the same as described for a rectangular
beam, i.e., no T-Beam data is used.
Flanged Beam Under Positive Moment
If Mu > 0, the depth of the compression block is given by
a =−
d
d2 −

2M u
0.85 f ′c φ b f

where, the value of φ is taken as that for a tension controlled section, which is
0.90 by default (ACI 21.2.1, 21.2.2, Table 21.2.1, Table 21.2.2) in the preceding
and the following equations.
The maximum depth of the compression zone, cmax, is calculated based on the
limitation that the tensile steel tension shall not be less than εs,min, which is equal
to 0.005 for tension controlled behavior (ACI 9.3.3.1, 21.2.2, Fig 21.2.26):

cmax =

εc ,max
εc ,max + ε s ,min

where,

(ACI 22.2.1.2)

Beam Design

3 - 33

Concrete Frame Design ACI 318-14

εc,max = 0.003

(ACI 21.2.2, Fig 21.2.26)

εs,min = 0.005

(ACI 21.2.2, Fig 21.2.26)

The maximum allowable depth of the rectangular compression block, amax, is
given by
amax = β1cmax

(ACI 22.2.2.4.1)

where β1 is calculated as follows:
β1 = 0.85 – 0.05  f ′c − 4000  ,


1000



0.65 ≤ β1 ≤ 0.85

(ACI 22.2.2.4.3)

 If a ≤ ds, the subsequent calculations for As are exactly the same as previously
defined for the Rectangular section design. However, in that case, the width of
the beam is taken as bf, as shown in Figure 3-8. Compression reinforcement is
required if a > amax.
 If a > ds, the calculation for As has two parts. The first part is for balancing the
compressive force from the flange, Cf , and the second part is for balancing the
compressive force from the web, Cw, as shown in Figure 3-8. Cf is given by:

)

(

=
C f 0.85 f ′c b f − bw * min ( d s , amax )

Therefore, As1 =

Cf
fy

(ACI 22.2.2.4.1)

and the portion of Mu that is resisted by the flange is

given by:

min ( d s , amax ) 
M uf =
C f  d −
 φ.
2



Again, the value for φ is 0.90 by default. Therefore, the balance of the moment,
Mu, to be carried by the web is given by:
M=
M u − M uf .
uw

The web is a rectangular section of dimensions bw and d, for which the design
depth of the compression block is recalculated as:

3 - 34

Beam Design

Chapter 3 - Design Process

a1 =−
d
d2 −

2 M uw
.
0.85 f ′c φ bw

(ACI 22.2)

 If a1 ≤ amax (ACI 9.3.3.1, 21.2.2), the area of tensile steel reinforcement is then
given by:
As 2 =

M uw
, and
a1 

φ fy  d − 
2


A
As1 + As 2
=
s

This steel is to be placed at the bottom of the T-beam.
 If a1 > amax, compression reinforcement is required (ACI 9.3.3.1, 21.2.2, Fig
21.2.2b, 22.2.2.4.1) and is calculated as follows:
The compression force in the web concrete alone is given by:
C = 0.85 f ′c bw amax

(ACI 22.2.2.4.1)

Therefore the moment resisted by the concrete web and tensile steel is:
a

M
C  d − max
=
uc
2



 φ , and


the moment resisted by compression steel and tensile steel is:
M
=
M uw − M uc .
us

Therefore, the compression steel is computed as:
As′ =

M us
, where
( f ′s − 0.85 f ′c ) ( d − d ′) φ

c − d′
f ′s =
Es εc max  max
 ≤ fy.
 cmax 

(ACI 9.2.1.2, 9.5.2.1, 20.2.2, 22.2.1.2)

The tensile steel for balancing compression in the web concrete is:

Beam Design

3 - 35

Concrete Frame Design ACI 318-14

As 2 =

M uc
, and
a 

f y  d − max  φ
2 


the tensile steel for balancing the compression steel is:
As 3 =

M us
.
f y ( d − d ′) φ

The total tensile reinforcement is As = As1 + As 2 + As 3 , and the total compression reinforcement is As′ . As is to be placed at the bottom, and As′ is to be
placed at the top.
3.5.1.2.3

Minimum and Maximum Tensile Reinforcement

The minimum flexural tensile steel required in a beam section is given by the
minimum of the following two limits:
 3 f ′c

200
As ≥ max 
bw d ,
bw d 
fy
 f y

As ≥

4
As (required)
3

(ACI 9.6.1.2)

(ACI 9.6.1.3)

For T-beam in negative moment bw in the above expression is substituted by bw’,
where:
bw' = min {b f , 2bw }

(ACI 9.6.1.2)

An upper limit of 0.04 times the gross web area on both the tension reinforcement and the compression reinforcement is imposed as follows:
0.04bd Rectangular Beam
As ≤ 
0.04bw d T-Beam
0.04bd Rectangular Beam
As′ ≤ 
0.04bw d T-Beam

3 - 36

Beam Design

Chapter 3 - Design Process

For Special Moment Frames (seismic design), the beam design would satisfy the
following conditions:
 The minimum longitudinal reinforcement shall be provided at both the top and
bottom. Any of the top and bottom reinforcement shall not be less than As(min)
(ACI 18.6.3.1, 9.6.1.2).
 3 f ′c

200
As (min) ≥ max 
bw d ,
bw d  or
fy
 f y


(ACI 18.6.3.1, 9.6.1.2)

 The beam flexural steel is limited to a maximum given by
As ≤ 0.025 bw d.

(ACI 18.6.3)

 At any end (support) of the beam, the beam positive moment capacity (i.e.,
associated with the bottom steel) would not be less that 1/2 of the beam negative moment capacity (i.e., associated with the top steel) at that end (ACI
18.6.3.2).
 Neither the negative moment capacity nor the positive moment capacity at any
of the sections within the beam would be less than 1/4 of the maximum of
positive or negative moment capacities of any of the beam end (support)
stations (ACI 18.6.3.2).
For Intermediate Moment Frames (i.e., seismic design), the beam design would
satisfy the following conditions:
 At any support of the beam, the beam positive moment capacity would not be
less than 1/3 of the beam negative moment capacity at that end (ACI 18.4.2.2).
 Neither the negative moment capacity nor the positive moment capacity at any
of the sections within the beam would be less than 1/5 of the maximum of
positive or negative moment capacities of any of the beam end (support)
stations (ACI 18.4.2.2).

3.5.2

Design Beam Shear Reinforcement
The shear reinforcement is designed for each design load combination at a
user-defined number of stations along the beam span. The following steps are

Beam Design

3 - 37

Concrete Frame Design ACI 318-14

involved in designing the shear reinforcement for a particular station because of
beam major shear:
 Determine the factored shear force, Vu.
 Determine the shear force, Vc, that can be resisted by the concrete.
 Determine the reinforcement steel required to carry the balance.
For Special and Intermediate Moment frames (ductile frames), the shear design
of the beams is also based on the maximum probable moment strengths and the
nominal moment strengths of the members, respectively, in addition to the factored design. Effects of axial forces on the beam shear design are neglected.
The following three sections describe in detail the algorithms associated with
this process.

3.5.2.1 Determine Shear Force and Moment
 In the design of the beam shear reinforcement of an Ordinary Moment Frame,
the shear forces and moments for a particular design load combination at a
particular beam section are obtained by factoring the associated shear forces
and moments with the corresponding design load combination factors.
 In the design of Special Moment Frames (i.e., seismic design), the shear
capacity of the beam is also checked for the capacity shear resulting from the
maximum probable moment capacities at the ends along with the factored
gravity load. This check is performed in addition to the design check required
for Ordinary Moment Frames. The capacity shear force, Vp, is calculated from
the maximum probable moment capacities of each end of the beam and the
gravity shear forces. The procedure for calculating the design shear force in a
beam from the maximum probable moment capacity is similar to that
described for a column earlier in this chapter. See Table 3-1 for a summary.
The design shear force is given by (ACI 18.6.5.1, IBC 1901):

3 - 38

Vu = max {Ve1 ,Ve 2 }

(ACI 18.6.5.1, Fig R18.6.5)

Ve1 = V p1 + VD + L

(ACI 18.6.5.1, Fig R18.6.5)

Beam Design

Chapter 3 - Design Process

Ve 2 = V p 2 + VD + L

(ACI 18.6.5.1, Fig R18.6.5)

where Vp is the capacity shear force obtained by applying the calculated
maximum probable ultimate moment capacities at the two ends of the beams
acting in two opposite directions. Therefore, Vp is the maximum of Vp1 and Vp2,
where
Vp1 =

M I− + M J+
, and
L

Vp 2 =

M I+ + M J−
, where
L

M I− = Moment capacity at end I, with top steel in tension, using a steel
yield stress value of αfy and no reduction factors (φ = 1.0).

M J+ = Moment capacity at end J, with bottom steel in tension, using a
steel yield stress value of α fy and no reduction factors (φ = 1.0).

M I+ = Moment capacity at end I, with bottom steel in tension, using a
steel yield stress value of α fy and no reduction factors (φ = 1.0).

M J− = Moment capacity at end J, with top steel in tension, using a steel
yield stress value of α fy and no reduction factors (φ = 1.0).
L

= Clear span of beam.

The maximum probable moment strengths are determined using a strength
reduction factor of 1.0 and the reinforcing steel stress equal to α fy, where α is
equal to 1.25 (ACI 2.2, 18.6.5.1, R18.6.5). If the reinforcement area has not
been overwritten for ductile beams, the value of the reinforcing area envelope
is calculated after completing the flexural design of the beam for all the design
load combinations. Then this enveloping reinforcing area is used in calculating
the moment capacity of the beam. If the reinforcing area has been overwritten
for ductile beams, this area is used in calculating the moment capacity of the
beam. If the beam section is a variable cross-section, the cross-sections at the
two ends are used along with the user-specified reinforcing or the envelope of
reinforcing, as appropriate. If the user overwrites the major direction length

Beam Design

3 - 39

Concrete Frame Design ACI 318-14

factor, the full span length is used. However, if the length factor is not overwritten, the clear length will be used. In the latter case, the maximum of the
negative and positive moment capacities will be used for both the negative and
positive moment capacities in determining the capacity shear.
VD+L is the contribution of shear force from the in-span distribution of gravity
loads with the assumption that the ends are simply supported.
 For Intermediate Moment Frames, the shear capacity of the beam also is
checked for the capacity shear based on the nominal moment capacities at the
ends along with the factored gravity loads, in addition to the check required for
Ordinary moment resisting frames. The design shear force in beams is taken to
be the minimum of that based on the nominal moment capacity and modified
factored shear force.
Vu min {Ve ,Vef } ≥ Vu ,factored
=

(ACI 18.4.2.3)

where, Ve is the capacity shear force in the beam determined from the nominal
moment capacities of the beam (ACI 18.4.2.3a). The calculation of Ve is the
same as that described for Special Moment Frames, except that in determining
the flexural strength of the beam, nominal moment capacities are used. In that
case, φ is taken as 1.0 as before, but α is taken as 1.0 rather than 1.25 (ACI 2.2,
18.4.2.3, Fig 18.4.2).
Vef is the shear force in the beam obtained from the modified design load
combinations. In that case, the factored design forces (Pu, Vu, Mu) are based on
the specified design loads, except that the earthquake factors are doubled (ACI
18.4.2.3b). In no case is the beam designed for a shear force less than the
original factored shear force.
The computation of the design shear force in a beam of an Intermediate Moment
Frame is the same as described for columns earlier in this chapter. See Table 3-1
for a summary.

3.5.2.2 Determine Concrete Shear Capacity
The allowable concrete shear capacity is given by
Vc = 2λ f ′c bw d , where

3 - 40

Beam Design

(ACI 22.5.5.1)

Chapter 3 - Design Process

for Special Moment Frame design, if the factored axial compressive force, Pu,
including the earthquake effect, is less than f ′c Ag 20 , if the shear force contribution from earthquake, VE, is more than half of the total maximum shear
force over the length of the member Vu (i.e., VE ≥ 0.5 Vu), and if the station is
within a distance lo from the face of the joint, the concrete capacity Vc is taken as
zero (ACI 18.6.5.2). The length lo is taken as 2d from the face of the support
(ACI 18.6.5.2, 18.6.4.1).

3.5.2.3 Determine Required Shear Reinforcement
Given Vu and Vc the required shear reinforcement in area/unit length is calculated
as follows:
 The shear force is limited to a maximum of

(

)

Vmax= Vc + 8 f ′c bw d .

(ACI 22.5.1.2)

 The required shear reinforcement per unit spacing, Av/s, is calculated as follows:
If Vu ≤ (Vc 2 ) φ,
Av
= 0,
s

(ACI 9.6.3.1)

else if (Vc 2 ) φ < Vu ≤ φVmax ,
Av (Vu − φVc )
,
=
φ f ys d
s
 0.75 f ′c
Av
50 
≥ max 
bw ,
bw 

s
f ys
f ys 


(ACI 22.5.1.1, 22.5.10.1, 20.5.10.5.3)

(ACI 9.6.3.3, Table 9.6.3.3)

else if Vu > φVmax ,
a failure condition is declared.

(ACI 22.5.1.2)

Beam Design

3 - 41

Concrete Frame Design ACI 318-14

In the preceding equations, the strength reduction factor φ is taken as 0.75 for
non-seismic cases (ACI 21.2.1), and as 0.6 for seismic cases (ACI 21.2.1,
21.2.4). However, those values may be overwritten by the user if so desired.
If Vu exceeds the maximum permitted value of φVmax, the concrete section should
be increased in size (ACI 21.5.1.2).
Note that if torsion design is performed and torsion rebar is needed, the equation
given in ACI 9.6.3.3 does not need to be satisfied independently. See the next
section Design Beam Torsion Reinforcement for details.
The maximum of all of the calculated Av /s values, obtained from each design
load combination, is reported along with the controlling shear force and associated design load combination name.
The beam shear reinforcement requirements reported by the program are based
purely on shear strength considerations. Any minimum stirrup requirements to
satisfy spacing and volumetric consideration must be investigated independently
of the program by the user.

3.5.3 Design Beam Torsion Reinforcement
The torsion reinforcement is designed for each design load combination at a
user-defined number of stations along the beam span. The following steps are
involved in designing the shear reinforcement for a particular station because of
beam torsion:
 Determine the factored torsion, Tu.
 Determine special section properties.
 Determine critical torsion capacity.
 Determine the reinforcement steel required.

3 - 42

Beam Design

Chapter 3 - Design Process

3.5.3.1 Determine Factored Torsion
In the design of torsion reinforcement of any beam, the factored torsions for each
design load combination at a particular design station are obtained by factoring
the corresponding torsion for different load cases with the corresponding design
load combination factors (ACI 9.4.4.2).
In a statistically indeterminate structure where redistribution of the torsional
moment in a member can occur due to redistribution of internal forces upon
cracking, the design Tu is permitted to be reduced in accordance with code
(ACI 22.7.3.3). However, the program does not try to redistribute the internal
forces and to reduce Tu. If redistribution is desired, the user should release the
torsional DOF in the structural model.

3.5.3.2 Determine Special Section Properties
For torsion design, special section properties such as Acp, Aoh, Ao, pcp, and pn are
calculated. These properties are described as follows (ACI 2.2).
Acp

Area enclosed by outside perimeter of concrete cross-section

Aoh

Area enclosed by centerline of the outermost closed transverse
torsional reinforcement

Gross area enclosed by shear flow path

pcp

Outside perimeter of concrete cross-section

Perimeter of centerline of outermost closed transverse torsional
reinforcement

In calculating the section properties involving reinforcement, such as Aoh, Ao,
and pn, it is assumed that the distance between the centerline of the outermost
closed stirrup and the outermost concrete surface is 1.75 inches. This is equivalent to 1.5 inches clear cover and a #4 stirrup placement. For torsion design of
T-Beam sections, it is assumed that placing torsion reinforcement in the flange
area is inefficient. With this assumption, the flange is ignored for torsion reinforcement calculation. However, the flange is considered during Tcr calculation.
With this assumption, the special properties for a Rectangular beam section are
given as follows:

Beam Design

3 - 43

Concrete Frame Design ACI 318-14

Acp

bh,

(ACI 2.2, R22.7.5)

Aoh

( b − 2c )( h − 2c ) ,

(ACI 2.2, R22.7, Fig R22.7.6.1.1)

0.85 Aoh,

(ACI 22.7.6.1.1, Fig R22.7.6.1.1)

pcp

2b + 2h, and

2 ( b − 2c ) + 2 ( h − 2c ) ,

(ACI 2.2, R22.7.5)
(ACI 22.7.6.1, Fig R22.7.6.1.1)

where, the section dimensions b, h and c are shown in Figure 3-9. Similarly, the
special section properties for a T-Beam section are given as follows:
Acp

bw h + ( b f − bw ) ds ,

(ACI 2.2, R22.7.5)

Aoh

( bw − 2c )( h − 2c ) ,

(ACI 2.2, R22.7, Fig R22.7.6.1.1)

0.85 Aoh,

(ACI 22.7.6.1.1, Fig R22.7.6.1.1)

pcp

2bf + 2h, and

2 ( h − 2c ) + 2 ( bw − 2c ) ,

(ACI 2.2, R22.7.5)
(ACI 2.2, Fig R22.7.6.1.1)

where the section dimensions bf, bw, h, ds and c for a T-beam are shown in
Figure 3-9.

3.5.3.3 Determine Critical Torsion Capacities
The threshold torsion limit, Tth, and the cracking torsion limits, Tcr, for which the
torsion in the section can be ignored, are calculated as follows:
2
 Acp

Pu
Tth =
λ f c′ 
1+

 pcp 
4 Ag λ f c′



 Acp2
4λ f c′ 
Tcr =

 pcp

3 - 44

Beam Design


Pu
 1 +
4 Ag λ f c′


(ACI 22.7.4.1, Table 22.7.4.1a)

(ACI 22.7.5.1, Table 22.7.5.1)

Chapter 3 - Design Process

where Acp and pcp are the area and perimeter of concrete cross-section as
described in detail in the previous section, Pu is the factored axial force
(compression positive), φ is the strength reduction factor for torsion, which is
equal to 0.75 by default (ACI 21.2.1g, Table 21.2.1c), and f c′ is the specified
concrete strength.
c

b − 2c

h − 2c

c
bw − 2c

bw
Closed Stirrup in
Rectangular Beam

Closed Stirrup in
T-Beam Section

Figure 3-9 Closed stirrup and section dimensions for torsion design

3.5.3.4 Determine Torsion Reinforcement
If the factored torsion Tu is less than the threshold limit, φTth, torsion can be
safely ignored (ACI 22.7.1.1, 9.6.4.1). In that case, the program reports that no
torsion is required. However, if Tu exceeds the cracking torsion limit, φTcr, it is
assumed that the torsional resistance is provided by closed stirrups, longitudinal
bars, and compression diagonals (ACI 22.7.1, 22.7.6.1). If Tu is greater than φTth
but less than φTcr, only minimum tension rebar needs to be provided (ACI
9.6.4.1).
If Tu > Tcr, the required longitudinal rebar area is calculated as:
Al =

Tu ph tan θ
φ2 A0 f y tanθ

(ACI 22.7.6.1)

and the required closed stirrup area per unit spacing, At /s, is calculated as:

Beam Design

3 - 45

Concrete Frame Design ACI 318-14

At
T tanθ
= u
s φ2 A0 f ys

(ACI 22.7.6.1)

and the minimum value of Al is taken as the least of the following:
Al ,min ≥

=
Al ,min

5 f c′ Acp
fy
5 f c' Acp
fy

 A   f ys 
−  t  ph 

 s   f y 

(ACI 9.6.4.3a)

 25   f ys 
−
b p
 f ys w  h  f y 

 


(ACI 9.6.4.3b)

In the preceding expressions, θ is taken as 45 degrees. The code allows any value
between 30 and 60 degrees (ACI).
An upper limit of the combination of Vu and Tu that can be carried by the section
is also checked using the following equation.
2

 Vu   Tu ph 
 V

≤ φ  c + 8 f c′ 

 +
2 
 bw d   1.7 Aoh 
 bw d


(ACI)

For rectangular sections, bw is replaced with b. If the combination of Vu and Tu
exceeds this limit, a failure message is declared. In that case, the concrete section
should be increased in size.
When torsional reinforcement is required (Tu > φTth), the area of transverse
closed stirrups and the area of regular shear stirrups satisfy the following limit.


f c′
50 
At 
 Av

 s + 2 s  ≥ max 0.75 f bw , f bw 


ys
y



(ACI 9.6.4.2)

If this equation is not satisfied with the originally calculated Av s and At s ,
Av s is increased to satisfy this condition. In that case, Av s does not need to
satisfy ACI Section 9.6.3.3 independently.
The maximum of all the calculated At and At s values obtained from each design
load combination is reported along with the controlling combination names.

3 - 46

Beam Design

Chapter 3 - Design Process

The beam torsion reinforcement requirements reported by the program are based
purely on strength considerations. Any minimum stirrup requirements and longitudinal rebar requirements to satisfy spacing considerations must be investigated independently of the program by the user.

3.6

Joint Design
To ensure that the beam-column joint of Special Moment Frames possesses
adequate shear strength, the program performs a rational analysis of the
beam-column panel zone to determine the shear forces that are generated in the
joint. The program then checks this against design shear strength.
Only joints having a column below the joint are checked. The material properties
of the joint are assumed to be the same as those of the column below the joint.
The joint analysis is completed in the major and the minor directions of the
column. The joint design procedure involves the following steps:
 Determine the panel zone design shear force,

Vuh

 Determine the effective area of the joint
 Check panel zone shear stress
The algorithms associated with these three steps are described in detail in the
following three sections.

3.6.1

Determine the Panel Zone Shear Force
Figure 3-10 illustrates the free body stress condition of a typical beam-column
intersection for a column direction, major or minor.

Joint Design

3 - 47

Concrete Frame Design ACI 318-14

Figure 3-10 Beam-column joint analysis

3 - 48

Joint Design

Chapter 3 - Design Process

The force Vuh is the horizontal panel zone shear force that is to be calculated.
The forces that act on the joint are Pu, Vu, MuL , and M uR . The forces Pu and Vu
are axial force and shear force, respectively, from the column framing into the
top of the joint. The moments M uL and M uR are obtained from the beams
framing into the joint. The program calculates the joint shear force Vuh by resolving the moments into C and T forces. Noting that TL = CL and TR = CR,

Vuh = TL + TR − Vu
The location of C or T forces is determined by the direction of the moment. The
magnitude of C or T forces is conservatively determined using basic principles
of ultimate strength theory (ACI 22.2).
The moments and the forces from beams that frame into the joint in a direction
that is not parallel to the major or minor direction of the column are resolved
along the direction that is being investigated, thereby contributing force components to the analysis.
In the design of Special Moment Resisting concrete frames, the evaluation of the
design shear force is based on the moment capacities (with reinforcing steel
overstrength factor, α, where, α = 1.25 and no φ factors) of the beams framing
into the joint (ACI 18.8.2.1). The C and T force are based on these moment
capacities. The program calculates the column shear force Vu from the beam
moment capacities, as follows (see Figure 3-5):

Vu =

M uL + M uR
H

It should be noted that the points of inflection shown on Figure 3-5 are taken as
midway between actual lateral support points for the columns. If no column
exists at the top of the joint, the shear force from the top of the column is taken as
zero.
The effects of load reversals, as illustrated in Case 1 and Case 2 of Figure 3-10,
are investigated, and the design is based on the maximum of the joint shears
obtained from the two cases.

Joint Design

3 - 49

Concrete Frame Design ACI 318-14

3.6.2

Determine the Effective Area of Joint
The joint area that resists the shear forces is assumed always to be rectangular in
plan view. The dimensions of the rectangle correspond to the major and minor
dimensions of the column below the joint, except if the beam framing into the
joint is very narrow. The effective width of the joint area to be used in the calculation is limited to the width of the beam plus the depth of the column. The
area of the joint is assumed not to exceed the area of the column below. The joint
area for joint shear along the major and minor directions is calculated separately
(ACI 18.8.4.3, Fig R18.8.4).
It should be noted that if the beam frames into the joint eccentrically, the preceding assumptions may not be conservative and the user should investigate the
acceptability of the particular joint.

3.6.3

Check Panel Zone Shear Stress
The panel zone shear stress is evaluated by dividing the shear force by the
effective area of the joint and comparing it with the following design shear
strengths (ACI 21.5.3).
20φλ f ′c
for joints confined on all four sides ,

15φλ f ′c
for joints confined on three faces or
(ACI 18.8.4.1, Table 18.8.4.1)
v=
on
two
opposite
faces ,


for all other joints,
12φλ f ′c

where φ = 0.85 (by default).
A beam that frames into a face of a column at the joint is considered in this
program to provide confinement to the joint if at least three-quarters of the face
of the joint is covered by the framing member.
The factor λ shall nominally be 0.75 for light-weight concrete and 1.0 for normal
weight concrete (ACI Table 18.8.4.1). However, the program allows the user to
define the value while defining concrete material properties. The program uses
the user input values for λ.

3 - 50

Joint Design

Chapter 3 - Design Process

3.6.4

Beam-Column Flexural Capacity Ratios
The program calculates the ratio of the sum of the beam moment capacities to
the sum of the column moment capacities. For Special Moment Frames, at a
particular joint for a particular column direction, major or minor (ACI 18.7.3.6):
6

∑ M nc ≥ 5 ∑ M nb
∑ M nc

(ACI 18.7.3.6)

= Sum of nominal flexural strengths of columns framing into the
joint, evaluated at the faces of the joint. Individual column
flexural strength is calculated for the associated factored axial
force.

∑ M nb

= Sum of nominal flexural strengths of the beams framing into
the joint, evaluated at the faces of the joint.

The capacities are calculated with no reinforcing overstrength factor α, α = 1,
and with no φ factors (φ = 1.0). The beam capacities are calculated for reversed
situations (Cases 1 and 2) as illustrated in Figure 3-10 and the maximum summation obtained is used.
The moment capacities of beams that frame into the joint in a direction that is not
parallel to the major or minor direction of the column are resolved along the
direction that is being investigated and the resolved components are added to the
summation.
The column capacity summation includes the column above and the column
below the joint. For each load combination, the axial force, Pu, in each of the
columns is calculated from the program design load combinations. For each
design load combination, the moment capacity of each column under the influence of the corresponding axial load is then determined separately for the
major and minor directions of the column, using the uniaxial column interaction
diagram; see Figure 3-11. The moment capacities of the two columns are added
to give the capacity summation for the corresponding design load combination.
The maximum capacity summations obtained from all of the design load combinations is used for the beam-column capacity ratio.

Joint Design

3 - 51

Concrete Frame Design ACI 318-14

Figure 3-11 Moment capacity Mu at a given axial load Pu

The beam-column capacity ratio is determined for a beam-column joint only
when the following conditions are met:
 the frame is a Special Moment Frame
 when a column exists above the beam-column joint, the column is concrete
 all of the beams framing into the column are concrete beams
 the connecting member design results are available
 the load combo involves seismic load
The beam-column flexural capacity ratios (∑ M nb ∑ M nc ) are reported only for
Special Moment Resisting frames involving seismic design load combinations.
3 - 52

Joint Design

Chapter 3 - Design Process

If this ratio is greater than 5/6, a warning message is printed in the output. The
ratio is also reported in the form of 6 5 ∑ M nb M nc and ∑ M nc ∑ M nb .

( )

3.7

Summary of Special Considerations for Seismic
Design
The similarities and differences of special consideration for column design/
check, beam design, and joint design checks are reported in Table 3-1.
For Special Moment Frames (seismic design), the beam design satisfies the
following additional conditions (see also Table 3-1):

Table 3-1: Design Criteria
Type of
Check/
Design

Intermediate
Moment Frames
(Seismic)

Special
Moment Frames
(Seismic)

Specified
Combinations

1% < ρ < 8%

1% < ρ < 6%

Ordinary
Moment Frames
(Non-Seismic)

Column Check (interaction)
Specified
Combinations
Column Design (interaction)

Column Shears
Specified
Combinations
(If SDC = B,
and h/B ≤ 5,
same as Intermediate)

Modified Combinations
Specified
(earthquake load is increased by Combinations
Ωo)
Column Capacity Shear
Column Capacity Shear
φ = 1.0 and α = 1.25
Vc = 0 (conditional)
φ = 1.0 and α = 1.0

Summary of Special Considerations for Seismic Design

3 - 53

Concrete Frame Design ACI 318-14

Table 3-1: Design Criteria
Type of
Check/
Design

Intermediate
Moment Frames
(Seismic)

Special
Moment Frames
(Seismic)

Specified
Combinations

ρ ≤ 0.04

ρ ≤ 0.025

3 fc'
200
, ρ≥
ρ≥
fy
fy

ρ≥

Ordinary
Moment Frames
(Non-Seismic)

Beam Design Flexure

As (min) ≥

4
As ( required )
3

3 fc'
200
, ρ≥
fy
fy

ρ≥

3 fc'
200
, ρ≥
fy
fy

As (min) ≥

4
As ( required )
3

As (min) ≥

4
As ( required )
3

Beam Minimum Moment Override Check
No Requirement

1 −
+
M u ,end ≥ M u ,end
3

{

}

+
−
max M u ,M u

}max

1
+
+
−
M u ,span ≥ max M u ,M u
end
5
M

−
u ,span

≥

1
5

{

1 −
+
M u ,end ≥ M u ,end
2
1
+
+
−
M u ,span ≥ max M u ,M u
4
end

{
}
1
−
+
−
M u ,span ≥ max {M u ,M u }
4
end

Beam Design Shear
Specified
Combinations

Modified Specified Combinations Specified
Combinations
(earthquake loads doubled)
Beam Capacity Shear (Ve)
with φ = 1.0
and α = 1.0 plus VD+L

Beam Capacity Shear (Ve)
with φ = 1.0
and α = 1.25 plus VD+L
Vc = 0 (conditional)

Joint Design
No Requirement

No Requirement

Checked for shear

No Requirement

Checked

Beam/Column Capacity Ratio
No Requirement

3 - 54

Summary of Special Considerations for Seismic Design

APPENDICES

Appendix A
Second Order P-Delta Effects

Typically, design codes require that second order P-Delta effects be considered
when designing concrete frames. These effects are the global lateral translation
of the frame and the local deformation of members within the frame.
Consider the frame object shown in Figure A-1, which is extracted from a story
level of a larger structure. The overall global translation of this frame object is
indicated by ∆. The local deformation of the member is shown as δ. The total
second order P-Delta effects on this frame object are those caused by both ∆ and
δ.
The program has an option to consider P-Delta effects in the analysis. When
P-Delta effects are considered in the analysis, the program does a good job of
capturing the effect due to the ∆ deformation shown in Figure A-1, but it does
not typically capture the effect of the δ deformation (unless, in the model, the
frame object is broken into multiple elements over its length).
Consideration of the second order P-Delta effects is generally achieved by
computing the flexural design capacity using a formula similar to that shown in
the following equation.

A-1

Concrete Frame Design ACI 318-14

Figure A-1 The total second order P-delta effects on a
frame element caused by both ∆ and δ

MCAP =

aMnt + bMlt

where,
MCAP =

Flexural design capacity required

Mnt

Required flexural capacity of the member assuming there is no
joint translation of the frame (i.e., associated with the δ deformation in Figure A-1)

Mlt

Required flexural capacity of the member as a result of lateral
translation of the frame only (i.e., associated with the ∆ deformation in Figure A-1)

Unitless factor multiplying Mnt

Unitless factor multiplying Mlt (assumed equal to 1 by the program;
see the following text)

When the program performs concrete frame design, it assumes that the factor b
is equal to 1 and calculates the factor a. That b = 1 assumes that P-Delta
effects have been considered in the analysis, as previously described. Thus, in
general, when performing concrete frame design in this program, consider
P-Delta effects in the analysis before running the program.

A-2

Appendix A

Appendix B
Member Unsupported Lengths and
Computation of K-Factors

The column unsupported lengths are required to account for column slenderness
effects. The program automatically determines the unsupported length
ratios, which are specified as a fraction of the frame object length. Those ratios
times the frame object length give the unbraced lengths for the members. Those
ratios also can be overwritten by the user on a member-by-member
basis, if desired, using the overwrite option.
There are two unsupported lengths to consider. They are l33 and l22, as shown in
Figure B-1. These are the lengths between support points of the member in the
corresponding directions. The length l33 corresponds to instability about the 3-3
axis (major axis), and l22 corresponds to instability about the 2-2 axis (minor
axis).
In determining the values for l22 and l33 of the members, the program recognizes
various aspects of the structure that have an effect on those lengths, such as
member connectivity, diaphragm constraints and support points. The program
automatically locates the member support points and evaluates the corresponding unsupported length.

B-1

Concrete Frame Design ACI 318-14

It is possible for the unsupported length of a frame object to be evaluated by the
program as greater than the corresponding member length. For example, assume
a column has a beam framing into it in one direction, but not the other, at a floor
level. In that case, the column is assumed to be supported in one direction only at
that story level, and its unsupported length in the other direction will exceed the
story height.

Figure B-1 Axis of bending and unsupported length

B-2

Appendix B

Appendix C
Concrete Frame Design Preferences

The concrete frame design preferences are general assignments that are applied
to all of the concrete frame members. The design preferences should be
reviewed and any changes from the default values made before performing a
design. The following table lists the design preferences that are specific to using
ACI 318-14; the preferences that are generic to all codes are not included in this
table.
Table C-1 Preferences
Item

Possible
Values

Default
Value

Envelopes,
Multi-Response
Step-by-Step, Step-by-step
Case
Last Step, and
ALL
Design
so on

Number
Interaction

Multiple of 4

Description
Options for design load combinations
that include a multi-valued case time
history, nonlinear static, or multi-step
static. If a single design load
combination has more than one time
history case in it, that design load
combination is based on the envelopes
of the time histories, regardless of what
is specified here.
Number of equally spaced interaction
curves used to create a full 360 deg

C-1

Concrete Frame Design ACI 318-14

Item
Curves

Possible
Values
≥4

Number of Inter- Any odd value
action Points
≥5

Default
Value

Description
interaction surface (this item should be
a multiple of four). We recommend 24
for this item.

Number of points used for defining a
single curve in a concrete frame;
should be odd.

Consider
Minimum
Eccentricity

No, Yes

Seismic
Design
Category

A, B, C,
D, E, F

Phi
(Tension
Controlled)

0.9

Phi
(Compression
Controlled-Tied)

0.65

The strength reduction factor for
compression controlled sections with
spiral reinforcement.

Phi
(Compression
Controlled-Spiral)

0.75

The strength reduction factor for
compression controlled sections with
spiral reinforcement.

Phi
(Shear and/ or
Torsion)

0.75

Yes

Toggle to specify if minimum eccentricity is considered in design.

This item varies with the Seismic
Hazard Exposure Group and the
effective Peak Velocity Related
Acceleration.
Strength reduction factor for tension
controlled sections.

The strength reduction factor for shear
and torsion.

Phi
(Shear - Seismic)

0.60

The strength reduction factor for shear
in structures that rely on special
moment resisting frames or special
reinforced concrete structural walls to
resist earthquake effects.

Phi (Joint Shear)

0.85

The strength reduction factor for shear
and torsion.

C-2

Appendix C

Concrete Frame Design Preferences

Item

Possible
Values

Default
Value

Description

Pattern Live
Load Factor

≥0

0.75

The pattern load factor is used to
compute positive live load moment by
multiplying Live load with Pattern Load
Factor (PLF) and assuming that the
beam is simply supported. This option
provides a limited pattern loading to
frames. Use zero to turn off this option.

Utilization
Factor Limit

1.0

Stress ratios that are less than or equal
to this value are considered
acceptable.

Appendix C

C-3

Appendix D
Concrete Frame Overwrites

The concrete frame design overwrites are basic assignments that apply only to
those elements to which they are assigned. Table D-1 lists concrete frame design
overwrites for ACI 318-14. Default values are provided for all overwrite items.
Thus, it is not necessary to specify or change any of the overwrites. However, at
least review the default values to ensure they are acceptable. When changes are
made to overwrite items, the program applies the changes only to the elements to
which they are specifically assigned.
Table D-1 Overwrites
Item

Possible
Values

Default
Value

Current
Design
Section

Any defined
concrete
section

Analysis
section

Element
Type

Sway
Special, Sway
Intermediate,
Sway Ordinary,
NonSway

From
Reference

Description
The design section for the selected frame
objects.
Frame type in accordance with the moment frame definition given in ACI 21.1.
The Framing Type is used for ductility
considerations in the design. The program determines its default value based
on the Seismic Design Category (SDC)
assigned for the structure in the Preferences. If the assigned SDC is A or B, the
D-1

Concrete Frame Design ACI 318-14

Item

Possible
Values

Default
Value

Description
Framing Type is set to Ordinary. If the
assigned SDC is C, the Framing Type is
set to Intermediate. If the assigned SDC
is D, E, or F, the Framing Type is set to
special (IBC 1908.1.2). These are default
values, which the user can overwrite if
needed.

Live Load
Reduction
Factor

Unbraced
Length Ratio
(Major)

Unbraced
Length Ratio
(Minor)

Effective
Length
Factor
(K Major)

D-2

Appendix D

≥0

Calculated

The reduced live load factor. A reducible
live load is multiplied by this factor to
obtain the reduced live load for the frame
object. Specifying 0 means the value is
program determined.

Calculated

Unbraced length factor for buckling about
the frame object major axis. This item is
specified as a fraction of the frame object
length. Multiplying this factor times the
frame object length gives the unbraced
length for the object. Specifying 0 means
the value is program determined.

0.60

Unbraced length factor for buckling about
the frame object minor axis. Multiplying
this factor times the frame object length
gives the unbraced length for the object.
Specifying 0 means the value is program
determined. This factor is also used in
determining the length for lateral-torsional
buckling.

Calculated

See ACI 10.10 and Figure R10.10.1.1.
Effective length factor for buckling about
the frame object major axis. This item is
specified as a fraction of the frame object
length.

References

ACI, 2014. Building Code Requirements for Structural Concrete (ACI 318-14)
and Commentary (ACI 318R-14), American Concrete Institute, 38800
Country Club Drive, Farmington Hills, Michigan, 48331.
ASCE, 2010. Minimum Design Loads for Buildings and Other Structures,
American Society of Civil Engineers, 1801 Alexander Bell Drive, Reston,
Virginia, 20191.
CSI, 2014. CSI Analysis Reference Manual, Computers and Structures, Inc.,
Walnut Creek, California.
ICC, 2012. International Building Code, International Code Council, Inc., 4051
West Flossmoor Road, Country Club Hills, Illinois, 60478.
White, D. W. and J. F. Hajjar, 1991. “Application of Second-Order Elastic
Analysis in LRFD: Research to Practice,” Engineering Journal, American
Institute of Steel Construction, Inc., Vol. 28, No. 4.

References - i

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