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Page 1 DISPLACEMENT METHOD OF ANALYSIS (MOMENT DISTRIBUTION METHOD) S 1. INTRODUCTION It is a displacement method for analysis of statically indeterminate beams and frames developed by Hardy Cross. The method only accounts for flexural effects and ignores axial and shear effects. In this method it is assumed in the beginning that all joints of the structure are fixed. Then by locking and unlocking each joint in succession, the internal moments are distributed such that each joint attains its final position. 2. IMPORTANT DEFINITIONS 2.1. Stiffness Factor Stiffness factor can be defined as the moment required to produce unit rotation in the beam. Stiffness factor for various cases is defined as follows. Case 1: Far end is fixed == 4EI Stiffness factor s l Case 2: Far end is hinged ?????????????????? ???????????? = ?? = 3???? ?? 2.2. Relative stiffness (k) Relative stiffness is the relative value of the stiffness factor. It is value for various cases can be expressed as follows. Case 1: Far end is fixed = I k L Case 2: Far end is hinged = 3I k 4L Case 3: Far end is free K = 0 Page 2 DISPLACEMENT METHOD OF ANALYSIS (MOMENT DISTRIBUTION METHOD) S 1. INTRODUCTION It is a displacement method for analysis of statically indeterminate beams and frames developed by Hardy Cross. The method only accounts for flexural effects and ignores axial and shear effects. In this method it is assumed in the beginning that all joints of the structure are fixed. Then by locking and unlocking each joint in succession, the internal moments are distributed such that each joint attains its final position. 2. IMPORTANT DEFINITIONS 2.1. Stiffness Factor Stiffness factor can be defined as the moment required to produce unit rotation in the beam. Stiffness factor for various cases is defined as follows. Case 1: Far end is fixed == 4EI Stiffness factor s l Case 2: Far end is hinged ?????????????????? ???????????? = ?? = 3???? ?? 2.2. Relative stiffness (k) Relative stiffness is the relative value of the stiffness factor. It is value for various cases can be expressed as follows. Case 1: Far end is fixed = I k L Case 2: Far end is hinged = 3I k 4L Case 3: Far end is free K = 0 2.3. Distribution Factor It is the ratio in which the applied moment is distributed to various members meeting at a rigid point. Sum of distribution factor of all members meeting at a rigid joint is one. If far end is free, its D, k and distribution factor is zero. ???? = ?? S?? Where, K = Relative stiffness of the member ?K = Summation of relative stiffness of all members meeting at a joint 2.4. Carry over moment It is the moment developed at one end due to applied moment at the other end. It is developed to make the slope zero. It is exerted by the fixed support on the beam. It is developed to make slope zero not to keep the structure in equilibrium. Various case for carry over moment are as follows. Case 1: Far end is fixed = M COM 2 Case 2: Far end is hinged COM = 0 2.5. Carry Over Factor Carry over factor can be defined as the ratio of carry over moment and applied moment. Carry over factor for various cases can be given as follows. Case 1: Far end is fixed == M1 COF 2 2 M Case 2: Far end is hinged ?????? = 0 ?? = 0 3. ANALYSIS OF BEAMS USING MOMENT DISTRIBUTION METHOD 3.1. Sign convention (i) Clockwise end moments and clockwise rotations are taken as positive. Anti-clockwise end moments and anti-clockwise rotations are taken as negative. (ii) Bending moment which is sagging in nature are taken as positive and hogging bending moment is taken as negative. 3.2. Procedure Step 1: Find out Distribution factors and fixed end moments. Step 2: Assume all joints to be initially locked. Then Determine the moment needed to bring each joint in equilibrium. Release the joints and distribute the counterbalancing moment into the connecting span at each joint. Carry these moments in each span over to its other end. Repeat the same cycle until the moment equilibrium at the joint achieved. .Read More
FAQs on Short Notes: Displacement Method of Analysis (Moment Distribution Method) - Short Notes for Civil Engineering - Civil Engineering (CE)
| 1. What is the Displacement Method of Analysis? |  |
Ans. The Displacement Method of Analysis, also known as the Moment Distribution Method, is a structural analysis technique used to determine the moments at the ends of each member in a structure by considering the relative stiffness of the members.
| 2. How does the Displacement Method work in structural analysis? | |
Ans. In the Displacement Method, the structure is idealized as a series of interconnected members. The moments at the ends of each member are calculated by distributing the applied loads and re-distributing the moments until equilibrium is achieved.
| 3. What are the advantages of using the Displacement Method of Analysis? | |
Ans. The Displacement Method is advantageous because it can handle complex structures with non-uniform stiffness, provides accurate results for continuous beams and frames, and allows for the consideration of second-order effects.
| 4. When should the Displacement Method be used in structural analysis? | |
Ans. The Displacement Method is commonly used for analyzing statically indeterminate structures such as continuous beams, frames, and trusses. It is particularly useful when dealing with structures that exhibit non-linear behavior.
| 5. What are the limitations of the Displacement Method of Analysis? | |
Ans. Some limitations of the Displacement Method include the need for iterative calculations, the complexity of applying the method to three-dimensional structures, and the assumption of linear-elastic behavior in the members.
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