In structural analysis, the point of contraflexure along a beam is defined as the location where which characteristic of the bending moment (B.M.) diagram occurs?
Correct Answer: B.M. changes sign
Introduction / Context:The point of contraflexure (also called the inflection point) is central to understanding beam behavior, especially in indeterminate structures or members with variable loading. It indicates a change in curvature and is relevant for reinforcement detailing and splicing decisions.
Given Data / Assumptions:
- We consider typical beam behavior with continuous or varying loads.
- The bending moment diagram (B.M. diagram) may pass through zero between positive and negative regions.
Concept / Approach:Beam curvature is proportional to bending moment (for prismatic, linear-elastic beams: curvature κ ≈ M / (E I)). A change in sign of M implies a change in curvature direction (sagging to hogging or vice versa). The location where M = 0 within the span (not at a free end with zero moment by boundary) is the point of contraflexure.
Step-by-Step Solution:1) Plot or envision the B.M. diagram for the given loading.2) Identify where M crosses zero within the member length.3) Mark that location as the point of contraflexure.4) Recognize that curvature changes sign there, indicating a shift from sagging to hogging or vice versa.
Verification / Alternative check:In continuous beams over multiple supports, points of contraflexure commonly occur between supports where the B.M. diagram transitions through zero between negative and positive peaks.
Why Other Options Are Wrong:
- B.M. maximum/minimum: These are extremum points where shear force is zero, not necessarily points of sign change.
- S.F. is zero: Zero shear indicates a B.M. extremum, not inherently a sign change.
Common Pitfalls:
- Confusing zero shear (extreme B.M.) with zero moment (contraflexure).
- Marking support ends (where M = 0 by boundary) as contraflexure without a sign change in the span.
Final Answer:B.M. changes sign.