**Problem Statement:** Solve for the support reactions at points A and B. **Diagram Explanation:** - The diagram shows a beam ABC supported at two points, A and B. - The beam is horizontal and rests on a surface indicated by hatching. - Point A is a fixed support (triangle symbol) on the left end of the beam. - Point B is a roller support (circle under the beam) placed 3 meters from point A. - There is a uniformly distributed load (UDL) over the entire 4 meters of the beam starting from point A. - The intensity of the UDL is \( w = 15 \, \text{kN/m} \). - The beam extends 3 meters beyond point B to point C, totaling 6 meters in length. - Dimensions are provided: 4 meters for the length of the UDL, and 3 meters from A to B, and B to C.

Problem Statement: Solve for the support reactions at points A and B. Diagram Explanation: - The diagram shows a beam ABC supported at two points, A and B. - The beam is horizontal and rests on a surface indicated by hatching. - Point A is a fixed support (triangle symbol) on the left end of the beam. - Point B is a roller support (circle under the beam) placed 3 meters from point A. - There is a uniformly distributed load (UDL) over the entire 4 meters of the beam starting from point A. - The intensity of the UDL is \( w = 15 \, \text{kN/m} \). - The beam extends 3 meters beyond point B to point C, totaling 6 meters in length. - Dimensions are provided: 4 meters for the length of the UDL, and 3 meters from A to B, and B to C.

Structural Analysis

6th Edition

ISBN:9781337630931

Author:KASSIMALI, Aslam.

Publisher:KASSIMALI, Aslam.

Chapter2: Loads On Structures

Section: Chapter Questions

Problem 1P

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Question

**Problem Statement:**

Solve for the support reactions at points A and B.

**Diagram Explanation:**

- The diagram shows a beam ABC supported at two points, A and B.
- The beam is horizontal and rests on a surface indicated by hatching.
- Point A is a fixed support (triangle symbol) on the left end of the beam.
- Point B is a roller support (circle under the beam) placed 3 meters from point A.
- There is a uniformly distributed load (UDL) over the entire 4 meters of the beam starting from point A.
- The intensity of the UDL is \( w = 15 \, \text{kN/m} \).
- The beam extends 3 meters beyond point B to point C, totaling 6 meters in length.
- Dimensions are provided: 4 meters for the length of the UDL, and 3 meters from A to B, and B to C.

Expert Solution

Step 1

Answer:-

In this question we will use the equation of equilibrium so that we will get one equation . By taking moment about B we will get another equation . By solving them we will get our reactions.