Determine the tension developed in each wire which is needed to support the 40-lb flowerpot.(Figure 1)

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**Problem Statement:** Determine the tension developed in each wire needed to support the 40-lb flowerpot. **Part B:** - Draw the free-body diagram of the ring \( C \). - Draw the vectors starting at the black dot. The location and orientation of the vectors will be graded. **Diagram Explanation:** The figure illustrates a setup with a flowerpot suspended by wires. The wires are connected to points on two opposing walls, labeled as points \( A \) and \( B \). The wires form a triangle with these points and two additional points \( C \) and \( D \). - **Points and Angles:** - \( A \) and \( B \) are anchored on the walls. - At point \( C \), the angle between the wire \( AC \) and the horizontal is \( 45^\circ \). - At point \( D \), the angle between the wire \( BD \) and the horizontal is also \( 45^\circ \). - The wires \( CE \) and \( DE \) connect down to the flowerpot at point \( E \), with each making an angle of \( 30^\circ \) with the vertical from points \( C \) and \( D \), respectively. **Instructions:** Select the elements from the list and add them to the canvas, setting the appropriate attributes for solving the problem. Submit your free-body diagram once completed.