7.1 Four pulling forces of 100 N, 200 N, 300 N and 185 N are acting from the same acting point, as shown in FIGURE 7.1 - NSC Mechanical Technology Welding and Metalwork - Question 7 - 2016 - Paper 1

Given:

• Load (F) = 40 kN = $40 \times 10^3$ N
• Tensile stress ($\sigma$) = 20 MPa = $20 \times 10^6$ Pa

Using the formula for tensile stress: $\sigma = \frac{F}{A}$ Where: $A$ is the cross-sectional area.

Thus, we rearrange the formula: $A = \frac{F}{\sigma} = \frac{40 \times 10^3}{20 \times 10^6} = 2 \times 10^{-3} \text{ m}^2$

The area of a circle is given by: $A = \frac{\pi D^2}{4}$

Setting the two area equations equal to each other: $\frac{\pi D^2}{4} = 2 \times 10^{-3} \Rightarrow D^2 = \frac{4 \times 2 \times 10^{-3}}{\pi}$ $D = \sqrt{\frac{4 \times 2 \times 10^{-3}}{\pi}} = 0.05046 \text{ m} \approx 50.46 \text{ mm}$

Strain is defined as the ratio of change in length to the original length.

Using: $\text{Strain} = \frac{\sigma}{E}$ Where:

• Young's modulus (E) = 90 GPa = $90 \times 10^9$ Pa
• Tensile stress ($\sigma$) = 20 MPa = $20 \times 10^6$ Pa

Thus: $\text{Strain} = \frac{20 \times 10^6}{90 \times 10^9} = 0.22 \times 10^{-3}$

The change in length ($ΔL$) can be calculated using: $\text{Strain} = \frac{\Delta L}{L_0}$ Where:

• $L_0 = 300 \text{ mm} = 0.3 \text{ m}$

Rearranging gives: $\Delta L = \text{Strain} \times L_0 = (0.22 \times 10^{-3}) \times 0.3 = 0.07 \text{ m}$ So, $ΔL \approx 0.07 ext{ m}$.

To find the reactions at supports A and B, we can apply the equilibrium of moments.

1. Calculate Moments about B:

   • Taking moments about B: $\sum RHM = \sum LHM$ $(A \times 4) + (300 \times 6) + (80 \times 3) = (550 \times 2)$

   Solving for A: $A \approx 637.5 N$

2. Calculate Moments about A:

   • Taking moments about A: $\sum LHM = \sum RHM$ $(B \times 8) + (300 \times 10) = (550 \times 2) + (80 \times 8)$

   Solving for B gives: $B \approx 1012.5 N$