Question 2.24: A bar ABC consists of two parts AB and BC each of 1 m length......

When the load of 100 kN is applied at B, AB will elongate. Initially, there would be no stress in BC. But as C moves forward, it will push against the lower support. Then, BC goes for compression. Let stress in AB be \sigma_{ AB } MPa (tensile) and stress in BC be \sigma_{ BC } MPa (compression).

Area of section AB = 15 × 15 = 225 mm²
Area of section BC = 20 × 20 = 400 mm²

Force in AB + Force in BC = 100 × 10³

\begin{aligned} & \sigma_{ AB } A_{ AB }+\sigma_{ BC } A_{ BC }=100 \times 10^3 \\ & 225 \sigma_{ AB }+400 \sigma_{ BC }=100 \times 10^3 \end{aligned}

\sigma_{ AB }+1.8 \sigma_{ BC }=444.44             (1)

Also,

Elongation of AB – Compression of BC = 1 mm

(Note: if there were to be no gap, then, elongation of AB = Compression of BC)

∴              \frac{\sigma_{ AB } \times 1000}{200 \times 10^3}-\frac{\sigma_{ BC } \times 1000}{200 \times 10^3}=1

\sigma_{ AB }-\sigma_{ BC }=200             (2)

Equation (1) – (2) gives, 2.8 \sigma_{ BC }=244.44, \quad \therefore \quad \sigma_{ BC }=87.3  MPa

Substituting \sigma_{ BC } \text { in Eq. (2), we get } \sigma_{ AB }=287.3  MPa

Reaction at upper support = Force in portion AB

=\sigma_{ AB } \times A_{ AB }=287.3 \times 225=64642.5 N =64.64 kN \text { (Pull) }