The blocks A and B weighing 100 N and 250 N respectively are placed one over the other as shown in the figure. Block B rests on a smooth surface. The coefficient of static friction between A and B is 0.4. When \( F = 250 \, {N} \), the acceleration of the upper block is (Take acceleration due to gravity, \( g = 10 \, {m/s}^2 \)):
Show Hint
In problems involving friction, always calculate the frictional force first. Use the net force acting on the system to find the acceleration.
We apply Newton's second law to the system of two blocks.
- The mass of block \( A \) is:
\[
m_A = \frac{100}{g} = \frac{100}{10} = 10 \, \text{kg}
\]
- The mass of block \( B \) is:
\[
m_B = \frac{250}{g} = \frac{250}{10} = 25 \, \text{kg}
\]
- The force applied is:
\[
F = 250 \, \text{N}
\]
- The coefficient of friction is:
\[
\mu = 0.4
\]
- The frictional force between the blocks is:
\[
f_{\text{friction}} = \mu \cdot N = 0.4 \times 10 \times 10 = 40 \, \text{N}
\]
The total force on the system is:
\[
F_{\text{total}} = F - f_{\text{friction}} = 250 - 40 = 210 \, \text{N}
\]
The total mass of the system is:
\[
m_{\text{total}} = 10 + 25 = 35 \, \text{kg}
\]
Thus, the acceleration is:
\[
a = \frac{F_{\text{total}}}{m_{\text{total}}} = \frac{210}{35} = 6 \, \text{m/s}^2
\]
