A bullet moving with a velocity of 100 m / s can just penetrate two planks of equal thickness. The number of such planks penetrated by the same bullet, when the velocity is doubled, will be

Question

A bullet moving with a velocity of 100 m / s can just penetrate two planks of equal thickness. The number of such planks penetrated by the same bullet, when the velocity is doubled, will be (A) 4 (B) 6 (C) 8 (D) 10

Tardigrade Admin · Accepted Answer

Given initial velocity of bullet in first case

(u_{1}) = 100 m / s

. Initial number of planks

(n_{1}) = 2

Initial stopping distance

(s_{1}) = n_{1} x = 2 x

(where

x

is the thickness of one plank).
Initial velocity of bullet in second case

(u_{2}) = 200 m / s

. Relation for the stopping distance

(s)

is

v^{2} = u^{2} + 2 a s

Since the bullet is just able to penetrate the planks, therefore its final velocity

v = 0

. Thus,

2 a s = - u^{2}

or

s \propto u^{2}

∴ \frac{s _{1}}{s _{2}} = (\frac{u _{1}}{u _{2}})^{2} = \frac{1}{4}

or

s_{2} = 4 s_{1} = 4 \times 2 x = 8 x

Thus final number of planks

(n_{2}) = \frac{s _{2}}{x} = \frac{8 x}{x} = 8

Q. A bullet moving with a velocity of 100 m / s can just penetrate two planks of equal thickness. The number of such planks penetrated by the same bullet, when the velocity is doubled, will be

4

6

8

10