
Let t be the thickness of the plank
υ0(1−n1)2=υ02−2at
∴2at=υ02−υ02(1−n1)2
If m number of planks are required to stop a bullet, then
0=υ02−(2at)m
∴m=2atυ02
=υ021−(1−n1)2υ02
=n2−(n−1)2n2=(2n−1)n2
A bullet loses (n1)th of its velocity passing through one plank. Considering uniform retardation, the number of such planks that are required to stop the bullet can be:
Held on 19 Apr 2014 · Verified 6 Jul 2026.
Infinite
n
(2n−1)n2
(n−1)2n2
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