Question 6.9: Projectile motion A body is projected from the ground with s...

Classical Mechanics

Projectile motion

A body is projected from the ground with speed u and lands on the flat roof of a building of height h. Find the speed with which the projectile lands. [Assume uniform gravity and no air resistance.]

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Since uniform gravity is a conservative field with potential energy mgz, energy conservation applies in the form

$\frac{1}{2} m| v |^{2}+m g z=E,$

where O is the initial position of the projectile and Oz points vertically upwards.
From the initial conditions, $E=\frac{1}{2} m u^{2}$ . Hence, when the body lands,

$\frac{1}{2} m\left| v ^{L}\right|^{2}+m g h=\frac{1}{2} m u^{2},$

where $v ^{L}$ is the landing velocity. The landing speed is therefore

$\left|v^{L}\right|=\left(u^{2}-2 g h\right)^{1 / 2}.$

Thus, energy conservation determines the speed of the body on landing, but not its velocity.

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