Respuesta :
Answer:
It will miss the target of bulls eye by 0.30625 m
The bullet should make an angler of [tex]10.24^\circ[/tex] with the horizontal in order to hit the target.
Explanation:
Given:
- Initial speed of the bullet . [tex]v_i=400\ \rm m/s[/tex]
- The horizontal distance of the target., x=100 m
Since the bullet is fired horizontally. Let y be the vertical distance by which the it will miss the target
Now equation of motion
[tex]x=v_it\\y=\dfrac{gt^2}{2}\\[/tex]
Substituting the value of t we have
[tex]y=\dfrac{gx^2}{2u^2}\\y=\dfrac{9.8\times100^2}{2\times400^2}\\\\y=0.30625\ \rm m[/tex]
Now let [tex]\theta[/tex] bet he angle with horizontal that it is making t hit the target. The bullet is initially at the same height as that of target in order to hit the target the vertical displacement of the bullet should be zero.
[tex]y=x\tan\theta-\dfrac{gx^2}{2u^2g(cos\theta)^2}\\0=100\times tan\theta-\dfrac{9.8\times 100^2}{2\times400^2 (\cos\theta)^2}\\\theta=10.24^\circ[/tex]
When the bullet is aimed at the target and the target is released at the same instant the bullet is fired then it will hit the target.
