A projectile is fired from ground level at time t = 0, at an angle \theta with respect to the horizontal. It has an initial speed v_{0}. In this problem, we are assuming that the ground is level.

Part A. Find the time t_{H} it takes the projectile to reach its maximum height. Express t_{H} in terms of v_{0}, \theta, and g (the magnitude of the acceleration due to gravity).

Part B. Find t_{R}, the time at which the projectile hits the ground. Express the time in terms of v_{0}, \theta, and g.

Part C. Find H, the maximum height attained by the projectile. Express the maximum height in terms of v_{0}, \theta, and g.

Part D. Find the total distance R (often called the range) traveled in the x-direction; in other words, find where the projectile lands. Express the range in terms of v_{o}, \theta, and g.

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akande212 akande212 · Answer 1 · 2020-01-28T22:36:23+01:00

Answer:

(A) t_H = Vo×Sin (theta)/g

(B) t,_R = (2VoSin(theta))/g

(C) H = Vo²Sin²(theta) / 2g

(D) Range = Vo²Sin(2×theta) / g.

Explanation:

The detailed solution to the problem can be found in the attachment below

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