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2) A ball is hit at an angle of 36 degrees to the horizontal from 14 feet above the ground. If it hits the ground 26 feet away...Asked by arun
1) A ball is hit at an angle of 36 degrees to the horizontal from 14 feet above the ground. If it hits the ground 26 feet away (in horizontal distance), what was the initial velocity? Assume there is no air resistance.
Answers
Answered by
Jai
first we observe that the motion of the ball is projectile and its trajectory (path followed by the ball) is shaped like a parabola. the horizontal distance travelled by the ball is thus given by:
R = (vo)^2 * sin (2*theta) / g
where
R = range or the horizontal distance
vo = initial velocity
theta = angle of release
g = acceleration due to gravity (9.8 m/s^2 = 32 ft/s^2)
substituting,
26 = (vo)^2 * sin(2*36) / 32
26 = (vo)^2 * 0.02972
26/0.02972 = (vo)^2
874.82 = (vo)^2
getting the squareroot of both sides,
vo = 29.58 ft/s
hope this helps~ :)
R = (vo)^2 * sin (2*theta) / g
where
R = range or the horizontal distance
vo = initial velocity
theta = angle of release
g = acceleration due to gravity (9.8 m/s^2 = 32 ft/s^2)
substituting,
26 = (vo)^2 * sin(2*36) / 32
26 = (vo)^2 * 0.02972
26/0.02972 = (vo)^2
874.82 = (vo)^2
getting the squareroot of both sides,
vo = 29.58 ft/s
hope this helps~ :)
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