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Question

A golfer standing on level ground hits a ball with a velocity of u=52 m/s at an angle a above the horizontal. If tana=512, then the time ( in second upto two decimals) for which the ball is at least 15 m above the ground will be (take g=10 m/s2)

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Solution

Given tana=512sina=5122+52=513
Let at any time t, the ball is at height of 15 m.
Sy=uyt+12ayt2
15=4sinθt12gt2
15=52×513t12×10t2
t24t+3=0(t1)(t3)=0
t=1 s,t=3 s,

So, ball is at a height of 15 m at t=1( while moving up) and t=3 (while moving down).
Hence ball is at a height greater than 15 m , in the time interval between these instants.
required time: 31=2 s.

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