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A ball is kicked at a speed of 16m/s at 33° and it eventually returns to ground level further down field.

How high, in meters, did it rise in the air?

User Pygmalion
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2 Answers

14 votes
14 votes
  • Initial velocity=16m/s=u
  • Angle=33°
  • Acceleration due to gravity=9.8m/s^2=g

We have to find Range


\\ \bull\tt\dashrightarrow R=(u^2sin(2\Theta))/(g)


\\ \bull\tt\dashrightarrow R=(16^2sin(2* 33))/(9.8)


\\ \bull\tt\dashrightarrow R=(256sin66)/(9.8)


\\ \bull\tt\dashrightarrow R=(256(0.91))/(9.8)


\\ \bull\tt\dashrightarrow R=(232.96)/(9.8)


\\ \bull\tt\dashrightarrow R=23.77m

A ball is kicked at a speed of 16m/s at 33° and it eventually returns to ground level-example-1
User Daniel Passos
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18 votes
18 votes

Hi there!

We can begin by calculating the time taken to reach its highest point (when the vertical velocity = 0).

Remember to break the velocity into its vertical and horizontal components.

Thus:

0 = vi - at

0 = 16sin(33°) - 9.8(t)

9.8t = 16sin(33°)

t = .889 sec

Find the max height by plugging this time into the equation:

Δd = vit + 1/2at²

Δd = (16sin(33°))(.889) + 1/2(-9.8)(.889)²

Solve:

Δd = 7.747 - 3.873 = 3.8744 m

User Miojamo
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2.7k points