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24 votes
24 votes
Kehlani launches a toy rocket from a platform. The height of the rocket in feet is given by h= -16t^2 + 72t + 144 where t represents the time in seconds after launch. How long is the rocket in the air?

User Hitesh Menghani
by
3.2k points

2 Answers

18 votes
18 votes

Answer:

6 seconds

Explanation:

Given function:


h(t)=-16t^2+72t+144

where:

  • h is the height of the rocket.
  • t is the time (in seconds) after launch.

To find how long the rocket is in the air, find the positive value of t when h(t)=0.


\implies -16t^2+72t+144=0


\implies -8(2t^2-9t-18)=0


\implies 2t^2-9t-18=0


\implies 2t^2+3t-12t-18=0


\implies t(2t+3)-6(2t+3)=0


\implies (t-6)(2t+3)=0

Apply the zero-product property:


t-6=0 \implies t=6


2t+3=0 \implies t=-(3)/(2)

Therefore, as t > 0, the rocket is in the air for 6 seconds.

User Greelings
by
3.2k points
9 votes
9 votes

Answer:

  • 6 seconds

--------------------------------

Rocket is in the air until it hits the ground.

Therefore we need to find the value of t when h = 0.

  • - 16t² + 72t + 144 = 0
  • 2t² - 9t - 18 = 0
  • 2t² - 12t + 3t - 18 = 0
  • 2t(t - 6) + 3(t - 6) = 0
  • (t - 6)(2t + 3) = 0
  • t - 6 = 0 or 2t + 3 = 0
  • t = 6 or t = - 3/2 (discarded as negative)

The rocket is in the air for 6 seconds.

User Thesilican
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2.8k points