An object is projected upward from the top of a water
tower. Its distance in feet above the ground after t
seconds is given by s(t) = -16t^2 + 64t + 80. How
many seconds will it take to reach ground level? I
came out with 4 seconds after working it out. thanks
for checking.
Let's check your answer and see if it is correct:
We substitute 4 seconds into the equation:
s(t) = -16t² + 64t + 80
s(4) = -16(4)² + 64(4) + 80
s(4) = -16(16) + 256 + 80
s(4) = -256 + 256 + 80
s(4) = 80 feet above ground
After 4 seconds the object is still 80 feet above
the ground. So 4 seconds can't be right. Let's
do it right:
Ground level is ground zero, that is, when the
height above the ground s(t) is zero,
So replace s(t) by 0
s(t) = -16t² + 64t + 80
0 = -16t² + 64t + 80
16t² - 64t - 80 = 0
Divide every term through by 16
t² - 4t - 5 = 0
(t - 5)(t + 1) = 0
t - 5 = 0; t + 1 = 0
t = 5 t = -1
Answer: 5 seconds.
Discard the negative answer. It takes 5 seconds
to reach the ground. The water tank is 80 feet high.
At the instant when 2 seconds have passed it reaches
its maximum height of 144 feet (64 feet above the
water tower). Then it starts falling back down. At
the instant when 4 seconds have passed, it is back
even with the tower. Then after 5 seconds have
passed the object reaches the ground.
Edwin
AnlytcPhil@aol.com