Answer :
Answer:
2 secs; 65 feet
Explanation:
The function guiding the water bottle is given as:
f(x) = -16t² + 64t + 1
The bottle will reach maximum height when velocity, df/dt (velocity is the first derivative of distance) = 0.
Therefore:
df/dt = 0 = -32t + 64
=> 32t = 64
t = 64/32 = 2 seconds
This is the time it will take to reach the maximum height.
To find this height, we insert t = 2 into the function f(x):
f = -16(2)² + 64(2) + 1
f = -(16 * 4) + 128 + 1
f = -64 + 128 + 1
f = 65 ft
Its maximum height is 65 ft.
Answer:
It takes the water bottle rocket 2 s to reach maximum height.
The maximum height reached is 65 m
Explanation:
The object would reach maximum height when its velocity is zero. That is f'(x)= 0. So, we differentiate f(x) to get
df(x)/dx = d(-16t² + 64t + 1)/dt = -32t + 64 = 0
-32t + 64 = 0
-32t = -64
t = -64/-32 = 2 s
So it takes the water bottle rocket 2 s to reach maximum height.
To find this height, we substitute t = 2 into f(x). So,
f(x) = -16t² + 64t + 1
f(2) = -16(2)² + 64(2) + 1 = -16(4) + 128 + 1 = -64 + 128 + 1 = 65 m
So the maximum height reached is 65 m.