122,713 views
37 votes
37 votes
H=-16t^2+122t+5 where h is height in feet and t is time in seconds. How long will it take the baseball to hit the ground? h=-16t^2+162t+0.2 where h is height in feet and t is time in seconds. How long will it take the golf ball to hit the ground?

User Mdonati
by
2.8k points

1 Answer

22 votes
22 votes

Answer:


t= 7.67


t= 10.13s

Explanation:

Solving (a):


H=-16t^2+122t+5

Required: Time to hit the ground

This means that H = 0

So, we have:


0=-16t^2+122t+5

Rewrite as:


16t^2-122t-5=0

Solve for t using:


t= (-b \± √(b^2 - 4ac))/(2a)


t= (122 \± √((-122)^2 - 4*16*-5))/(2*16)


t= (122 \± √(15204))/(2*16)


t= (122 \± 123.3)/(32)

Split:


t= (122 + 123.3)/(32) or
t= (122 - 123.3)/(32)


t= (245.3)/(32) or
t= (-1.3)/(32)


t= 7.67 or
t= -0.0406

Time can not be negative. so:
t= 7.67

Solving (b):


h=-16t^2+162t+0.2

Required: Time to hit the ground

This means that h = 0


0=-16t^2+162t+0.2

Rewrite as:


16t^2-162t-0.2= 0

Solve for t using:


t= (-b \± √(b^2 - 4ac))/(2a)


t= (162 \± √((-162)^2 - 4*16*-0.2))/(2*16)


t= (162 \± √(26256.8))/(32)


t= (162 \± 162.04)/(32)


t= (162 + 162.04)/(32) or
t= (162 - 162.04)/(32)


t= (324.04)/(32) or
t= (-0.04)/(32)

Time can not be negative. So:


t= (324.04)/(32)


t= 10.13s

User Florian Barth
by
2.9k points