Answer: t = 3seconds
Step-by-step explanation:
To find the zero means we will equate the function to zero and then solve, that is
[tex]-16t^{2}[/tex]+ 32t + 48 = 0
by factorizing , we have
(t+1)(-16t+48) = 0
Therefore:
t = -1 or t = 3
since time can not be negative , then , t = 3 seconds
Answer:
The ball will hit the ground 3seconds later
Step-by-step explanation:
Given the function that model the height to be h(t)=−16t2+32t+48, the zero of this function can be evaluated equating the function to zero i.e h(t) = 0
0 =−16t2+32t+48
-t²+2t+3 = 0
Multiplying through by minus
t²-2t-3 = 0
Factorising the function to get t;
t²-3t+t-3 = 0
(t²-3t)+1(t-3) = 0
t(t-3)+1(t-3) = 0
(t-3)(t+1) = 0
t-3 = 0 and t+1 = 0
t = 3secs and -1sec
Since the time cannot be negative, the zero of the function is 3seconds which is the time taken by the ball to hit the ground.
