Answer:
It's position at time t = 5 is 593.
Step-by-step explanation:
The velocity v(t) is the integral of the acceleration a(t)
The position s(t) is the integral of the velocity v(t)
We have that:
The acceleration is:
[tex]a(t) = 24t + 2[/tex]
Velocity:
[tex]v(t) = \int {a(t)} \, dt = \int {24t + 2} \, dt = 12t^{2} + 2t + K[/tex]
K is the initial velocity, that is v(0). Since V(0) = 13, K = 13
Then
[tex]v(t) = 12t^{2} + 2t + 13[/tex]
Position:
[tex]s(t) = \int {s(t)} \, dt = \int {12t^{2} + 2t + 13} \, dt = 4t^{3} + t^{2} + 13t + K[/tex]
Since s(0) = 3
[tex]s(t) = 4t^{3} + t^{2} + 13t + 3[/tex]
What is its position at time t=5?
This is s(5).
[tex]s(t) = 4t^{3} + t^{2} + 13t + 3[/tex]
[tex]s(5) = 4*5^{3} + 5^{2} + 13*5 + 3[/tex]
[tex]s(5) = 593[/tex]
It's position at time t = 5 is 593.
