A 8.00-kg box is suspended from the end of a light vertical rope. A time-dependent force is applied to the upper end of the rope, and the box moves upward with a velocity magnitude that varies in time according to v(t)?

A 8.00-kg box is suspended from the end of a light vertical rope. A time-dependent force is applied to the upper end of the rope, and the box moves upward with a velocity magnitude that varies in time according to v(t)=(2.00m/s2)t+(0.600m/s3)t2. What is the tension on the rope when the velocity is 15 m/s.

Explanation:

It is known that relation between acceleration and time is as follows.

a = [tex]\frac{dV}{dt}[/tex]

a = [tex]2 + 2 \times 0.6t[/tex] ............ (1)

As it is given that velocity is 15 m/s.

15 = [tex]2t + 0.6t^{2}[/tex]

t = 3.604 sec

Substitute the value of "t" in equation (1) as follows.

a = [tex]2 + 2 \times 0.6t[/tex]

a = [tex]2 + 2 \times 0.6 \times 3.604 sec[/tex]

= 6.325 [tex]m/s^{2}[/tex]

Now, we will calculate the tension as follows.

T = mg + ma

= 8[9.81 + 6.325]

= 129.08 N

thus, we can conclude that tension on the rope is 129.08 N when the velocity is 15 m/s.