If the displacement of an object moving in a circular motion in terms of time is given by 6t^2 + 8

Angular velocity, ω = dθ/dt

In circular motion, the displacement of the object is related to the angle through the formula s = rθ, where r is the radius of the circle.

Differentiating both sides of this equation with respect to time, we get:

ds/dt = r(dθ/dt)

But ds/dt is simply the velocity of the object, v. So we have:

v = rω

where ω is the angular velocity.

Now, given that the displacement in terms of time is 6t^2 + 8, we can write:

s = rθ = 6t^2 + 8

Taking the derivative with respect to time, we get:

ds/dt = 12t

Substituting this into the equation v = rω, we have:

v = rω = 12tr

But we don't know the value of r. However, we do know that the displacement is given by 6t^2 + 8, which means that the object is moving in a circle of radius r = (6t^2 + 8)/θ. Substituting this into the equation above, we get:

v = rω = 12t(6t^2 + 8)/θ

Therefore, the expression for the angular velocity, ω, is:

ω = 12t(6t^2 + 8)/rθ

or

ω = 12t(6t^2 + 8)/(6t^2 + 8)θ

which simplifies to:

ω = 12t/θ