Answer:
Explanation:
Given the formula for the volume of a torus (v = πh(R + r)), you can isolate R by dividing both sides of the equation by πh(R + r), as follows:
v / (πh(R + r)) = R
πh(R + r) * R = v
R^2 = v / (πh(R + r))
R = √(v / (πh(R + r)))
So, R is the square root of the volume divided by πh(R + r).