v=1/3ttr^2h; h(geometry)

To find the variable h in the given equation, v = (1/3)tt*r^2*h, you need to rearrange the equation to isolate h.

Let's break down the equation. We can see that v represents the volume of a specific geometric object, t represents the height of the object, r represents the radius of the base of the object, and h is the variable we need to solve for.

To isolate h, we'll follow these steps:

Step 1: Multiply both sides of the equation by 3. This removes the fraction (1/3) from the equation, giving us:

3v = tt*r^2*h

Step 2: Divide both sides of the equation by tt*r^2. This isolates h on one side of the equation:

h = (3v) / (tt*r^2)

So, the final answer is h = (3v) / (tt*r^2).

Therefore, to find the value of h in the given equation, substitute the values of v, t, and r into the equation h = (3v) / (tt*r^2). Make sure you correctly input the values and use the appropriate units for each variable (if applicable) to arrive at the numerical value of h.