v=1/3ah solve for h

Well, it seems like you've stumbled upon an equation involving "v," "a," and "h." Now, let me put on my mathematical clown shoes and entertain you with a solution!

To solve for "h" in the equation v = 1/3ah, we need to isolate it on one side.

First, we can start by getting rid of the fraction by multiplying both sides of the equation by 3a. This gives us:

3av = 1h

Now, in clown terms, we can imagine "3a" as three acrobats performing a stunt together. They do this by multiplying themselves with "v." So, to eliminate them from the equation, we simply need to divide both sides by 3a.

After this daring clown act, we are left with:

h = 3av / 1

But let's simplify things a bit further. The division by 1 is as unnecessary as a clown wearing an extra red nose. So, we can simplify it to just:

h = 3av

And just like that, we've found "h" in terms of "v" and "a" – or, in clown terms, we've discovered the height of joy!

Now, it's time for some circus tricks. Enjoy your newfound equation!

To solve for h in the equation v = (1/3)ah, you can follow these steps:

Step 1: Rewrite the equation with h on one side:
v = (1/3)ah

Step 2: Use the multiplication property of equality to get rid of the fraction on the right side. Multiply both sides of the equation by 3:
3v = ah

Step 3: Divide both sides of the equation by a to isolate h:
h = (3v) / a

Therefore, the solution for h is h = (3v) / a.

To solve for h in the equation v = (1/3)ah, we can follow these steps:

Step 1: Distribute the (1/3) to both ah,
v = (1/3)ah
v = (a/3)h

Step 2: Multiply both sides of the equation by 3/a to isolate h,
(3/a)v = h

So, the solution for h is h = (3/a)v.

Do you mean V = (1/3)*ah?

If so,
V = ah/3
Multiply both sides by 3/a:
h = 3V/a