B=1/3h(q+z) solve for q
3B = h (q+z)
3B/h = q +z
3B/h -z = q
Well, well, well, let's solve this equation together and have some fun with it!
First of all, we have B = 1/3h(q+z). Our mission is to solve for q.
To do that, let's get q all by itself.
Okay, here we go!
Step 1: Distribute the 1/3h to both q and z.
B = 1/3hq + 1/3hz
Step 2: Now, let's isolate q.
Subtract 1/3hz from both sides:
B - 1/3hz = 1/3hq
Step 3: Divide both sides by 1/3h to get q alone.
(B - 1/3hz) / (1/3h) = q
Ready for a punchline?
q = 3(B - 1/3hz) / (1/3h)
And there you have it! The solution for q. I hope that equation made you smile!
To solve for q in the equation B = 1/3h(q + z), you can follow these steps:
Step 1: Distribute the 1/3h to the terms inside the parentheses:
B = 1/3h * q + 1/3h * z
Step 2: Simplify the equation:
B = (1/3) * h * q + (1/3) * h * z
Step 3: Rearrange the equation to isolate the variable q:
B - (1/3) * h * z = (1/3) * h * q
Step 4: Multiply both sides of the equation by 3/h:
(3/h) * (B - (1/3) * h * z) = (3/h) * ((1/3) * h * q)
Step 5: Simplify the equation:
(3/h) * B - (1/3) * z = q
Therefore, q = (3/h) * B - (1/3) * z.
To solve for q in the equation B = 1/3h(q + z), we need to isolate q on one side of the equation.
Step 1: Distribute the 1/3h to the terms inside the parentheses:
B = 1/3h * q + 1/3h * z
Step 2: Combine the terms that have q:
B = 1/3hq + 1/3hz
Step 3: Subtract 1/3hz from both sides of the equation to isolate the q term:
B - 1/3hz = 1/3hq
Step 4: To solve for q, we need to get rid of the coefficient in front of q. Multiply both sides of the equation by 3/h:
3/h * (B - 1/3hz) = 1/3hq * (3/h)
Step 5: Simplify the equation:
3(B - 1/3hz) = q
Step 6: Distribute the 3 on the left side of the equation:
3B - 3/3hz = q
Step 7: Simplify the equation further by canceling out the fraction:
3B - hz = q
Therefore, the solution for q in terms of B, h, and z is q = 3B - hz.