Make y the subject of the formula
P= xy/x-y
p = xy/(x-y)
px-py = xy
px = py+xy
y = px/(p+x)
How about you show some work on the rest?
To make y the subject of the formula, we need to isolate y on one side of the equation.
Given the formula:
P = xy / (x - y)
Step 1: Multiply both sides of the equation by (x - y) to eliminate the denominator.
P(x - y) = xy
Step 2: Distribute P to both terms on the left side.
Px - Py = xy
Step 3: Group the terms that contain y on one side.
-Py = xy - Px
Step 4: Move the term -Px to the right side of the equation.
-Py + Px = xy
Step 5: Factor out y on the left side.
y(-P + P) = xy
Step 6: Simplify the expression on the left side.
0y = xy
Step 7: Since 0y is equal to 0, we can eliminate it.
0 = xy
Step 8: Divide both sides of the equation by x.
0/x = y
Step 9: Simplify the expression on the left side.
0 = y
Therefore, the equation y = 0 represents the solution.
To make y the subject of the formula P= xy/x-y, we need to isolate y on one side of the equation.
Start by multiplying both sides of the equation by (x-y) to eliminate the denominator:
P(x-y) = xy
Expand the left side of the equation:
Px - Py = xy
Next, move the terms involving y to one side of the equation by subtracting xy from both sides:
Px - xy = Py
Factor out y on the right side of the equation:
Px - xy = y(P)
Now, divide both sides of the equation by (P) to solve for y:
(Px - xy)/(P) = y
This expression is the solution, and y is the subject of the formula:
y = (Px - xy)/(P)