Solve for x
x=-\frac{12y}{12-y}
y\neq 0\text{ and }y\neq 12
Solve for y
y=-\frac{12x}{12-x}
x\neq 0\text{ and }x\neq 12
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12y+12x=xy
Variable x cannot be equal to 0 since division by zero is not defined. Multiply both sides of the equation by 12xy, the least common multiple of x,y,12.
12y+12x-xy=0
Subtract xy from both sides.
12x-xy=-12y
Subtract 12y from both sides. Anything subtracted from zero gives its negation.
\left(12-y\right)x=-12y
Combine all terms containing x.
\frac{\left(12-y\right)x}{12-y}=-\frac{12y}{12-y}
Divide both sides by 12-y.
x=-\frac{12y}{12-y}
Dividing by 12-y undoes the multiplication by 12-y.
x=-\frac{12y}{12-y}\text{, }x\neq 0
Variable x cannot be equal to 0.
12y+12x=xy
Variable y cannot be equal to 0 since division by zero is not defined. Multiply both sides of the equation by 12xy, the least common multiple of x,y,12.
12y+12x-xy=0
Subtract xy from both sides.
12y-xy=-12x
Subtract 12x from both sides. Anything subtracted from zero gives its negation.
\left(12-x\right)y=-12x
Combine all terms containing y.
\frac{\left(12-x\right)y}{12-x}=-\frac{12x}{12-x}
Divide both sides by 12-x.
y=-\frac{12x}{12-x}
Dividing by 12-x undoes the multiplication by 12-x.
y=-\frac{12x}{12-x}\text{, }y\neq 0
Variable y cannot be equal to 0.
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