Find dy/dx x^24xyy^2=4 x2 − 4xy y2 = 4 x 2 4 x y y 2 = 4 Differentiate both sides of the equation d dx (x2 −4xy y2) = d dx (4) d d x ( x 2 4 x y y 2) = d d x ( 4) Differentiate the left side of the equation Tap for more steps −4xy' 2yy' 2x−4y 4 x y ′ 2 y y ′ 2 x 4 y Since 4 4 is constant with respectFree separable differential equations calculator solve separable differential equations stepbystep See a solution process below To add or subtract fractions they must be over a common denominator x^2 y^2 = (x y)(x y) Therefore we need to multiply the fraction on the right by (x y)(x y), a form of 1, to get both fractions over a common denominator (4xy)/(x^2 y^2) ((x y)/(x y) xx (x y)/(x y)) => (4xy)/(x^2 y^2) ((x y)(x y))/((x y)(x y)) =>
2