# 1.) Follow the steps below for the given function. 8x + 7y = 3 (a) Solve the equation for y. y =… 1 answer below »

1.) Follow the steps under for the fond capacity. 8x + 7y = 3 (a) Solve the equation for y. y = Differentiate this equation after a while regard to x. y ' = (b) Complete the steps under to implicitly accept the derivative of the initiatory equation. 8x + 7y = 3 + (dy)/(dx) = 0 (dy)/(dx) = (dy)/(dx) = 2.)Follow the steps under for the fond capacity. x2y - x2 + 7y - 7 = 0 (a) Solve the equation for y. y = Differentiate this equation after a while regard to x. y ' = (b) Complete the steps under to implicitly accept the derivative of the initiatory equation. (Leave your definite defense in provisions of x and y.) x2y - x2 + 7y - 7 = 0 d/(dx)(x^2y) - d/(dx)(x^2) + d/(dx)(7 y) - d/(dx)(7) = d/(dx)(0)