Homework SourseDifferentiate implicitly to find dydx secxy tanxy 11 7So
Differentiate implicitly to find dy/dx . sec(xy) + tan(xy) + 11 = 7
Solution
differentiate both sides with respect to x..
sec(xy)*tan(xy)[x*(dy/dx) + y] + sec2 (xy)[x*(dy/dx) + y] + 0 = 0
sec(xy)*tan(xy)[x*(dy/dx) + y] + sec2 (xy)[x*(dy/dx) + y] = 0
[sec(xy)*tan(xy)+ sec2 (xy)][x*(dy/dx) + y] = 0
then if [x*(dy/dx) + y] = 0
then dy/dx = -y/x
![Differentiate implicitly to find dy/dx . sec(xy) + tan(xy) + 11 = 7Solutiondifferentiate both sides with respect to x.. sec(xy)*tan(xy)[x*(dy/dx) + y] + sec2 (x](/WebImages/25/differentiate-implicitly-to-find-dydx-secxy-tanxy-11-7so-1063328-1761555811-0.webp "Differentiate implicitly to find dy/dx . sec(xy) + tan(xy) + 11 = 7Solutiondifferentiate both sides with respect to x.. sec(xy)*tan(xy)[x*(dy/dx) + y] + sec2 (x")
