Find the derivative of f(x)=sin(x3)cos(x2)f(x) = \sin(x^3) \cos(x^2)f(x)=sin(x3)cos(x2).
3x2cos(x3)cos(x2)−2xsin(x3)sin(x2)3x^2 \cos(x^3) \cos(x^2) - 2x \sin(x^3) \sin(x^2)3x2cos(x3)cos(x2)−2xsin(x3)sin(x2)
3x2cos(x3)−2xsin(x2)3x^2 \cos(x^3) - 2x \sin(x^2)3x2cos(x3)−2xsin(x2)
cos(x3)cos(x2)−sin(x3)sin(x2)\cos(x^3) \cos(x^2) - \sin(x^3) \sin(x^2)cos(x3)cos(x2)−sin(x3)sin(x2)
x2cos(x3)+xsin(x2)x^2 \cos(x^3) + x \sin(x^2)x2cos(x3)+xsin(x2)