How do I evaluate this integral: x^9cos(x^5)dx

If w = x^5, 5x^4 dx = dw
The integral you want becomes the integral of
(1/5) w cos w dw
Now use integration by parts, with
u = w dv = cosw dw
du = dw v = sin w
The integral becomes
(1/5)[u v - Integral v du]
= (1/5)[w sin w - integral of sin w dw]
= (1/5)[w sin w + cos w]
= (1/5) [x^5 sin(x^5) + cos(x^5)]

Check my work. The method seems correct by my algebra is often sloppy.