(2 csc x^2 )(−csc x^2 cot x^2 )(2x) = −4x csc^2 (x^2 )cot(x^2 ).- 16 sin 2x
Recall that (sin x) = cos x and that (cos x) = −sin x. Here we will use the Chain Rule fourtimes to find the fourth derivative.The first derivative is = (cos 2x)(2) = 2 cos 2x.The second derivative is = 2(−sin 2x)(2) = −4 sin 2x.The third derivative is = −4(cos 2x)(2) = −8 cos 2x.And the fourth derivative is = −8(−sin 2x)(2) = 16 sin 2x.Recall that (sin x) = cos x and that (cos x) = −sin x. Here we will use the Chain Rule tofind the derivative: = cos t − (−sin t) = cos t + sin t and = 2(cos x)(−sin x) = −2 sin xcos x. Next, because and t = 1 + cos^2 x, we get = (cos t + sin t)(−2 sin x cosx) = [cos(1 + cos^2 x) + sin(1 + cos^2 x)](−2 sin x cos x).9.
Recall that (tan x) = sec^2 x. Using the Quotient Rule and the Chain Rule, we get = . This simplifies to .
10. −[sin(1 + sin θ)](cos θ)
Recall that (sin x) = cos x and that (cos x) = −sin x. Using the Chain Rule, we get = −[sin(1 + sinθ)](cosθ).