Find g'(\pi) given g(t)=7t+\cos(t)\sin(t).
Find the tangent slope of \frac{\tan(x)}{x} at x=\frac{\pi}{2}.
Find the velocity, acceleration, jerk and jounce of s(t)=\cos(t).
\frac{d}{dx} \left( \frac{3^x}{\cos(x)} \right)
\frac{d}{ds} \left( e^{s} \ln(s) \right)
\frac{d}{dx} \left( \sec(x)\csc(x) \right)
Find h'(\pi) given that h(x)=\cot(x).
Find b'(2) given that b(q) = \frac{2^{q}}{\log_2(q)}.