For each of 30 through 35, find (approximately) the first five terms in the Fourier-Bessel expansion of f (x) on (0, 1) in a series of the functions J2(jn x), with jn the nth positive zero of J2.f (x) = xex

Calculus notes for week of 9/19/16 3.6 Derivatives as Rates of Change Velocity is measured as: V ave(t+∆t) or s(b) – s(a) ∆t b – a (Change in position over change in time.) S’’(t) = V’(t) = A(t) (From left to right: S=Position, V= Velocity, and A=Acceleration) Average and Marginal Cost Suppose C(x) gives the total cost to produce x units of a good cost. Sometimes,...