Find the area enclosed by one leaf of the rose r=12cos3θ
Find the area enclosed by one leaf of the rose r=12cos3θ
Change the Cartesian integral into an equivalent polar integral. Then evaluate the polar integral. ∫0ln2∫0√(ln2)^2-y^2 e√x^2+y^2 dxdy
find the ∂f/∂x and ∂f/∂y of: 1.f(x,y)=tan-1(y/x) 2.f(x,y)=e-xsin(x+y) 3. f(x,y)=x/(x^2+y^2)
determine the interval and radius of convergence for the power series Σ n=1 to ∞ of (x^(4n))/(4n)!
Find the Taylor series for f(x)=sin x expanded at about x=(pi/2) and prove that the series converges to sin x for all x
solve for the integral.......cos(x)sqrt(1-cos(x)) in respects to x, lower bound is o and upper bound is pi/2
find the integral of (dx)/(x^7-x)
∫sin(x)cos(x) dx 1. substitution where u=sin(x) 2. substitution where u=cos(x) 3 .integration by parts 4. using the identity sin(2x)=2sin(x)cos(x)
Need step by step of how to do this problem