Integrate the function ((x^2+y^2)^{frac{1}{3}}) over the region E that is bounded by the xy plane below and above by the paraboloid 10−7x^2−7y^2 using cylindrical coordinates.
∫∫∫E(x2+y2)13dV=∫BA∫DC∫FEG(z,r,θ) dzdrdθ∫∫∫E(x2+y2)13dV=∫AB∫CD∫EFG(z,r,θ) dzdrdθ
where A= , B= , C= , D= ,E= , F= and G(z,r,θ)= .The value of the integral is ∫∫∫E(x2+y2)13dV=∫