Answer to Question #315254 in Calculus for Waraich

ANSWER:The volume of the region is "V=4"

EXPLANATION

If "V" is the volume of the solid lying vertically above "R" and below the surface "z=f(x,y)" and "f(x,y)\\geq0" on "R" , then

"V=\\iint_{R}f(x,y) dA"

So , "V=\\int_{0}^{2} \\int_{0}^{4}\\frac{y}{2}dxdy" "V=\\int_{0}^{2} \\int_{0}^{4}\\frac{y}{2}dxdy=\\int_{0}^{2}\\left ( \\frac{y}{2 } \\right )\\cdot \\left ( \\int_{0}^{4} dx\\right )dy=4\\int_{0}^{2}\\left ( \\frac{y}{2} \\right )dy=2\\left [ \\frac{y^{2}}{2} \\right ]_{0}^{2}=\\left ( 2^{2} \\right )-0=4"