Compute the volume of the solid the lies below the surface z = f (x, y) = x+2y? and above the rectangle R = [0, 2] × [0, 4] as the limit of a Rie- Ensure that it is a limit of Rie-mann sum тапп suт. т n (x+ 2y²) dA = lim E£f(®;,vis)A. V = R m,n→+∞ i=1 _j=1

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**Practice: Non-Graded Question** Compute the volume of the solid that lies below the surface \( z = f(x,y) = x + 2y^2 \) and above the rectangle \( R = [0, 2] \times [0, 4] \) as the limit of a Riemann sum. *Ensure that it is a limit of Riemann sum.* \[ V = \iint_R (x + 2y^2) \, dA = \lim_{m,n \to +\infty} \sum_{i=1}^{m} \sum_{j=1}^{n} f(x_{ij}^*, y_{ij}^*) \Delta A. \]