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Part 1Evaluate the following integral.Integral from nothing to nothing ModifyingBelow Integral from nothing to nothing With Upper D Integral from nothing to nothing left parenthesis xy plus xz plus yz right parenthesis dV∫∫D∫(xy+xz+yz) dV; Dequals={(x,y,z): minus−33less than or equals≤xless than or equals≤33, minus−44less than or equals≤yless than or equals≤44, minus−11less than or equals≤zless than or equals≤11} Part 1Integral from nothing to nothing ModifyingBelow Integral from nothing to nothing With Upper D Integral from nothing to nothing left parenthesis xy plus xz plus yz right parenthesis dV∫∫D∫(xy+xz+yz) dVequals=[input]enter your response here (Simplify your answer.)
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First, I will restate the problem to ensure clarity: we are evaluating the triple integral of the function xy + xz + yz over the rectangular region D defined by x in [-3, 3], y in [-4, 4], and z in [-1, 1], i.e., ∭_D (xy + xz + yz) dV.
Consider the integrand term by term. The integrand is a sum of three terms: xy, xz, and yz.
- For the term xy: if we integrate with respect to x over a symmetric interval [-3, 3], the integral of x times a fixed y is zero because x is odd about 0 while y is treated as a constant during the x......Login to view full explanationLog in for full answers
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