The value of the integral $\displaystyle \iint_R xy\,dx\,dy$ over the region $R$, given in the figure, is ___________ (rounded off to the nearest integer).
The value of the integral $\displaystyle \iint_R xy\,dx\,dy$ over the region $R$, given in the figure, is ___________ (rounded off to the nearest integer).
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Solution and Explanation
Step 1: Describe the region $R$.
The diamond has vertices at \((0,0)\) (intersection of \(y=x\) and \(y=-x\)), \((0,2)\) (intersection of \(y=x+2\) and \(y=-x+2\)), \((-1,1)\) (intersection of \(y=x+2\) and \(y=-x\)), and \((1,1)\) (intersection of \(y=-x+2\) and \(y=x\)). Hence \(R\) is symmetric about the $y$–axis.
Step 2: Use symmetry of the integrand.
The integrand is \(xy\). For every point \((x,y)\in R\), the reflected point \((-x,y)\in R\) as well, and \[ xy + (-x)y = 0. \] Therefore, the contributions from symmetric pairs cancel. \[ \boxed{\,\iint_R xy\,dx\,dy=0\,} \]
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