Step 1:

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The vector field is $\"\"$ and vertices of the triangle are $\"\"$ .

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Greens theorem :

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If C be a positively oriented closed curve, and R be the region bounded by C, M and N are the partial derivatives on an open region then

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$\"\"$ .

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Graph :

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(1) Draw the coordinate plane.

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(2) Plot the vertices $\"\"$ .

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(3) Connect the plotted vertices to a smooth triangle.

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$\"\"$

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Observe the graph :

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The limits of y are varying from 0 to 5 , so $\"\"$ .

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Find the bounds for x :

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Lower limit :

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Consider the points $\"\"$ .

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From the points, $\"\"$ coordinates are equal then the equation of the line parallel to $\"\"$ axis.

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So the equation of the line is $\"\"$ .

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Lower limit of x is $\"\"$ .

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Upper limit :

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Consider the points $\"\"$ .

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Using two points form of a line equation is $\"\"$ .

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Substitute $\"\"$ in the line equation.

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$\"\"$

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Upper limit of x is $\"\"$ .

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Therefore the limits of x is $\"\"$ to $\"\"$ , so $\"\"$ .

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Step 2:

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Using greens theorem,

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$\"\"$

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$\"\"$

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$\"\"$

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The region bounded by the triangle is $\"\"$ .

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$\"\"$

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$\"\"$ .

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Solution :

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$\"\"$ .