Step 1:

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The function is \"\" and region bounded by the square with vertices are

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\"\".

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Change of variables for double integrals :

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\"image\"

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First find the change of variables \"\".

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Use the vertices of the square are \"\".

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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 square.

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\"\"

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Step 2:

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Observe the graph, Consider the vertices \"\".

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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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Observe the graph, Consider the vertices \"\".

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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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Observe the graph, Consider the vertices \"\".

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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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Observe the graph, Consider the vertices \"\".

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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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The obtained line equations are

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\"\"

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From above equations, consider \"\".

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Then \"\" and \"\".

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Step 3:

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Find the Jocobian \"\".

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Definition of Jocobian :

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If \"\", then the Jocobian for x and y with respect to u and v is

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\"\"

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From \"\" and \"\".

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The partial derivatives of x and y with respect to u and v are

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\"\".

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\"\"

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Step 4:

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Find the volume of the solid.

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Volume of the solid :

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The volume of the solid V under the surface \"\" and lies above the region R,

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using the change of variables then \"\".

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The volume of the solid is

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\"\"

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Now use the change of variables for double integrals.

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\"\"

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Now find the bounds for S in the \"\"plane.

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Use the bounds for R in the \"\"plane, to find the bounds for S in the \"\"plane.

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\"\"

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The region bounded by the S in the \"\"plane is \"\".

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\"\"

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Solution :

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\"\".