Find SSR -4x+5y dA, where R is the parallelogram enclosed by the lines R-x+3y -4x+5y=0, -4x+5y=9, −x+3y=1, −x + 3y = 7. Round your answer to four decimal places. This can be done directly with a tedious computation, or can be done with a change of variables to transform the parallelogram into a rectangle. Hint: Let u = -4x+5y and v = −x + 3y. Find (2x + 3y) A where R is the parallelogram with vertices (0,0), (-5,4), (-1,5), and (-6,9). Use the transformation x = -5uv, y4u +5v.
Find SSR -4x+5y dA, where R is the parallelogram enclosed by the lines R-x+3y -4x+5y=0, -4x+5y=9, −x+3y=1, −x + 3y = 7. Round your answer to four decimal places. This can be done directly with a tedious computation, or can be done with a change of variables to transform the parallelogram into a rectangle. Hint: Let u = -4x+5y and v = −x + 3y. Find (2x + 3y) A where R is the parallelogram with vertices (0,0), (-5,4), (-1,5), and (-6,9). Use the transformation x = -5uv, y4u +5v.
Find SSR -4x+5y dA, where R is the parallelogram enclosed by the lines R-x+3y -4x+5y=0, -4x+5y=9, −x+3y=1, −x + 3y = 7. Round your answer to four decimal places. This can be done directly with a tedious computation, or can be done with a change of variables to transform the parallelogram into a rectangle. Hint: Let u = -4x+5y and v = −x + 3y. Find (2x + 3y) A where R is the parallelogram with vertices (0,0), (-5,4), (-1,5), and (-6,9). Use the transformation x = -5uv, y4u +5v.
I need help with this problem and an explanation for the solution described below. (Calculus 3: Change in Variables in Multiple Integrations)
Transcribed Image Text:Find
SSR
-4x+5y dA, where R is the parallelogram enclosed by the lines
R-x+3y
-4x+5y=0, -4x+5y=9, −x+3y=1, −x + 3y = 7.
Round your answer to four decimal places.
This can be done directly with a tedious computation, or can be done with a change of variables to
transform the parallelogram into a rectangle.
Hint: Let u =
-4x+5y and v = −x + 3y.
Transcribed Image Text:Find
(2x + 3y) A where R is the parallelogram with vertices (0,0), (-5,4), (-1,5), and (-6,9).
Use the transformation x = -5uv, y4u +5v.
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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