Green's theorem is an equality relationship between surface integrals and line integrals. This theorem is given by |dydx = $(Pdx+ Qdy). ôx Given that C is the boundary of a region bounded by y=-4+x²,...

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Green's theorem is an equality relationship between surface integrals and line integrals. This<br>theorem is given by<br>|dydx = $(Pdx+ Qdy).<br>ôx<br>Given that C is the boundary of a region bounded by y=-4+x², y=-x-2, x=-1 and<br>y = 0 with positive orientation. Using Green's theorem, construct a diagram to identify the<br>regions and use the theorem to evaluate<br>y =.<br>S.(e* + y² ) dx +(2x° + VIn (tan y))dy<br>2sin x<br>

Extracted text: Green's theorem is an equality relationship between surface integrals and line integrals. This theorem is given by |dydx = $(Pdx+ Qdy). ôx Given that C is the boundary of a region bounded by y=-4+x², y=-x-2, x=-1 and y = 0 with positive orientation. Using Green's theorem, construct a diagram to identify the regions and use the theorem to evaluate y =. S.(e* + y² ) dx +(2x° + VIn (tan y))dy 2sin x

Jun 04, 2022

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Green's theorem is an equality relationship between surface integrals and line integrals. This theorem is given by |dydx = $(Pdx+ Qdy). ôx Given that C is the boundary of a region bounded by y=-4+x²,...

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