Question

If the order of integration is reversed for the double integral int_{-1}^{1} int_{x^2}^{1} e^{x+y} , dy , dx, the integral will become int_{x^2}^{1} int_{-1}^{1} e^{x+y} , dx , dy int_{0}^{1} int_{-sqrt{y}}^{sqrt{y}} e^{x+y} , dx , dy int_{0}^{2} int_{-y}^{y} e^{x+y} , dx , dy None of these If the order of integration is reversed for the double integral $int int e^{r} , dy , dx$, the integral will become $int int e^{x+y} , dx , dy$ $int int ye^{y} , dx , dy$ $int int e^{y} , dx , dy$ None of these

          If the order of integration is reversed for the double integral int_{-1}^{1} int_{x^2}^{1} e^{x+y} , dy , dx, the integral will become
int_{x^2}^{1} int_{-1}^{1} e^{x+y} , dx , dy
int_{0}^{1} int_{-sqrt{y}}^{sqrt{y}} e^{x+y} , dx , dy
int_{0}^{2} int_{-y}^{y} e^{x+y} , dx , dy
None of these

If the order of integration is reversed for the double integral
$int int e^{r} , dy , dx$, the integral will
become
$int int e^{x+y} , dx , dy$
$int int ye^{y} , dx , dy$
$int int e^{y} , dx , dy$
None of these

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if the order of integration is reversed for the double integral int 11 intx21 exy dy dx the integral will become intx21 int 11 exy dx dy int01 int sqrtysqrty exy dx dy int02 int yy e 23129

Added by Paul R.

Calculus: Early Transcendentals

James Stewart 8th Edition

Instant Answer

Solved by Expert Adi S

10/08/2023

Step 1

Step 1: For the first question, we have the double integral \int_{-1}^{1} \int_{x^2}^{1} e^{x+y} \, dy \, dx. Show more…

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If the order of integration is reversed for the double integral int_{-1}^{1} int_{x^2}^{1} e^{x+y} , dy , dx, the integral will become int_{x^2}^{1} int_{-1}^{1} e^{x+y} , dx , dy int_{0}^{1} int_{-sqrt{y}}^{sqrt{y}} e^{x+y} , dx , dy int_{0}^{2} int_{-y}^{y} e^{x+y} , dx , dy None of these If the order of integration is reversed for the double integral $int int e^{r} , dy , dx$, the integral will become $int int e^{x+y} , dx , dy$ $int int ye^{y} , dx , dy$ $int int e^{y} , dx , dy$ None of these

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