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Chapter 14: Q. 6 (page 1106)

For each integral in Exercises 5鈥�8, give the vector field that is being integrated.
${鈭�}_{C} \cos (x^{2} y) d x 鈭� 3 e^{y} d y$

Short Answer

Expert verified

The vector field that is being integrated is $F (x, y) = \cos (x^{2} y) i 鈭� 3 e^{y} j$ .

Step by step solution

01

Step 1. Given Information

For given integral in exercises we have to give the vector field that is being integrated.

${鈭�}_{C} \cos (x^{2} y) d x 鈭� 3 e^{y} d y$

02

Step 2. We have to find the vector field that is being integrated.

The given integration is

${鈭�}_{C} \cos (x^{2} y) d x 鈭� 3 e^{y} d y$

So the vector field should be

$F (x, y) = \cos (x^{2} y) i 鈭� 3 e^{y} j$

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Most popular questions from this chapter

Why is $d A$ in Green鈥檚 Theorem replaced by $d S$ in Stokes鈥� Theorem?

Find the flux of the given vector field through a permeable membrane described by surface S.

$F (x, y, z) = 鈭� z i + y j + x k$ , where S is the surface with the equation $y = \cos z$ for $1 鈮� x 鈮� 5 and 0 鈮� z 鈮� \frac{蟺}{2}$ .

Find the area of S is the portion of the plane with equation y鈭抸 = $\frac{蟺}{2}$

that lies above the rectangle determined by 0 鈮� x 鈮� 4 and 3 鈮� y 鈮� 6.

Use the curl form of Green鈥檚 Theorem to write the line integral of F(x, y) about the unit circle as a double integral. Do not evaluate the integral.

Generalize your answer to Exercise 12 to give a parametrization and a normal vector for the extension of any differentiable plane curve y = f(x) through a 鈮� z 鈮� b.

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