Q. 46 Evaluate the double integrals in... [FREE SOLUTION]

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Chapter 13: Q. 46 (page 1079)

Evaluate the double integrals in Exercises 39鈥�48. Use suitable transformations as necessary.
$鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A$ , where $惟$ is the region from Exercise 45.

Short Answer

Expert verified

$鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = \frac{247}{192}$

Step by step solution

Draw the region and name the vertices

The region $惟$ is bounded by,

$y = 2 x, y = 2 x^{2}, y = x, y = x^{2}$

Plot the given points to form the region and name the vertices.

Consider the new set of variables defined as

$u = \frac{y}{x} v = \frac{y}{x^{2}}$

After solving ee get that,

$\frac{u}{v} = x \frac{u^{2}}{v} = y$

Determine the equation of each boundary in terms of u and v.

We have,

$\frac{u}{v} = x \frac{u^{2}}{v} = y$

Use these equations to determine the equation of each boundary of the region.

$A B : y = x 鈬� u = 1 B C : y = 2 x^{2} 鈬� v = 2 C D : y = 2 x 鈬� u = 2 D A : y = x^{2} 鈬� v = 1$

Plot these limits on u v plane.

Evaluate the double integral.

Set up the double integral,

$鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = {鈭�}_{u = 1}^{u = 2} {鈭�}_{v = 1}^{v = 2} \frac{u^{2} (u + v)}{v^{3}} d v d u 鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = {鈭�}_{u = 1}^{u = 2} u^{2} ({鈭�}_{v = 1}^{v = 2} (\frac{v}{v^{3}} + \frac{u}{v^{3}}) d v) d u 鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = {鈭�}_{u = 1}^{u = 2} u^{2} ({[- \frac{1}{v} - \frac{u}{2 v^{2}}]}_{1}^{2}) d u 鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = \frac{1}{2} {鈭�}_{u = 1}^{u = 2} (\frac{u^{2}}{2} + \frac{3 u^{3}}{8}) d u 鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = \frac{1}{2} {[\frac{u^{3}}{6} + \frac{3 u^{4}}{32}]}_{1}^{2} 鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A = \frac{247}{192}$

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91影视

Evaluate the double integrals in Exercises 39鈥�48. Use suitable transformations as necessary.
$鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A$ , where $惟$ is the region from Exercise 45.

Short Answer

Step by step solution

Draw the region and name the vertices

Determine the equation of each boundary in terms of u and v.

Evaluate the double integral.

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91影视

Evaluate the double integrals in Exercises 39鈥�48. Use suitable transformations as necessary.鈭�鈭�惟y+xyx2dA, where 惟 is the region from Exercise 45.

Short Answer

Step by step solution

Draw the region and name the vertices

Determine the equation of each boundary in terms of u and v.

Evaluate the double integral.

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Decision Maths

Discrete Mathematics

Statistics

Probability and Statistics

Theoretical and Mathematical Physics

Geometry

Study anywhere. Anytime. Across all devices.

Evaluate the double integrals in Exercises 39鈥�48. Use suitable transformations as necessary.
$鈭� {鈭�}_{惟} (\frac{y + x y}{x^{2}}) d A$ , where $惟$ is the region from Exercise 45.