# Evaluating the Given Integral by Changing to Polar Coordinates

Not what you're looking for?

Evaluate the given integral by changing to polar coordinates:

Above the cone z = sqrt(x^2 +y^2) and below the sphere x^2 + y^2 +z^2 = 1

Please show steps, especially how you determine the boundaries. Thanks.

##### Purchase this Solution

##### Solution Summary

This solution is comprised of a detailed explanation to evaluate the given integral by changing to polar coordinates.

##### Solution Preview

Please see the attachment.

Please see the above figure. The shaded part is what we want. We need to find the intersections of the cone and the sphere . By plug-in, we ...

##### Purchase this Solution

##### Free BrainMass Quizzes

##### Solving quadratic inequalities

This quiz test you on how well you are familiar with solving quadratic inequalities.

##### Geometry - Real Life Application Problems

Understanding of how geometry applies to in real-world contexts

##### Multiplying Complex Numbers

This is a short quiz to check your understanding of multiplication of complex numbers in rectangular form.

##### Exponential Expressions

In this quiz, you will have a chance to practice basic terminology of exponential expressions and how to evaluate them.

##### Graphs and Functions

This quiz helps you easily identify a function and test your understanding of ranges, domains , function inverses and transformations.