## Math 311-101 Current Assignment — Summer I 2016

**Assignment 8** - Due Thursday, June 30, 2016

- Read sections 10.2, 11.2, 11.3
- Do the following problems.

- Section 10.2 (pg. 685): 10, 17
- Section 11.2 (pg. 739): 9(a), 14
- Section 11.3 (pg. 755): 4, 5

- These problems are for practice. We will discuss them in
class. Don't turn them in.

- Section 11.3 (pg. 755-757): 18, 20
- Verify Stokes's Theorem in case
**F**= 2y**i** + 3x**j**
− z^{3}**k** and S is the upper hemisphere of
x^{2} + y^{2} + z^{2} = 4, which has the
circle x^{2} + y^{2} = 4, z = 0, as a boundary. Use
the normal with positive z component.

Updated 6/28/2016 (fjn)