Exam 15: Vector Anal

Determine the tangent plane for the hyperboloid at . ​

Evaluate , where . ​

Calculate the line integral along for and C is any path starting at the point and ending at . ​

Find a vector-valued function whose graph is the plane . ​

The surface of the dome on a new museum is given by , where and and is in meters. Find the surface area of the dome. ​

Evaluate the line integral using the Fundamental Theorem of Line Integrals, where is the smooth curve from to . ​

For the vector field , find the value of for which the field is conservative. ​

Write a set of parametric equations for the surface of revolution obtained by revolving the graph of the function about the given axis. ​ -axis ​

Find for the vector field given by . ​

Use Divergence Theorem to evaluate and find the outward flux of through the surface S of the solid bounded by the planes and . ​

Match the following vector-valued function with its graph. ​

Use Green's Theorem to evaluate the integral for the path C: .

Find the total mass of the wire with density . ​ , , ​

Use the Divergence Theorem to evaluate and find the outward flux of through the surface of the solid bounded by the graphs of the equations. Use a computer algebra system to verify your results. ​ ​

Use Green's Theorem to evaluate the line integral where is . ​

Determine whether the vector field is conservative. If it is, find a potential function for the vector field.

Use Divergence Theorem to evaluate and find the outward flux of through the surface S of the solid bounded by the sphere . ​

Use Stokes's Theorem to evaluate . Use a computer algebra system to verify your results. Note: C is oriented counterclockwise as viewed from above. ​

Let and let S be the surface bounded by and . Verify the Divergence Theorem by evaluating as a surface integral and as a triple integral. Round your answer to two decimal places. ​

Find the gradient vector for the scalar function. (That is, find the conservative vector field for the potential function.)