MATH 317 Study Guide - Midterm Guide: Divergence Theorem, Ellipse

Suppose r rightarrow (t) = cos t i rightarrow + sin t j rightarrow + 4t k rightarrow represents the position of a particle on a helix, where Z is the height of the particle above the ground. Is the particle ever moving downward? If the particle is moving downward, when is this? When t is in (Enter none if it is never moving downward; otherwise, enter an interval or comma-separated list of intervals, e.g.. (0,3], [4,5).) When does the particle reach a point 12 units above the ground? When t = What is the velocity of the particle when it is 12 units above the ground? v rightarrow = When it is 12 units above the ground, the particle leaves the helix and moves along the tangent. Find parametric equations for this tangent line (pick t so that it is continuous through the time when the particle leaves the helix). X(t) = , y(t) = , z(t) = Note: You can earn partial credit on this problem.

Which (if any) of the following vector fields are conservative: F rightarrow (x, y) = exy rightarrow + ex+y j rightarrow F rightarrow (x, y) = 2x cos y i rightarrow - x2 sin y j rightarrow Determine if the field F rightarrow (x, y, z) = cos xz, sin yz, xy sin z is conservative. Let F rightarrow(x, y) = xy2 i rightarrow + x2y j rightarrow. Evaluate C F rightarrow · d s rightarrow where C is the upper half of the circle of radius 1 centered at the origin orientated counterclockwise, Find a potential function for F rightarrow (x, y, z) = yz2, xz2 - z, 2xyz - y . Use part (a) to evaluate C Frightarrow · d s rightarrow where C is any path in space from P = (1, 2, 3) to Q = (3, 2, 1). Let F rightarrow (x, y, z) = z2/x i rightarrow + z2/y j rightarrow + 2z In xy k rightarrow. Evaluate intC F rightarrow · d s rightarrow Where C is the path of straight line segments form P = (1, 2, 1) to Q = (4, 1, 7) to R = (5, 11, 7), and then back to P. (Bonus question: worth 10 points. Total points for assignment not to exceed 100.) Suppose T · d s rightarrow = 1 where T is the path from P = (-2, 1) to Q = (2, 1) along the top half of the ellipse 3x2 + 11y2 = 23. Determine the value of · d s rightarrow where B is the path form P to Q along the bottom half of that ellipse.

Which (if any) of the following vector fields are conservative: F rightarrow (x, y) = exy i rightarrow + ex+y j rightarrow F rightarrow (x, y) = 2x cos y i rightarrow - x2 sin y j rightarrow Determine if the field F rightarrow (x, y, z) = cos xz, sin yz, xy sin z is conservative. Let F rightarrow (x, y) = xy2 i rightarrow + x2y j rightarrow. Evaluate C F rightarrow · ds rightarrow where C is the upper half of the circle of radius 1 centered at the origin orientated counterclockwise. Find a potential function for Frightarrow (x, y, z) = yz2, xz2 - z, 2xyz - y . Use part (a) to evaluate C F rightarrow · ds rightarrow where C is any path in space from P = (1, 2, 3) to Q = (3, 2, 1). Let F rightarrow (x, y, z) = z2/x i rightarrow + x2/y j rightarrow + 2z ln xy k rightarrow. Evaluate C F rightarrow · d s rightarrow Where C is the path of straight line segments from P = (1, 2, 1) to Q = (4, 1, 7) to R = (5, 11, 7), and then back to P. (Bonus question: worth 10 points. Total points for assignment not to exceed 100.) Suppose T nabla phi · d s rightarrow = 1 where T is the path from P = (-2, 1) to Q = (2, 1) along the top half of the ellipse 3x2 + 11y2 = 23. Determine the value of int B nabla phi · d s rightarrow where B is the path from P to Q along the bottom half of that ellipse.