MATH 317 Study Guide - Midterm Guide: Divergence Theorem, Ellipse
Document Summary
Each question is of equal value and is worth 10 points. Note that the maximum number of points is 70. A score of n/70 will be treated as. 2 t: let r t tx i ty j tz k be the position of a particle at time t. suppose the motion of the particle satisfies the differential equation. | r=r (a) suppose f(r) is an arbitrary function of r. prove or disprove each of the following statements. (i) (ii) . 2 j y i x k a y x z z. 2 answer. (d) let e be the solid region bounded by the surfaces z. Let be the bounding surface of e. determine the flux of f (e) let r be the solid region bounded by the surfaces. 2 x z of r. determine the flux of f outwards through. ,0 z where (a) find the flux of f upwards across (b) find all values of the constants cba.