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13 Nov 2019
INSTRUCTOR PAVEL BLEHE Problem 2. (a) Show that the vector field is conservative, so that curl F = 0, (10 points) (b) Find a potential function f such that â½f = (f.ãµ:W-F. (e) Apply the fundamental theorem for line integrals, (10 points) F/ . dr = f(r(b))-f(r(a))/ to calculate the line integral, where C is given parametrically as C:z=sin2 t, y=sin 2t, z=-cost; 0stst. (10 points)
INSTRUCTOR PAVEL BLEHE Problem 2. (a) Show that the vector field is conservative, so that curl F = 0, (10 points) (b) Find a potential function f such that â½f = (f.ãµ:W-F. (e) Apply the fundamental theorem for line integrals, (10 points) F/ . dr = f(r(b))-f(r(a))/ to calculate the line integral, where C is given parametrically as C:z=sin2 t, y=sin 2t, z=-cost; 0stst. (10 points)
Nelly StrackeLv2
23 Jan 2019