Question: EXAMPLE 5 Evaluate C ysin(z)ds, where C is the circular helix given by the equations x = cos(t), y = sin(t), z = t,0 t

EXAMPLE 5 Evaluate C ysin(z)ds, where C is the circular helix given by the equations x = cos(t), y = sin(t), z = t,0 t 2.SOLUTION The formula for a line integral in space gives the following.y sin(z)ds=dt=(sin(t))2(cos(t))2+(sin(t))2+1dt=12(1- cos(2t))dt=22=

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