Question
Find $\int_{C}(z d x+x d y+y d z),$ where $C$ is the circular helix $x=a \cos t, y=a \sin t, z=t, 0 \leq t \leq 2 \pi$
Step 1
Step 1: First, we separate the integral into three parts: \[\int_{C}(z d x+x d y+y d z)=\int_{C}z d x+\int_{C}x d y+\int_{C}y d z\] Show more…
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