Find $\int_{C} x^{5} y^{2} d x$ where $C$ is the arc of the curve $x=y^{2}$ from $(0,0)$ to $(4,2)$.
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Final Answer: \(\boxed{\frac{8192}{13}}\)
Step 1 :Parameterize the curve C using the equation \(x=y^{2}\), where \(y\) ranges from 0 to 2.
Step 2 :Substitute \(x\) with \(y^{2}\) in the integrand to get \(y^{12}\).
Step 3 :Integrate \(y^{12}\) with respect to \(y\) from 0 to 2 to get the integral.
Step 4 :The integral of \(x^{5} y^{2}\) over the curve C from \((0,0)\) to \((4,2)\) is \(\frac{8192}{13}\).
Step 5 :Final Answer: \(\boxed{\frac{8192}{13}}\)