(a) Verify that the Fundamental Theorem for Line Integrals can be used to evaluate the integral Sc ey dx + e dy, where C is the parabola r(t) =< t+ 1, t² >, for –1

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### Exercise 10.5 #### (a) Verify that the Fundamental Theorem for Line Integrals can be used to evaluate the integral \(\int_C e^x y \, dx + e^x \, dy\), where \(C\) is the parabola \(\vec{r}(t) = < t+1, t^2 >\), for \(-1 \leq t \leq 3\). - Here, we are given a vector function describing the path \(C\). - The parametric equations for the curve are \(x = t + 1\) and \(y = t^2\). #### (b) Evaluate the integral. - Using the Fundamental Theorem for Line Integrals, find the value of the given integral on the specified curve \(C\). In part (a), students are required to confirm that the conditions for applying the Fundamental Theorem are met. In part (b), they are to perform the actual integration, taking advantage of the theorem to simplify the process.