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If you are looking for some problems with solutions you can find some by clicking on the "Practice Problems" link above.
If you are looking for some problems with solutions you can find some by clicking on the "Practice Problems" link above.
Section 16.3 : Line Integrals - Part II
For problems 1 – 7 evaluate the given line integral. Follow the direction of \(C\) as given in the problem statement.
- Evaluate \( \displaystyle \int\limits_{C}{{xy\,dx + \left( {x - y} \right)\,dy}}\) where \(C\) is the line segment from \(\left( {0, - 3} \right)\) to \(\left( { - 4,1} \right)\).
- Evaluate \( \displaystyle \int\limits_{C}{{{{\bf{e}}^{3x}}\,dx}}\) where \(C\) is portion of \(x = \sin \left( {4y} \right)\) from \(\displaystyle y = \frac{\pi }{8}\) to \(y = \pi \).
- Evaluate \( \displaystyle \int\limits_{C}{{x\,dy - \left( {{x^2} + y} \right)\,dx}}\) where \(C\) is portion of the circle centered at the origin of radius 3 in the 2nd quadrant with clockwise rotation.
- Evaluate \( \displaystyle \int\limits_{C}{{dx - 3{y^3}\,dy}}\) where \(C\) is given by \(\vec r\left( t \right) = 4\sin \left( {\pi t} \right)\,\,\vec i + {\left( {t - 1} \right)^2}\vec j\) with \(0 \le t \le 1\).
- Evaluate \( \displaystyle \int\limits_{C}{{4{y^2}\,dx + 3x\,dy + 2z\,dz}}\) where \(C\) is the line segment from \(\left( {4, - 1,2} \right)\) to \(\left( {1,7, - 1} \right)\).
- Evaluate \( \displaystyle \int\limits_{C}{{\left( {yz + x} \right)dx + yz\,dy\, - \left( {y + z} \right)\,dz}}\) where \(C\) is given by \(\vec r\left( t \right) = 3t\,\vec i + 4\sin \left( t \right)\vec j + 4\cos \left( t \right)\,\vec k\) with \(0 \le t \le \pi \).
- Evaluate \( \displaystyle \int\limits_{C}{{7xy\,dy}}\) where \(C\) is the portion of \(y = \sqrt {{x^2} + 5} \) from \(x = - 1\) to \(x = 2\) followed by the line segment from \(\left( {2,3} \right)\) to \(\left( {4, - 1} \right)\). See the sketch below for the direction.
- Evaluate \( \displaystyle \int\limits_{C}{{\left( {{y^2} - x} \right)\,dx - 4y\,dy}}\) where \(C\) is the portion of \(y = {x^2}\) from \(x = - 2\) to \(x = 2\) followed by the line segment from \(\left( {2,4} \right)\) to \(\left( {0,6} \right)\) which in turn is followed by the line segment from \(\left( {0,6} \right)\) to \(\left( { - 2,4} \right)\). See the sketch below for the direction.
- Evaluate \( \displaystyle \int\limits_{C}{{\left( {{x^2} - 2} \right)\,dx + 7x{y^2}\,dy}}\) for each of the following curves.
- \(C\) is the portion of \(x = - {y^2}\) from \(y = - 1\) to \(y = 1\).
- \(C\) is the line segment from \(\left( { - 1, - 1} \right)\) to \(\left( {1,1} \right)\).
- Evaluate \( \displaystyle \int\limits_{C}{{{x^3} + 9y\,dy}}\) for each of the following curves.
- \(C\) is the portion of \(y = 1 - {x^2}\) from \(x = - 1\) to \(x = 1\).
- \(C\) is the line segment from \(\left( { - 1,0} \right)\) to \(\left( {0, - 1} \right)\) followed by the line segment from \(\left( {0, - 1} \right)\) to \(\left( {1,0} \right)\).
- Evaluate \( \displaystyle \int\limits_{C}{{x{y^3}\,dx - 4x\,dy}}\) for each of the following curves.
- \(C\) is the portion of the circle centered at the origin of radius 7 in the 1st quadrant with counter clockwise rotation.
- \(C\) is the portion of the circle centered at the origin of radius 7 in the 1st quadrant with clockwise rotation.