Chat with AIExam 16: Vector Calculus
Exam 1: Preliminaries101 Questions
Exam 2: Limits and Continuity105 Questions
Exam 3: Differentiation116 Questions
Exam 4: Applications of the Derivative118 Questions
Exam 5: Integration129 Questions
Exam 6: Applications of the Definite Integral85 Questions
Exam 7: Exponentials, Logarithms and Other Transcendental Functions66 Questions
Exam 8: Integration Techniques123 Questions
Exam 9: First-Order Differential Equations72 Questions
Exam 10: Infinite Series111 Questions
Exam 11: Parametric Equations and Polar Coordinates129 Questions
Exam 12: Vectors and the Geometry of Space107 Questions
Exam 13: Vector-Valued Functions103 Questions
Exam 14: Functions of Several Variables and Partial Differentiation112 Questions
Exam 15: Multiple Integrals92 Questions
Exam 16: Vector Calculus67 Questions
Exam 17: Second Order Differential Equations38 Questions
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Determine whether 
is conservative, and if so, find a potential function 
of the vector field.
is conservative, and if so, find a potential function of the vector field. (Multiple Choice)
4.8/5 
(40)
(40) Set up a double integral that equals 
where S is the portion of the plane 
above the rectangle 
where S is the portion of the plane above the rectangle (Essay)
4.9/5 (39)
(39) Use Stokes' Theorem to compute 
for 
and S is the portion of 
above the xy-plane with 
upward.
for and S is the portion of above the xy-plane with upward. (Multiple Choice)
4.8/5 (39)
(39) 
Find a potential function and evaluate the integral 
where C runs from 
to 
where C runs from to (Essay)
4.8/5 (42)
(42) Compute the work done by the force field 
along the curve C, where C is the helix 
from 
to 
.
along the curve C, where C is the helix from to . (Multiple Choice)
4.7/5 (24)
(24) 
from 
to 
.Evaluate the flux integral 
S is the portion of 
above the xy-plane (n upward)
S is the portion of above the xy-plane (n upward) (Multiple Choice)
4.9/5 (42)
(42) Use Green's Theorem to evaluate 
where C is curve bounded by 
and 
where C is curve bounded by and (Multiple Choice)
4.8/5 (45)
(45) Use the Divergence Theorem to compute 
for 
and Q bounded by 
and 
.
for and Q bounded by and . (Multiple Choice)
4.7/5 (36)
(36) 
for 
and C is the quarter circle from 
to 
.Determine whether 
is conservative, and if so, find a potential function 
of the vector field.
is conservative, and if so, find a potential function of the vector field. (Multiple Choice)
4.9/5 (33)
(33) Use Green's Theorem to evaluate 
where C is curve bounded by 
and 
oriented clockwise.
where C is curve bounded by and oriented clockwise. (Multiple Choice)
4.7/5 (46)
(46) Use Stokes' Theorem to compute 
for 
and S is the portion of a tetrahedron bounded by 
and the coordinate planes with 
and 
upward.
for and S is the portion of a tetrahedron bounded by and the coordinate planes with and upward. (Multiple Choice)
4.9/5 (43)
(43) Use Stoke's Theorem to evaluate 
where 
C is the intersection of 
and 
oriented counterclockwise as viewed from above.
where C is the intersection of and oriented counterclockwise as viewed from above. (Multiple Choice)
4.8/5 (32)
(32) 
.Use a line integral to compute the area of the region bounded by the ellipse 
.
. (Multiple Choice)
4.9/5 (38)
(38) Determine whether the vector field is conservative and/or incompressible on R3. 
(Multiple Choice)
4.8/5 (38)
(38) Compute the work done by the force field 
along the curve C, where C is the portion of 
from 
to 
.
along the curve C, where C is the portion of from to . (Multiple Choice)
4.8/5 (36)
(36) 
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