Evaluating Line Integrals and Theorems

The line integral is always positive.

The line integral is zero for any closed path.

The line integral is the difference in potential function values at two points.

The line integral depends on the path taken.

Because it simplifies to a gradient calculation.

Because it involves gradients of scalar fields.

Because it only applies to gradient fields.

Because it uses the gradient operator.

Using the fundamental theorem directly.

Parsing the curve in terms of T.

Using a simpler path.

None of the above.

The vector field must be constant.

The partial derivatives must be equal.

The vector field must be zero.

The vector field must be linear.

By solving a system of linear equations.

By comparing anti-derivatives of partial derivatives.

By integrating the vector field with respect to time.

By differentiating the vector field with respect to space.

It changes the potential function.

It makes the vector field non-conservative.

It ensures the result is always zero.

It reduces the number of calculations.

From -∞ to ∞

From 0 to 1

From -1 to 1

From 0 to the endpoint value

0

27

54

81

It is less accurate.

It requires more computational work.

It only works for non-conservative fields.

It cannot be used for closed paths.

By providing a direct formula for the integral.

By reducing the problem to a single point evaluation.

By allowing the use of any path.

By eliminating the need for integration.