Understanding Vector Fields and Line Integrals

A function that represents the curl of a vector field.

A function that measures the divergence of a vector field.

A function whose gradient is equal to the vector field.

A function that describes the magnitude of a vector field.

The vector field must be constant.

The curl of the vector field must be zero.

The partial derivative of the y-component with respect to x must equal the partial derivative of the x-component with respect to y.

The divergence of the vector field must be zero.

5x + 4y and 7x + 5y

4x + 5y and 5x + 7y

7x + 5y and 4x + 5y

5x + 7y and 4x + 5y

Because the partial derivatives of the components do not match the required condition.

Because the curl is not zero.

Because the vector field is not defined on an open disk.

Because the divergence is not zero.

To simplify the vector field.

To determine the divergence of the vector field.

To express the vector field in terms of a single variable.

To find the potential function.

By calculating the curl of the vector field.

By using the divergence theorem.

By finding the potential function.

By parameterizing the curve and integrating over the interval.

x = t, y = t^2

x = t^2, y = t^3

x = t^2, y = t

x = t^3, y = t^2

366.50

1832

1832/5

366.25

It determines the potential function.

It combines the vector field components with the derivative of the parameterization.

It simplifies the integration process.

It represents the divergence of the vector field.

The integral becomes undefined.

The integral remains unchanged.

The integral evaluates to zero.

The integral becomes infinite.