Understanding Conservative Vector Fields and Line Integrals

Check if the vector field is two-dimensional.

Determine if the vector field has continuous partial derivatives.

Find the divergence of the vector field.

Calculate the curl of the vector field.

The components must be linear functions.

The partial derivative of q with respect to x must equal the partial derivative of p with respect to y.

The curl must be non-zero.

The divergence must be zero.

To ensure the vector field is continuous.

To simplify the integration process.

To determine the divergence of the field.

To confirm that the potential function exists.

1/2 x^3 y^3 + C

x^2 y^2 + C

x^3 y^3 + C

1/3 x^3 y^3 + C

It must be determined from boundary conditions.

It does not affect the line integral.

It is always zero.

It affects the value of the line integral.

Differentiation

Division

Integration

Multiplication

The line integral is equal to the curl of the vector field.

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

The line integral depends on the path taken.

The line integral is always zero.

x(t) = cos(t), y(t) = sin(t)

x(t) = 2 cos(t), y(t) = 2 sin(t)

x(t) = 2t, y(t) = 2t

x(t) = t, y(t) = t

0

2

4/3

8/3

It represents the length of the curve.

It is a constant value.

It is a variable that traces the curve.

It determines the direction of the curve.