2. Evaluate f (x^²y³ − 2y)dx + (3x + x³y²)dy where is the curve given below oriented in clockwise direction.

Transcribed Image Text:

### Problem 2: Evaluate the Line Integral Evaluate the line integral \[ \oint_{C} (x^4y^5 - 2y)dx + (3x + x^5y^4)dy \] where \( C \) is the curve given below oriented in a clockwise direction. ### Explanation of the Graph: The graph displays a piecewise linear closed curve \( C \) on the xy-plane. The curve consists of straight line segments forming a step-like path. Below is a detailed description of the curve's path: - **Starting Point**: The curve begins at point (0,0). - **Segment 1**: Moves horizontally from (0, 0) to (2, 0). - **Segment 2**: Moves vertically from (2, 0) to (2, 3). - **Segment 3**: Moves horizontally from (2, 3) to (1, 3). - **Segment 4**: Moves vertically from (1, 3) to (1, 1). - **Segment 5**: Moves horizontally from (1, 1) to (0, 1). - **Segment 6**: Moves vertically from (0, 1) back to the starting point (0, 0). The curve forms a non-standard, step-shaped path with clear vertex points at each directional change, as denoted by the grid lines on the plane. The axes are labeled with x and y, and grid lines mark the integers from -2 to 2 on the x-axis and from 0 to 4 on the y-axis. Note: The orientation of the curve is in a clockwise direction, which is important for evaluating the line integral.