Evaluate the line integral of A(x, y) = 2xyx + x^2y along the three paths shown in Fig. A.6.

Question

Evaluate the line integral of A(x, y) = [latex]2xy\hat{x} + x^{2}\hat{y}[/latex] along the three paths shown in Fig. A.6.

Accepted Answer

Along path 1 we have

[latex]\int_{C_{1}} A(x,y)⋅dl = \int_{0}^{y_{0}} 0 dy + \int_{0}^{x_{0}} 2x y_{0} dx [/latex]

= [latex]x_{0}^{2} y_{0} [/latex].

Along path 2 we have

y = [latex] \frac{y_{0}}{x_{0}} [/latex]x

and

dy = [latex] \frac{y_{0}}{x_{0}} [/latex]dx,

with dl = dx[latex]\hat{x} + (y_{0}/x_{0}) dx\hat{y}[/latex]. Thus, the integration reduces to

[latex] \int_{C_{2}} A(x,y) ⋅ dl = \int_{0}^{x_{0}} 2xy dx + \int_{0}^{x_{0}} x^{2} \frac{y_{0}}{x_{0}} dx[/latex]

= [latex] 2\frac{y_{0}}{x_{0}} \int_{0}^{x_{0}} x^{2} dx + \frac{y_{0}}{x_{0}} \int_{0}^{x_{0}} x^{2} dx[/latex]

= [latex]x_{0}^{2} y_{0} [/latex].

Last, along path 3 we obtain

[latex] \int_{C_{3}} A(x,y) ⋅ dl = \int_{0}^{x_{0}} 2x 0 dx + \int_{0}^{y_{0}} x_{0}^{2} dy [/latex]

= [latex]x_{0}^{2} y_{0} [/latex].

Question A.4.2: Evaluate the line integral of A(x, y) = 2xyx + x^2y along th...