1.使用参漏困数法.
令(x-1)/2=cost,(y+1)/2=sint,得:
x=1+2cost,y=-1+2sint,dx=-2sintdt,dy=2costdt,代入积分式得:
∫(L) (x+y)dy+(x-y)dx/(x^2+y^2-2x+2y)
=∫(L) (x+y)dy+(x-y)dx/[(x-1)²+(y+1)²-2]
=(下限0,上限2π)∫[4(cost+sint)cost-4(1+cost-sint)sint]dt/(4-2)
=(下限0,上限2π)∫2(1-sint)dt=4π
2.使用格氏搜顷林理论.
∫(L) (x+y)dy+(x-y)dx/(x^2+y^2-2x+2y)
=∫(L) (x+y)dy+(x-y)dx/[(x-1)²+(y+1)²-2] ...由于圆周是(x-1)²+(y+1)²=4.在圆的周边线上积分时,上面分母中的(x-1)²+(y+1)²=4.所以:
∫(L) (x+y)dy+(x-y)dx/[(x-1)²+(y+1)²-2]
=∫(L) (x+y)dy+(x-y)dx/(4-2)
=(1/2)∫(L) (x+y)dy+(x-y)dx
使用格林理论将上面的歼陆线积分转化为面积分:
=(1/2)∫∫(S)[∂(x+y)/∂x-∂(x-y)/∂y]dxdy
=(1/2)∫∫(S)(1+1)dxdy=(1/2)∫∫(S)(2)dxdy
=∫∫(S)dxdy
上面的面积分积分就是这个圆的面积.由于这个圆的半径是2,所以,其面积为πr²=π2²=4π.