曲线参数方程为x=t-t^3,y=1-t^4(t为参数)求该曲线所围图形的面积?
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先求交点:t-t^3=1-t^4
t1=1 t2=-1
dA=(1/2)*∮(xdy-ydx)=0.5∮[(t-t^3)(-4t^3)-(1-t^4)((1-3t^2)]dt
=0.5∮[(t-t^3)(-4t^3)-(1-t^4)((1-3t^2)]dt
=0.5∮[(-t^4+2t^2-1)]dt
=0.5*2∫(0,1)(1-2t^2+t^4)dt=(t-2t^3/3+t^5/5)|(0,1)=8/15
t1=1 t2=-1
dA=(1/2)*∮(xdy-ydx)=0.5∮[(t-t^3)(-4t^3)-(1-t^4)((1-3t^2)]dt
=0.5∮[(t-t^3)(-4t^3)-(1-t^4)((1-3t^2)]dt
=0.5∮[(-t^4+2t^2-1)]dt
=0.5*2∫(0,1)(1-2t^2+t^4)dt=(t-2t^3/3+t^5/5)|(0,1)=8/15
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