解答题
12.∫0t2dx
【正确答案】如图8.13所示.当z∈[0,t2]时,
≤t(t>0),于是
原式=-∫0t2
-∫0tdy0y2f(x,y)dx
=∫0tdy∫y20f(x,y)dx.
≤t(t>0),于是原式=-∫0t2
-∫0tdy0y2f(x,y)dx=∫0tdy∫y20f(x,y)dx.
【答案解析】