计算不定积分∫dx/(1+√x).
∫dx/(1+√x),令t=√x,则x=t2,dx=2tdt,所以 原式∫2tdt/(1+t)=2∫tdt/(1+t) =2•∫[(1+t-1)/(1+t)]dt =2∫(1-1/(1+t)]dt =2[∫dt-∫dt/(1+t)] =2(t-ln∣1+t∣)+C =2(√x-ln∣1+√x∣)+C
计算不定积分∫dx/(1+√x).
∫dx/(1+√x),令t=√x,则x=t2,dx=2tdt,所以 原式∫2tdt/(1+t)=2∫tdt/(1+t) =2•∫[(1+t-1)/(1+t)]dt =2∫(1-1/(1+t)]dt =2[∫dt-∫dt/(1+t)] =2(t-ln∣1+t∣)+C =2(√x-ln∣1+√x∣)+C
