以
临界点分段讨论①当x≥-1时,x+1>0,x+2>0,x+1≥0∴原不等式等价于:x+3+x+2+x+1>3即3x+6>3∴x>-1∴此时不等式的解为:x>-1②当-2≤x<-1时,a+3>0,x+2≥0,x+1<0原不等式等价于:x+3+x+2-(x+1)>3即x+4>3∴x>-1所以此时不等式无解③当-3≤x<-2时,x+3≥0,x+2<0,x+1<0∴原不等式等价于:x+3-(x+2)-(x+1)>3即-x>3∴x<-3,∴此时不等式无解④当x<-3时,x+3<0,x+2<0,x+1<0原不等式等价于:-(x+3)-(x+2)-(x+1)>3即-3x-6>3∴x<-3所以此时不等式的解为:x<-3综上所述:不等式的解集为{x|>-1或x<-3}