问题
填空题
已知a+2b+3c=6,则a2+2b2+3c2的取值范围是______.
答案
∵a+2b+3c=6,
∴a=6-2b-3c,
∴(6-2b-3c)2+2b2+3c2
=36+4b2+9c2-24b-36c+12bc+2b2+3c2
=6(b2+2c2-4b-6c+2bc+6)
=6[(b2+2bc+c2-4b-4c+4)+(c2-2c+1)+1]
=6[(b+c-2)2+(c-1)2+1]
=6(b+c-2)2+6(c-1)2+6≥6,
∴a2+2b2+3c2的取值范围是:大于等于6.
故答案为:大于等于6.