设△ABC的三边长分别为2m+3,m²+2m,m²+3m+3,其中m>0,则△ABC的最大内角的度数为多少

问题描述:

设△ABC的三边长分别为2m+3,m²+2m,m²+3m+3,其中m>0,则△ABC的最大内角的度数为多少

m>0
(m^2+3m+3)-(2m+3)=m^2+m=m(m+1)>0
(m^2+3m+3)-(m^2+2m)=m+3>0
所以m^2+3m+3最大
所以cos最大角=[(2m+3)^2+(m^2+2m)-(m^2+3m+3)^2]/2(m^2+2m)(2m+3)
(2m+3)^2+(m^2+2m)^2-(m^2+3m+3)^2
=(2m+3)^2+(m^2+2m+m^2+3m+3)(m^2+2m-m^2-3m-3)
=(2m+3)^2+(2m^2+5m+3)(-m-3)
=(2m+3)^2+(m+1)(2m+3)(-m-3)
=(2m+3)(2m+3-m^2-4m-3)
=-(2m+3)(m^2+2m)
所以cos最大角=[(2m+3)^2+(m^2+2m)-(m^2+3m+3)^2]/2(m^2+2m)(2m+3)
=-1/2
所以最大角=120度