凡是分母有根式式,先要使分母有理化,即分子、分母同乘以分母的共轭根式,然后合并同类根式,整理后得到解答结果。
原式=1+根号2+[(根号3)*(1+根号2)/(1-根号2)*(1+根号2)]+根号3
=1+根号2+{(根号3+根号6)/[1^2-(根号2)^2]}+根号3
=1+根号2-根号3-根号6+根号3
故,原式=1+根号2-根号6.
这样更清楚点吧。
或者=1-根号2+根号3-根号2+2-根号6-根号3+根号6-3
=-2根号2
=(1-根号2)^2-(根号3)^2
=1-2根号2+2-3
=-2根号2
(1-根号2+根号3)*(1-根号2-根号3)
=1-根号2-根号3-根号2+2+根号6+根号3-根号6-3
=(1+2-3)-2根号2+(根号6-根号6)+(根号3-根号3)
=-2根号2本回答被提问者采纳
=n-(n+1)
=1
(1-根号2+根号3)*(1-根号2-根号3)
=(1-√2)²-(√3)²=3-2√2-3 =-2√2
(1-根号2+根号3)(1-根号2-根号3) 求值
(1-根号2+根号3)(1-根号2-根号3)=(1-√2+√3)(1-√2-√3)=(1-√2)^2-√3^2 =1-2√2+2-3 =-2√2
计算:(1-根号2+根号3)(1+根号2-根号3)
原式=[1-(√2-√3)][1+(√2-√3)]=1-(√2-√3)^2 =1-(5-2√6)=2√6-4
(1-根号2+根号3)(1-根号2-根号3
解:(1-根号2+根号3)(1-根号2-根号3)=﹙1-根号2﹚²-﹙根号3﹚²=3-2倍的根号2-3 =-2倍的根号2 因为暂时不会用WPS打根号,只能这样表示,不好意思
(1-根号2+根号3)(1+根号2-根号3)等于
(1-根号2+根号3)(1+根号2-根号3)=1-(√3-√2)²=1-(3-2√6+2)=1-(5-2√6)=2√6-4
(1+根号2+根号3)(1-根号2-根号3)怎么算?
把后边的根号二和根号三放在一起,【1+(根号2+根号3)】【1-(根号2+根号3)】=1--(根号2+根号3)的平方=1-(2+3+2倍根号6)=4-2倍根号六
(1+根号2+根号3)(1-根号2-根号3)怎么算
(1+根号2+根号3)(1-根号2-根号3)=(1+(根号2+根号3))(1-(根号2+根号3)=1-(根号2+根号3)平方=1-(10+2根号6)=-9-2根号6
九年级上册数学题 (1+根号2-根号3)(1-根号2+根号3)
原式=(1+(根号2-根号3))*(1-(根号2-根号3))=1-(根号2-根号3)*(根号2-根号3)=1-2-3+2*根号6=2*根号6-4
(1-根号3+根号2)(1+根号3-根号2)
解 原式 =[1-(√3-√2)][1+(√3-√2)]=1²-(√3-√2)²=1-(3-2√6+2)=1-5+2√6 =2√6-4
(1-根号2+3)(1-根号2-根号3)计算
=(1-根号2)(1-根号2)-(1-根号2)根号3+3(1-根号2)-3根号3 =3-2根号2-根号3-根号6+3-3根号2-3根号3 =6-5根号2-4根号3-根号6
