证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)

来源:学生作业帮助网 编辑:六六作业网 时间:2024/12/18 18:19:25
证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)证明:11…122…25(n个1,n+1个2)=

证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)
证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)

证明:11…122…25(n个1,n+1个2)=(33…35)^2(n个3)
333...35^2(n个3)
=(333...3+2)^2(n+1个3)
=(3*111...1+2)^2(n+1个1)
=(3*111...1)^2+12*111...1+4(n+1个1)
=9*111...1^2+10*111...1+2*111...1+4(n+1个)
=111...1*(999...9+10+2)+4(n+1个1,n+1个9)
=111...1*(1000...0+10+1)+4(n+1个1,n个0)
=111...1000...0+111...10+111...1+4(n+1个1,n+1个0)
=111...1+1222...2+4(n+1个1,n个2)
=111...1222...25(n个1,n+1个2).

1225=35^2
112225=335*335
11122225=3335*3335
…………………………
…………………………
…………………………
由归纳法可得等式成立