题目内容

凸n边形有f(n)条对角线,则凸n+1边形的对角线的条数f(n+1)为(    )

A.f(n)+n+1                               B.f(n)+n

C.f(n)+n-1                                D.f(n)+n-2

C

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凸n边形有f(n)条对角线,则凸n+1边形有对角线条数f(n+1)为(    )

A.f(n)+n+1                        B.f(n)+n

C.f(n)+n-1                         D.f(n)+n-2

凸n边形有f(n)条对角线,则凸n+1边形的对角线条数f(n+1)等于(    )

A.f(n)+n+1         B.f(n)+n              C.f(n)+n-1            D.f(n)+n-2

凸n边形有f(n)条对角线,则凸n+1边形有对角线条数f(n+1)为(    )

A.f(n)+n+1                                         B.f(n)+n

C.f(n)+n-1                                          D.f(n)+n-2

凸n边形有f(n)条对角线,则凸n+1边形有f(n+1)条对角线数为(  )

A.f(n)+n-1             B.f(n)+n

C.f(n)+n+1             D.f(n)+n-2

 

凸n边形有f(n)条对角线,则凸n+1边形有f(n+1)条对角线数为(  )

A.f(n)+n-1                       B.f(n)+n

C.f(n)+n+1                       D.f(n)+n-2

 

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