Question

cmr N=22499....9100...09  là số chính phương

          (n-2 số 9)    (n số 0)

 

 

Answer 1

22.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)22.10

2n+1+4.102n+(10n−2−1).10n+2+1.10n+1+922.102n+1+4.102n+(10n−2−1).10n+2+1.10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9=220.102n+4.102n+102n−10n+2+10n+1+9

=102n.225−10n(100−10)+9=102n.225−10n(100−10)+9

=(10n.15)2−90.10n+9=(10n.15)2−90.10n+9

=(10n.15−3)2=(10n.15−3)2

Vậy A là Số Chính Phương (đpcm)

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