Math, asked by CandyCakes, 3 months ago

If (PP)^2=MNOP, where M, N, O, P are distinct digits with O being odd. The values of P is/are​

Answers

Answered by amitnrw
1

Given :  (PP)^2=MNOP, where M, N, O, P are distinct digits with O being odd.

To Find : The values of P  

Solution:

(PP)² =  MNOP

1² = 1  , 5² = 25  , 6²  = 36   are only  three combination

where (PP)² =  MNOP will satisfy

Hence P can be 1 , 5  or  6

11²  = 121  not possible

O is 2 hence not odd digit also only three digit number

55²  =  3025

O is 2 hence not odd digit

66²   = 4356

Hence P can be 6

M = 4 , N = 3  O = 5 which is Odd

Value of P is 6

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