show that all the square of positive integer cannot be of the form 6m+2or 6m+5
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gunu931:
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Answered by
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Hey ,,!!!
Answer Of Your Question☺️
-----------------------------------------------------
→Let's, The Square Of Any Positive Integer Is In The Form =6q+2,,,6q+5
X=6q+2
Square Both Side:-
(X)^2=36q^2+4+24q
→(X)^2=36q^2-6+2+24q
→(X)^2=6 [(6q)^2-1+4q]+2
Now, Think Whole 【(6q)^2-1+4q】=m
So,
X=6m+2
Hope My Answer Helped☺️
Answer Of Your Question☺️
-----------------------------------------------------
→Let's, The Square Of Any Positive Integer Is In The Form =6q+2,,,6q+5
X=6q+2
Square Both Side:-
(X)^2=36q^2+4+24q
→(X)^2=36q^2-6+2+24q
→(X)^2=6 [(6q)^2-1+4q]+2
Now, Think Whole 【(6q)^2-1+4q】=m
So,
X=6m+2
Hope My Answer Helped☺️
there exists some mistakes i guess. :thinking: I said disprove 6m+2 :sweat-smile: ☺
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