State Euclid's division lemma. Using it show that square of any positive integer is either of the form 5m or 5m+1 wherem is an integer Advertisement
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Sol :
Let x be any integer
Then x = 5m or x = 5m+1 or x = 5m+4 for integer x.
If x = 5m, x2 = (5m)2 = 25m2 = 5(5m2) = 5n (where n = 5m2 )
If x = 5m+1, x2 = (5m+1)2 = 25m2+10m+1 = 5(5m2+2m)+1 = 5n+1 (where n = 5m2+2m )
If x = 5m+4, x2 = (5m+4)2 = 25m2+40m+16 = 5(5m2+8m+3)+1 = 5n+1 (where n = 5m2+8m+3 )
∴in each of three cases x2 is either of the form 5n or 5n+1 for integer
hope help u
^_^
Sol :
Let x be any integer
Then x = 5m or x = 5m+1 or x = 5m+4 for integer x.
If x = 5m, x2 = (5m)2 = 25m2 = 5(5m2) = 5n (where n = 5m2 )
If x = 5m+1, x2 = (5m+1)2 = 25m2+10m+1 = 5(5m2+2m)+1 = 5n+1 (where n = 5m2+2m )
If x = 5m+4, x2 = (5m+4)2 = 25m2+40m+16 = 5(5m2+8m+3)+1 = 5n+1 (where n = 5m2+8m+3 )
∴in each of three cases x2 is either of the form 5n or 5n+1 for integer
hope help u
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