show that any positive odd integer is of the form 4q+1 or 4q+3where q is some integer
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4q+1
4q+3=4q+2+1=2(2q+1)+1=2m+1
as 4q+1 and 2m+1 are not divisible by 2 exactly therefore these are expressions for odd numbers
4q+3=4q+2+1=2(2q+1)+1=2m+1
as 4q+1 and 2m+1 are not divisible by 2 exactly therefore these are expressions for odd numbers
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Step-by-step explanation:
Let a be the positive integer.
And, b = 4 .
Then by Euclid's division lemma,
We can write a = 4q + r ,for some integer q and 0 ≤ r < 4 .
°•° Then, possible values of r is 0, 1, 2, 3 .
Taking r = 0 .
a = 4q .
Taking r = 1 .
a = 4q + 1 .
Taking r = 2
a = 4q + 2 .
Taking r = 3 .
a = 4q + 3 .
But a is an odd positive integer, so a can't be 4q , or 4q + 2 [ As these are even ] .
•°• a can be of the form 4q + 1 or 4q + 3 for some integer q .
Hence , it is solved .
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