if and b are two odd positive integers such that a>b, then prove that one of the two numbers (a+b/2) and (a-b/2) is odd the other is even
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Step-by-step explanation:
a and b are two odd positive integers
a=2m+1 and b=2n+1
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Given:-
- If a and b are two odd positive integers such that a > b.
To prove:-
- That one of the two numbers (a + b)/2 and (a – b)/2 is odd and the other is even.
Proof:-
- Let a and b be any odd odd positive integer such that a > b
Since any positive integer is of the form q, 2q + 1
- Let a = 2q + 1 and b = 2m + 1,
Where, q and m are some whole numbes.
=> a + b/2 = (2q + 1) - (2m + 1) / 2
=> a + b/2 = 2(q + m) + 1 / 2
=> a + b/2 = (q + m + 1) / 2
- Which is a positive integer.
Also,
=> a - b/2 = (2q + 1) - (2m + 1) / 2
=> a - b/2 = 2(q - m) / 2
=> a - b/2 = (q - m)
- Given a > b
Therefore,
=> 2q + 1 > 2m + 1
=> 2q > 2m
=> q = m
Therefore,
=> a + b / 2 = (q - m) > 0
Thus,
(a + b)/2 is a positive integer.
Now,
Prove that one of the two numbers (a + b)/2 and (a – b)/2 is odd and the other is even.
=> (a + b)/2 - (a – b)/2
=> (a + b) - (a - b) / 2
=> 2b/2
=> b
- b is odd positive integer.
Also,
The proof above that (a + b)/2 and (a - b)/2 are positive integers.
Hence, it is proved that if a and b are two odd positive integer such that a > b then one of the two numbers (a + b)/2 and (a - b)/2 is odd and the other is even.
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