For any positive even integer \( p \), every positive odd integer will be of the form:
Show Hint
- \( p \)
- \( p + 1 \)
- \( 2p \)
- \( 2p + 1 \)
The Correct Option is D
Solution and Explanation
Step 1: Understanding even and odd integers.
An even integer is any integer that can be written in the form \( 2n \), where \( n \) is an integer. A positive odd integer is one that cannot be divided by 2, and can be written in the form \( 2k + 1 \), where \( k \) is an integer.
Step 2: Applying the condition for the even integer \( p \).
Given that \( p \) is a positive even integer, we can express it as \( p = 2m \) where \( m \) is an integer.
Step 3: Forming the positive odd integer.
To find a positive odd integer that is greater than \( p \), we can add 1 to \( p \): \[ 2m + 1 = 2p + 1 \] This is the required odd integer.
Step 4: Conclusion.
Therefore, every positive odd integer will be of the form \( 2p + 1 \).
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