Every odd integer is of the form 2m − 1,

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Question:
Every odd integer is of the form 2m − 1, where m is an integer (True/False).

Solution:

Every odd integer is of the form $2 m-1$, where $m$ is an integer (True/False)

True

Reason:

Let the various values of m as -1, 0 and 9.

Thus, the values for $2 m-1$ become $-3,-1$ and 17 respectively.

These are odd integers.