For any integer m, every even integer is always of the form
Question
For any integer m, every even integer is always of the form
Solution
For any integer m, every even integer is always of the form 2m. This is because even numbers can always be expressed as a multiple of 2.
Similar Questions
For some integer q, every odd integer is of the form
If m and n are odd positive integers, then m2 + n2 is even, but not divisible by 4. Justify.
An even number can be expressed as the square of an integer as well as a cube of another integer. Then the number has to be necessarily divisible by:
For some integer n, the odd integer is represented in the form of:
For some integer p, every even integer is of the formDeselect Answer p 2p + 1 2p p + 1
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.