## anonymous one year ago State the converse of the statement. If x is odd, then 2x is even. A. If x is not odd, then 2x is not even. B. If 2x is not even, then x is not odd. C. If x is odd, then 2x is even. D. If 2x is even, then x is odd.

1. anonymous

brb

2. freckles

$\text{ converse of } p \implies q \text{ is } q \implies p$

3. anonymous

ok i'm back :)

4. anonymous

@Mehek14

5. anonymous

i'm thinking C

6. anonymous

no

7. anonymous

thanks for the help

8. anonymous

@pinkbubbles

9. freckles

Here is example: The converse of "If cheetos are orange, then cheetos remind me of cheese." is "If cheetos remind me of cheese, then cheetos are orange."

10. freckles

So the converse of "if p then q" is "if q then p" means you are going to just switch your hypothesis part and conclusion part

11. anonymous

so D then it has to be?

12. freckles

yes that does give you the converse

13. anonymous

thanks