Question: (b) If m is any odd integer, then 2m is even. Which of the following is the converse of the statement? If 2m is an

(b) If m is any odd integer, then 2m is even. Which of the following is the converse of the statement? If 2m is an odd integer, then m is an odd integer. If 2m is an even integer, then m is an even integer. If 2m is an even integer, then m is an odd integer. If m is any odd integer, then 2m is odd. If m is any even integer, then 2m is odd. Counterexample for the converse: Let m = . Choose the sentence that completes the counterexample. Then 2m is an even integer and m is not even. Then m is an odd integer and 2m is even. Then 2m is an even integer but m is not odd. Then m is an odd integer but 2m is not even. (c) If two circles intersect in exactly two points, then they do not have a common center. Which of the following is the converse of the statement? If two circles do not have a common center, then they do not intersect in exactly two points. If two circles have a common center, then they intersect in exactly two points. If two circles do not have a common center, then they intersect in exactly two points. If two circles do not intersect in exactly two points, then they do not have a common center. If two circles intersect in exactly two points, then do have a common center

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