The truebiconditionalstatementis:- A point is amidpointof a segment if and only if itdividesthe segment into two congruent segments.Option D is the correct answer.We have,The givenstatementcan be tested forreversibilityby examining if both the original statement and itsconverseare true.The original statement is:"Amidpointof a segment is a point thatdividesa segment into two congruent segments."Theconverseof the statement is:"If a point divides a segment into two congruent segments, it is amidpoint."Now let's evaluate each option:A. If apointdoes not divide a segment into two congruent segments, it is not amidpoint.This statement aligns with the converse of the original statement, making it true.B. Apointthat divides a segment into two congruent segments is a midpoint.This statement aligns with the original statement, making it true.C. This statement isnotreversible.This option states that the original statement is notreversible, which is incorrect because the original statement and its converse align with each other.D. A point is amidpointof a segment if and only if it divides the segment into two congruent segments.This option correctly represents the biconditional relationship between the original statement and its converse.Thus,The truebiconditionalstatementis:- A point is amidpointof a segment if and only if itdividesthe segment into two congruent segments.Learn more aboutmidpointsoflinesegmentshere:brainly.com/question/13792156#SPJ6...

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