Which statement can be combined with its converse to form a true biconditional? A. If an angle is a straight angle, then its sides are opposite rays. B. If the measure of an angle is 30, then it is an acute angle. C. If a ray is the perpendicular bisector of a segment, then the ray divides the segment into two congruent segments. D. If two lines intersect, then the two lines are not skew.
B.
When a conditional and its converse are true, you can combine them as a true _____ A. counterexample. B. hypothesis. C. biconditional. D. unconditional
biconditional
Identify the converse of the following conditional: If a point is in the fourth quadrant, then its coordinates are negative. A. If a point is in the fourth quadrant, then its coordinates are negative. B. If the coordinates of a point are not negative, then the point is not in the fourth quadrant. C. If a point is not in the fourth quadrant, then the coordinates of the point are not negative. D. If the coordinates of a point are negative, then the point is in the fourth quadrant.
May I get a medal? D
I CANT BECAUSE U ANSWERED MY QUESTION IS THE SAME PAGE AS MY OTHER QUESTION SO IT TELLS ME THAT I ALREADY GAVE U ONE
Oh lol. I finally see it. Lol. Anymore questions?
@boo29 do you still have the answers to this test?
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