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.

Question

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.

ucreategames · Answer

B.

anonymous · Answer

When a conditional and its converse are true, you can combine them as a true _____
 	 
A.	counterexample.
 
B.	hypothesis.
 
C.	biconditional.
 
D.	unconditional

ucreategames · Answer

biconditional

anonymous · Answer

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.

ucreategames · Answer

May I get a medal? D

anonymous · Answer

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

ucreategames · Answer

Oh lol. I finally see it. Lol. Anymore questions?

anonymous · Answer

@boo29 do you still have the answers to this test?