Converse, Inverse, Contrapositive, and Biconditional Stateme
Assessment
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COREN MANALO
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Mathematics
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9th - 12th Grade
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28 plays
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Medium
Student preview
10 questions
Show answers
1.
Multiple Choice
If two lines have no common point, then they are parallel. What is the converse of this conditional statement?
If two lines have a common point, then they are not parallel.
If two lines are parallel, then they have no common point.
If two lines are not parallel, then they have a common point.
Two lines have no common point if and only if they are parallel.
2.
Multiple Choice
If two lines have no common point, then they are parallel. What is the inverse of this conditional statement?
If two lines have a common point, then they are not parallel.
If two lines are parallel, then they have no common point.
If two lines are not parallel, then they have a common point.
Two lines have no common point if and only if they are parallel.
3.
Multiple Choice
If two lines have no common point, then they are parallel. What is the contrapositive of this conditional statement?
If two lines have a common point, then they are not parallel.
If two lines are parallel, then they have no common point.
If two lines are not parallel, then they have a common point.
Two lines have no common point if and only if they are parallel.
4.
Multiple Choice
If two lines have no common point, then they are parallel. What is the biconditional of this conditional statement?
If two lines have a common point, then they are not parallel.
If two lines are parallel, then they have no common point.
If two lines are not parallel, then they have a common point.
Two lines have no common point if and only if they are parallel.
5.
Multiple Choice
Write the if-then form of this statement:
Two circles with equal diameters are congruent.
If two circles are not congruent, then they do not have equal diameters.
Two circles have equal diameters if and only if they are congruent.
If two circles are congruent, then they have equal diameters.
If two circles have equal diameters, then they are congruent.
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