What if you were given a conditional statement like "If I walk to school, then I will be late"? How could you rearrange and/or negate this statement to form new conditional statements? After completing this Concept, you'll be able to write the converse, inverse, and contrapositive of a conditional statement like this one.

### Watch This

CK-12 Converse, Inverse and Contrapositive of a Conditional Statement

James Sousa: Converse, Contrapositive, and Inverse of an If-Then Statement

### Guidance

Consider the statement:
*
If the weather is nice, then I’ll wash the car.
*
We can rewrite this statement using letters to represent the hypothesis and conclusion.

Now the statement is: If , then , which can also be written as .

We can also make the negations, or “nots,” of and . The symbolic version of "not " is .

Using these “nots” and switching the order of and , we can create three new statements.

If the “if-then” statement is true, then the contrapositive is also true. The contrapositive is
**
logically equivalent
**
to the original statement. The converse and inverse may or may not be true. When the original statement and converse are both true then the statement is a

**biconditional statement**. In other words, if is true and is true, then (said “ if and only if ”).

#### Example A

If , then .

a) Find the converse, inverse, and contrapositive.

b) Determine if the statements from part a are true or false. If they are false, find a counterexample.

The original statement is true.

#### Example B

If I am at Disneyland, then I am in California.

a) Find the converse, inverse, and contrapositive.

b) Determine if the statements from part a are true or false. If they are false, find a counterexample.

The original statement is true.

Notice for the converse and inverse
**
we can use the same counterexample.
**

#### Example C

Rewrite as a biconditional statement: Any two points are collinear.

This statement can be rewritten as:

*
Two points are on the same line
if and only
if they are collinear.
*
Replace the “if-then” with “if and only if” in the middle of the statement.

CK-12 Converse, Inverse and Contrapositive of a Conditional Statement

### Guided Practice

1. Any two points are collinear.

a) Find the converse, inverse, and contrapositive.

b) Determine if the statements from part a are true or false. If they are false, find a counterexample.

2. The following is a true statement:

if and only if is an obtuse angle.

Determine the two true statements within this biconditional.

3.

a) Is true? If not, find a counterexample.

b) Is true? If not, find a counterexample.

c) Is true? If not, find a counterexample.

d) Is true? If not, find a counterexample.

**
Answers
**

1. First, change the statement into an “if-then” statement:

*
If two points are on the same line, then they are collinear.
*

2.
*
Statement 1:
*
If
, then
is an obtuse angle.

*
Statement 2:
*
If
is an obtuse angle, then
.

3. a) If
, then
.
**
True
**
.

b) If
, then
.
**
False
**
,

c) If
, then
.
**
False
**
,

d) If
, then
.
**
True
**
,

### Practice

For questions 1-4, use the statement:

If and , then is the midpoint of .

- Is this a true statement? If not, what is a counterexample?
- Find the converse of this statement. Is it true?
- Find the inverse of this statement. Is it true?
- Find the contrapositive of this statement. Which statement is it the same as?

Find the converse of each true if-then statement. If the converse is true, write the biconditional statement.

- An acute angle is less than .
- If you are at the beach, then you are sun burnt.
- If , then .

For questions 8-10, determine the two true conditional statements from the given biconditional statements.

- A U.S. citizen can vote if and only if he or she is 18 or more years old.
- A whole number is prime if and only if its factors are 1 and itself.
- if and only if .