QUESTION IMAGE
Question
lesson 5 homework
period 5th
complete each table for the conditional statement.
if an angle is classified as a right angle, then it has a measure of 90°.
| relationship to conditional | statement | true or false | |
|---|---|---|---|
| 2. | inverse | ||
| 3. | contrapositive | ||
| 4. | write the conditional using \if and only if\. |
1. Converse
Step1: Recall converse definition
The converse of a conditional statement "If \( p \), then \( q \)" is "If \( q \), then \( p \)". Here, \( p \): "an angle is classified as a right angle", \( q \): "it has a measure of \( 90^\circ \)".
Step2: Formulate converse
So the converse statement is: "If an angle has a measure of \( 90^\circ \), then it is classified as a right angle."
Step3: Determine truth value
By definition, a right angle is an angle with measure \( 90^\circ \), so this is True.
2. Inverse
Step1: Recall inverse definition
The inverse of "If \( p \), then \( q \)" is "If not \( p \), then not \( q \)".
Step2: Formulate inverse
So the inverse statement is: "If an angle is not classified as a right angle, then it does not have a measure of \( 90^\circ \)."
Step3: Determine truth value
An angle not a right angle (e.g., acute, obtuse) can't be \( 90^\circ \), so this is True.
3. Contrapositive
Step1: Recall contrapositive definition
The contrapositive of "If \( p \), then \( q \)" is "If not \( q \), then not \( p \)".
Step2: Formulate contrapositive
So the contrapositive statement is: "If an angle does not have a measure of \( 90^\circ \), then it is not classified as a right angle."
Step3: Determine truth value
If an angle isn't \( 90^\circ \), it's not a right angle, so this is True.
4. Biconditional (If and only if)
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Step1: Recall biconditional definition
A biconditional " \( p \) if and only if \( q \)" means \( p \to q \) and \( q \to p \) (converse is true, so we can write it).
Step2: Formulate biconditional
Using the original \( p \) and \( q \), the statement is: "An angle is classified as a right angle if and only if it has a measure of \( 90^\circ \)."
Filled Table:
| Relationship to Conditional | Statement | True or False | |
|---|---|---|---|
| 2 | Inverse | If an angle is not classified as a right angle, then it does not have a measure of \( 90^\circ \). | True |
| 3 | Contrapositive | If an angle does not have a measure of \( 90^\circ \), then it is not classified as a right angle. | True |
| 4 | - | An angle is classified as a right angle if and only if it has a measure of \( 90^\circ \). | - |