QUESTION IMAGE
Question
- \if a shape has exactly three sides, then the shape is a triangle.\ converse: if a shape is a triangle ,then the shape has exactly three sides . inverse: if a shape select , then the shape select . contrapositive: if a shape select , then the select .
To solve the problem of finding the inverse and contrapositive of the given conditional statement, we start by recalling the definitions of these logical forms.
Step 1: Identify the original statement
The original statement is: "If a shape has exactly three sides, then the shape is a triangle."
Let \( p \) represent "a shape has exactly three sides" and \( q \) represent "the shape is a triangle." So the original statement is \( p
ightarrow q \).
Step 2: Find the Inverse
The inverse of a conditional statement \( p
ightarrow q \) is \(
eg p
ightarrow
eg q \), where \(
eg \) denotes "not."
- \(
eg p \): "a shape does not have exactly three sides"
- \(
eg q \): "the shape is not a triangle"
So the inverse is: "If a shape does not have exactly three sides, then the shape is not a triangle."
Step 3: Find the Contrapositive
The contrapositive of a conditional statement \( p
ightarrow q \) is \(
eg q
ightarrow
eg p \).
- \(
eg q \): "a shape is not a triangle"
- \(
eg p \): "the shape does not have exactly three sides"
So the contrapositive is: "If a shape is not a triangle, then the shape does not have exactly three sides."
Final Answers:
- Inverse: If a shape \(\boldsymbol{\text{does not have exactly three sides}}\), then the shape \(\boldsymbol{\text{is not a triangle}}\).
- Contrapositive: If a shape \(\boldsymbol{\text{is not a triangle}}\), then the shape \(\boldsymbol{\text{does not have exactly three sides}}\).
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To solve the problem of finding the inverse and contrapositive of the given conditional statement, we start by recalling the definitions of these logical forms.
Step 1: Identify the original statement
The original statement is: "If a shape has exactly three sides, then the shape is a triangle."
Let \( p \) represent "a shape has exactly three sides" and \( q \) represent "the shape is a triangle." So the original statement is \( p
ightarrow q \).
Step 2: Find the Inverse
The inverse of a conditional statement \( p
ightarrow q \) is \(
eg p
ightarrow
eg q \), where \(
eg \) denotes "not."
- \(
eg p \): "a shape does not have exactly three sides"
- \(
eg q \): "the shape is not a triangle"
So the inverse is: "If a shape does not have exactly three sides, then the shape is not a triangle."
Step 3: Find the Contrapositive
The contrapositive of a conditional statement \( p
ightarrow q \) is \(
eg q
ightarrow
eg p \).
- \(
eg q \): "a shape is not a triangle"
- \(
eg p \): "the shape does not have exactly three sides"
So the contrapositive is: "If a shape is not a triangle, then the shape does not have exactly three sides."
Final Answers:
- Inverse: If a shape \(\boldsymbol{\text{does not have exactly three sides}}\), then the shape \(\boldsymbol{\text{is not a triangle}}\).
- Contrapositive: If a shape \(\boldsymbol{\text{is not a triangle}}\), then the shape \(\boldsymbol{\text{does not have exactly three sides}}\).