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Andrea is 6 years younger than Tony. In two years, Tony will be three times as old as Andrea. Let a be Tony’s current age. Whic...Question
Andrea is 6 years younger than Tony. In two years, Tony will be three times as old as Andrea. Let a be Tony’s current age. Which of these linear equations can be used to find Andrea’s and Tony’s current ages?(1 point) Responses a=3(a+2) a equals 3 left parenthesis a plus 2 right parenthesis a+2=3(a+6+2) a plus 2 equals 3 left parenthesis a plus 6 plus 2 right parenthesis a+2=3(a−6+2) a plus 2 equals 3 left parenthesis a minus 6 plus 2 right parenthesis 3(a+2)=a−6+2
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Answered by
GPT-4o mini
Let's break down the problem step by step.
1. **Define the Variables**:
- Let \( a \) be Tony's current age.
- Since Andrea is 6 years younger than Tony, Andrea's current age is \( a - 6 \).
2. **Age in Two Years**:
- In two years, Tony's age will be \( a + 2 \).
- In two years, Andrea's age will be \( (a - 6) + 2 = a - 4 \).
3. **Setting Up the Equation**:
- According to the problem, in two years, Tony will be three times as old as Andrea:
\[
a + 2 = 3(a - 4)
\]
4. **Choosing the Correct Equation**:
- Now we need to simplify the equation:
\[
a + 2 = 3(a - 4)
\]
simplifies to:
\[
a + 2 = 3a - 12
\]
or rearranged:
\[
2 + 12 = 3a - a \implies 14 = 2a \implies a = 7
\]
Looking at the original expressions provided in the responses, the correct equation that matches our derived equation \( a + 2 = 3(a - 4) \) is:
**a + 2 = 3(a - 6 + 2)**
This can be validated because \( a - 6 + 2 \) is equivalent to \( a - 4 \).
Thus, the equation that can be used to find Andrea's and Tony's current ages is:
**a + 2 = 3(a - 6 + 2)**
1. **Define the Variables**:
- Let \( a \) be Tony's current age.
- Since Andrea is 6 years younger than Tony, Andrea's current age is \( a - 6 \).
2. **Age in Two Years**:
- In two years, Tony's age will be \( a + 2 \).
- In two years, Andrea's age will be \( (a - 6) + 2 = a - 4 \).
3. **Setting Up the Equation**:
- According to the problem, in two years, Tony will be three times as old as Andrea:
\[
a + 2 = 3(a - 4)
\]
4. **Choosing the Correct Equation**:
- Now we need to simplify the equation:
\[
a + 2 = 3(a - 4)
\]
simplifies to:
\[
a + 2 = 3a - 12
\]
or rearranged:
\[
2 + 12 = 3a - a \implies 14 = 2a \implies a = 7
\]
Looking at the original expressions provided in the responses, the correct equation that matches our derived equation \( a + 2 = 3(a - 4) \) is:
**a + 2 = 3(a - 6 + 2)**
This can be validated because \( a - 6 + 2 \) is equivalent to \( a - 4 \).
Thus, the equation that can be used to find Andrea's and Tony's current ages is:
**a + 2 = 3(a - 6 + 2)**
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