- When I was 2 my sister was twice my age Now I’m 40, how old is my sister…
- Check all equations that are equivalent. A=(1)/(2)h(b^(1)+b^(2)) 2A=hb^(1)+b^(2) b^(1)=(2A)/(h)-b^(2) b^(1)=(2(A-(1)/(2)hb^(2)))/(h) RETRYV
The Correct Answer and Explanation is :
1. How old is your sister when you are 40?
When you were 2, your sister was twice your age, which means she was 4 years old at that time (since 2 * 2 = 4). The age difference between you and your sister is therefore 4 – 2 = 2 years.
Now that you are 40, your sister will be 40 + 2 = 42 years old.
2. Checking the Equivalence of Equations
We need to check if the given equations are equivalent to the original equation:
Original equation:
A=12h(b(1)+b(2))A = \frac{1}{2} h \left( b^{(1)} + b^{(2)} \right)
Equation 1: 2A=hb(1)+b(2)2A = h b^{(1)} + b^{(2)}
- Multiply both sides of the original equation by 2: 2A=2⋅12h(b(1)+b(2))=h(b(1)+b(2))2A = 2 \cdot \frac{1}{2} h \left( b^{(1)} + b^{(2)} \right) = h \left( b^{(1)} + b^{(2)} \right)
- This is not exactly the same as the given equation. In fact, it’s not possible to simplify to this form unless we disregard the grouping of terms (b^(1) + b^(2)) completely. So this equation is not equivalent.
Equation 2: b(1)=2Ah−b(2)b^{(1)} = \frac{2A}{h} – b^{(2)}
- Solving the original equation for b(1)b^{(1)}: A=12h(b(1)+b(2))A = \frac{1}{2} h \left( b^{(1)} + b^{(2)} \right) Multiply both sides by 2: 2A=h(b(1)+b(2))2A = h \left( b^{(1)} + b^{(2)} \right) Subtract b(2)b^{(2)} from both sides: b(1)=2Ah−b(2)b^{(1)} = \frac{2A}{h} – b^{(2)}
- This matches the second equation perfectly. Therefore, this equation is equivalent.
Equation 3: b(1)=2(A−12hb(2))hb^{(1)} = \frac{2 \left( A – \frac{1}{2} h b^{(2)} \right)}{h}
- Start with the original equation: A=12h(b(1)+b(2))A = \frac{1}{2} h \left( b^{(1)} + b^{(2)} \right) Solve for b(1)b^{(1)}: 2A=h(b(1)+b(2))2A = h \left( b^{(1)} + b^{(2)} \right) Subtract b(2)b^{(2)} from both sides: b(1)=2Ah−b(2)b^{(1)} = \frac{2A}{h} – b^{(2)}
- Now substitute: b(1)=2(A−12hb(2))hb^{(1)} = \frac{2 \left( A – \frac{1}{2} h b^{(2)} \right)}{h}
- Expanding this: b(1)=2Ah−b(2)b^{(1)} = \frac{2A}{h} – b^{(2)}
- This matches the second equation exactly, so this equation is equivalent as well.
Summary:
- The second and third equations are equivalent to the original one.
- The first equation is not equivalent.