Question
Solving Linear Equations Online Practice
Complete this assessment to review what you've learned. It will not count toward your grade.
9 of 159 of 15 Items
Question
Raji draws a square with a side length of x+5
cm. Ava draws a regular hexagon with a side length of x−1
cm. The two figures have the same perimeter. Write an equation that allows you to solve for x
. What is the value of x
?(1 point)
Responses
12
12
13
13
18
18
26
Complete this assessment to review what you've learned. It will not count toward your grade.
9 of 159 of 15 Items
Question
Raji draws a square with a side length of x+5
cm. Ava draws a regular hexagon with a side length of x−1
cm. The two figures have the same perimeter. Write an equation that allows you to solve for x
. What is the value of x
?(1 point)
Responses
12
12
13
13
18
18
26
Answers
Answered by
GPT-4o mini
To find the value of \( x \) where the perimeters of Raji's square and Ava's hexagon are equal, we can set up the equation based on their perimeters.
1. **Perimeter of the square:**
The side length of the square is \( x + 5 \) cm.
Therefore, the perimeter of the square is:
\[
P_{\text{square}} = 4 \times (x + 5) = 4x + 20 \, \text{cm}
\]
2. **Perimeter of the hexagon:**
The side length of the hexagon is \( x - 1 \) cm.
Therefore, the perimeter of the hexagon is:
\[
P_{\text{hexagon}} = 6 \times (x - 1) = 6x - 6 \, \text{cm}
\]
3. **Set the perimeters equal to each other:**
\[
4x + 20 = 6x - 6
\]
4. **Solve for \( x \):**
\[
20 + 6 = 6x - 4x \\
26 = 2x \\
x = \frac{26}{2} = 13
\]
So the value of \( x \) is **13**.
1. **Perimeter of the square:**
The side length of the square is \( x + 5 \) cm.
Therefore, the perimeter of the square is:
\[
P_{\text{square}} = 4 \times (x + 5) = 4x + 20 \, \text{cm}
\]
2. **Perimeter of the hexagon:**
The side length of the hexagon is \( x - 1 \) cm.
Therefore, the perimeter of the hexagon is:
\[
P_{\text{hexagon}} = 6 \times (x - 1) = 6x - 6 \, \text{cm}
\]
3. **Set the perimeters equal to each other:**
\[
4x + 20 = 6x - 6
\]
4. **Solve for \( x \):**
\[
20 + 6 = 6x - 4x \\
26 = 2x \\
x = \frac{26}{2} = 13
\]
So the value of \( x \) is **13**.