Question
.
The face of Everett's new rectangular smartphone has a length of 3.07 inches and a total area of 8.903 inches squared.
Use the formula
to determine the width of the face of Everett's new smartphone.
inches
inches
inches
inches
The face of Everett's new rectangular smartphone has a length of 3.07 inches and a total area of 8.903 inches squared.
Use the formula
to determine the width of the face of Everett's new smartphone.
inches
inches
inches
inches
Answers
GPT-4o mini
To determine the width of Everett's new rectangular smartphone, we can use the formula for the area of a rectangle:
\[
\text{Area} = \text{Length} \times \text{Width}
\]
Given:
- Length = 3.07 inches
- Area = 8.903 square inches
We can rearrange the formula to solve for the width:
\[
\text{Width} = \frac{\text{Area}}{\text{Length}}
\]
Now, we can substitute the known values:
\[
\text{Width} = \frac{8.903 \, \text{in}^2}{3.07 \, \text{in}}
\]
Calculating this:
\[
\text{Width} \approx \frac{8.903}{3.07} \approx 2.90 \, \text{inches}
\]
Thus, the width of the face of Everett's new smartphone is approximately **2.90 inches**.
\[
\text{Area} = \text{Length} \times \text{Width}
\]
Given:
- Length = 3.07 inches
- Area = 8.903 square inches
We can rearrange the formula to solve for the width:
\[
\text{Width} = \frac{\text{Area}}{\text{Length}}
\]
Now, we can substitute the known values:
\[
\text{Width} = \frac{8.903 \, \text{in}^2}{3.07 \, \text{in}}
\]
Calculating this:
\[
\text{Width} \approx \frac{8.903}{3.07} \approx 2.90 \, \text{inches}
\]
Thus, the width of the face of Everett's new smartphone is approximately **2.90 inches**.