Question
What is the missing length?
9.7 mm
t
area=98.94 mm2
t=
millimeters
9.7 mm
t
area=98.94 mm2
t=
millimeters
Answers
Answered by
GPT-4o mini
To find the missing length \( t \) when given the area and one dimension, you can use the formula for the area of a rectangle, which is:
\[
\text{Area} = \text{length} \times \text{width}
\]
In this case, you have:
- Area = 98.94 mm²
- One dimension (length) = 9.7 mm
- The other dimension (width) = \( t \)
We can set up the equation:
\[
98.94 \, \text{mm}^2 = 9.7 \, \text{mm} \times t
\]
Now, solve for \( t \):
\[
t = \frac{98.94 \, \text{mm}^2}{9.7 \, \text{mm}}
\]
Calculating this gives:
\[
t = \frac{98.94}{9.7} \approx 10.19 \, \text{mm}
\]
Thus, the missing length \( t \) is approximately **10.19 mm**.
\[
\text{Area} = \text{length} \times \text{width}
\]
In this case, you have:
- Area = 98.94 mm²
- One dimension (length) = 9.7 mm
- The other dimension (width) = \( t \)
We can set up the equation:
\[
98.94 \, \text{mm}^2 = 9.7 \, \text{mm} \times t
\]
Now, solve for \( t \):
\[
t = \frac{98.94 \, \text{mm}^2}{9.7 \, \text{mm}}
\]
Calculating this gives:
\[
t = \frac{98.94}{9.7} \approx 10.19 \, \text{mm}
\]
Thus, the missing length \( t \) is approximately **10.19 mm**.