To find the minimum and maximum possible areas for a rectangle measuring 4.15 cm by 7.34 cm, we first calculate the area as follows:
\[ \text{Area} = \text{length} \times \text{width} \]
Substituting the given values:
\[ \text{Area} = 4.15 , \text{cm} \times 7.34 , \text{cm} \]
Calculating the product:
\[ \text{Area} = 30.541 , \text{cm}^2 \]
Now, we round this result to the nearest hundredth:
\[ \text{Area} \approx 30.54 , \text{cm}^2 \]
Since the question does not specify any variations in the dimensions of the rectangle (for example, if they could change or have a degree of uncertainty), we will assume that the measurements are precise. Therefore, there is only one area calculation.
Thus, since there is no variation provided, the minimum and maximum possible areas of the rectangle are both the same.
Minimum Area: 30.54 cm²
Maximum Area: 30.54 cm²
So, the final answer is:
- Minimum area: 30.54 cm²
- Maximum area: 30.54 cm²
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