Question

To find the metal with a volume of 1.375 cm³, we can use the mass and density values provided in the table to calculate the volume for each metal using the formula:

\[
\text{Volume} = \frac{\text{Mass}}{\text{Density}}
\]

Now, let's calculate the volume for each metal:

1. **Aluminum:**
- Mass = 4.60 grams
- Density = 2.70 g/cm³
- Volume = \( \frac{4.60 \text{ grams}}{2.70 \text{ g/cm}^3} \) ≈ 1.70 cm³

2. **Zinc:**
- Mass = 9.81 grams
- Density = 7.13 g/cm³
- Volume = \( \frac{9.81 \text{ grams}}{7.13 \text{ g/cm}^3} \) ≈ 1.38 cm³

3. **Chromium:**
- Mass = 6.24 grams
- Density = 7.18 g/cm³
- Volume = \( \frac{6.24 \text{ grams}}{7.18 \text{ g/cm}^3} \) ≈ 0.87 cm³

4. **Nickel:**
- Mass = 3.17 grams
- Density = 8.90 g/cm³
- Volume = \( \frac{3.17 \text{ grams}}{8.90 \text{ g/cm}^3} \) ≈ 0.36 cm³

From our calculations, we find that the metal with a volume closest to 1.375 cm³ is **zinc** with a calculated volume of approximately 1.38 cm³.