Question

To calculate the density of the gold ring, you can use the formula:

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

Given:

- Mass = 15.83 grams
- Volume = 0.82 milliliters

Now, plug these values into the formula:

\[
\text{Density} = \frac{15.83 \, \text{grams}}{0.82 \, \text{milliliters}} \approx 19.29 \, \text{grams/milliliter}
\]

Therefore, the density of the gold ring is approximately **19.29 grams/milliliter**.

Now, calculate the density of a gold bar that has a mass of 1,000 grams and a volume of 51.8 milliliters. Use the same formula for density.

To calculate the density of the gold bar, you can use the same formula:

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

Given:

- Mass = 1,000 grams
- Volume = 51.8 milliliters

Now, plug these values into the formula:

\[
\text{Density} = \frac{1000 \, \text{grams}}{51.8 \, \text{milliliters}} \approx 19.31 \, \text{grams/milliliter}
\]

Therefore, the density of the gold bar is approximately **19.31 grams/milliliter**.

Which equation describes the mass of an object in relation to its volume and density?(1 point)
Responses

m=D×V
m=D×V

m=D+V
m is equal to cap d plus cap v

m=DV
m is equal to cap d over cap v

m=VD

The correct equation that describes the mass of an object in relation to its volume and density is:

\[
m = D \times V
\]

So, the response is:

**m = D × V**

Now, calculate the density of a gold bar that has a mass of 1,000 grams and a volume of 51.8 milliliters. Use the same formula for density.