QUESTION IMAGE
Question
conclusion: how are mass, volume, and density related? density mass mass matter property space takes up unknown volume volume volume claim: density is a ratio of mass and volume. it can be used to identify unkown substances. evidence: table with columns: mass of liquid (g), volume (ml), density (g/ml³), substance; rows: liquid a, liquid b, liquid c (each with volume 10 ml and \type answer\ for mass of liquid, density, substance) reasoning: density is a property of matter. it is calculated using a known mass and volume. mass is the amount of matter in something. volume is the amount of space that a substance occupies.
To solve for the density, mass, and identify the substance, we use the formula for density:
Step 1: Recall the density formula
The formula for density ($
ho$) is $
ho = \frac{\text{mass (}m\text{)}}{\text{volume (}V\text{)}}$, where mass is in grams (g) and volume is in milliliters (mL) (or cubic centimeters, since $1\ \text{mL} = 1\ \text{cm}^3$).
Step 2: Calculate density for each liquid
For a liquid with a known mass ($m$) and volume ($V = 10\ \text{mL}$), substitute into the formula. For example:
- If Liquid A has a mass of $10\ \text{g}$:
$
ho = \frac{10\ \text{g}}{10\ \text{mL}} = 1\ \text{g/mL}$.
(This density matches water, so the substance might be water.)
- If Liquid B has a mass of $8\ \text{g}$:
$
ho = \frac{8\ \text{g}}{10\ \text{mL}} = 0.8\ \text{g/mL}$.
(This density is typical of rubbing alcohol or oil.)
- If Liquid C has a mass of $12\ \text{g}$:
$
ho = \frac{12\ \text{g}}{10\ \text{mL}} = 1.2\ \text{g/mL}$.
(This density could match a salt solution or honey.)
Step 3: Identify the substance
Compare the calculated density to known densities of substances. For example:
- Density of water: $1\ \text{g/mL}$
- Density of rubbing alcohol: $\approx 0.78\ \text{g/mL}$ (close to $0.8\ \text{g/mL}$)
- Density of honey: $\approx 1.4\ \text{g/mL}$ (close to $1.2\ \text{g/mL}$ for a less concentrated solution)
Example Completion (using sample masses):
| Liquid | Mass (g) | Volume (mL) | Density (g/mL) | Substance |
|---|---|---|---|---|
| B | $8$ | $10$ | $0.8$ | Rubbing Alcohol |
| C | $12$ | $10$ | $1.2$ | Salt Solution |
Key Relationships:
- Density is a physical property of matter, calculated as $\boldsymbol{
ho = \frac{m}{V}}$.
- Mass is the amount of matter in a substance.
- Volume is the space a substance occupies.
- Density helps identify unknown substances because each pure substance has a unique density (at a given temperature/pressure).
If you have specific masses for the liquids, substitute them into the density formula to find the exact density and match it to a known substance!
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To solve for the density, mass, and identify the substance, we use the formula for density:
Step 1: Recall the density formula
The formula for density ($
ho$) is $
ho = \frac{\text{mass (}m\text{)}}{\text{volume (}V\text{)}}$, where mass is in grams (g) and volume is in milliliters (mL) (or cubic centimeters, since $1\ \text{mL} = 1\ \text{cm}^3$).
Step 2: Calculate density for each liquid
For a liquid with a known mass ($m$) and volume ($V = 10\ \text{mL}$), substitute into the formula. For example:
- If Liquid A has a mass of $10\ \text{g}$:
$
ho = \frac{10\ \text{g}}{10\ \text{mL}} = 1\ \text{g/mL}$.
(This density matches water, so the substance might be water.)
- If Liquid B has a mass of $8\ \text{g}$:
$
ho = \frac{8\ \text{g}}{10\ \text{mL}} = 0.8\ \text{g/mL}$.
(This density is typical of rubbing alcohol or oil.)
- If Liquid C has a mass of $12\ \text{g}$:
$
ho = \frac{12\ \text{g}}{10\ \text{mL}} = 1.2\ \text{g/mL}$.
(This density could match a salt solution or honey.)
Step 3: Identify the substance
Compare the calculated density to known densities of substances. For example:
- Density of water: $1\ \text{g/mL}$
- Density of rubbing alcohol: $\approx 0.78\ \text{g/mL}$ (close to $0.8\ \text{g/mL}$)
- Density of honey: $\approx 1.4\ \text{g/mL}$ (close to $1.2\ \text{g/mL}$ for a less concentrated solution)
Example Completion (using sample masses):
| Liquid | Mass (g) | Volume (mL) | Density (g/mL) | Substance |
|---|---|---|---|---|
| B | $8$ | $10$ | $0.8$ | Rubbing Alcohol |
| C | $12$ | $10$ | $1.2$ | Salt Solution |
Key Relationships:
- Density is a physical property of matter, calculated as $\boldsymbol{
ho = \frac{m}{V}}$.
- Mass is the amount of matter in a substance.
- Volume is the space a substance occupies.
- Density helps identify unknown substances because each pure substance has a unique density (at a given temperature/pressure).
If you have specific masses for the liquids, substitute them into the density formula to find the exact density and match it to a known substance!