A gas has a density of 5.56 g/L. What volume in milliliters would 4.17 g of this gas occupy?
To find the volume in milliliters (mL) that 4.17 g of a gas with a density of 5.56 g/L would occupy, we can use the formula:
Volume (mL) = Mass (g) / Density (g/L)
Substituting the given values into the formula:
Volume (mL) = 4.17 g / 5.56 g/L
Now, we can divide the mass by the density:
Volume (mL) = 4.17 g / 5.56 g/L ≈ 0.75 L
To convert from liters to milliliters, we know that 1 L is equal to 1000 mL. So, to find the volume in milliliters, we can multiply the volume in liters by 1000:
Volume (mL) = 0.75 L × 1000 mL/L = 750 mL
Therefore, 4.17 g of the gas would occupy a volume of approximately 750 mL.
To find the volume occupied by 4.17 g of the gas, we can use the given density of the gas. Density is defined as mass per unit volume.
First, we need to convert the given density of 5.56 g/L to grams per milliliter (g/mL) since the given mass is in grams and the volume we want to find is in milliliters.
To convert g/L to g/mL, we divide by 1000 since there are 1000 milliliters in a liter:
5.56 g/L ÷ 1000 = 0.00556 g/mL
Now that we have the density in g/mL, we can find the volume by using the equation:
Volume (in mL) = Mass (in g) ÷ Density (in g/mL)
Substituting the given values:
Volume = 4.17 g ÷ 0.00556 g/mL
Simplifying the equation:
Volume ≈ 749.10 mL
Therefore, 4.17 grams of this gas would occupy approximately 749.10 milliliters of volume.
3
mass = volume x density
v=m/d = 4.17g/5.56 g/L = ?? Liters.
Change to mL.