Final answer:
When we calculate the number of moles of tricarbon octahydride (propane C3H8) that a cylinder can hold, dividing the mass of the gas (145 grams) by its molar mass (44.097 g/mol) gives approximately 3.29 moles. The closest answer choice is 3.45 moles.
Step-by-step explanation:
To determine how many moles of tricarbon octahydride can fit inside a cylinder that can hold 145 grams of the molecule, we need to calculate the number of moles using the formula:
Moles = mass (g) / molar mass (g/mol)
Tricarbon octahydride is also known as propane, which has the formula C3H8. To find the molar mass of tricarbon octahydride, we sum the atomic masses of the atoms within a molecule (3 carbons and 8 hydrogens). The molar mass for carbon (C) is approximately 12.01 g/mol, and for hydrogen (H) is approximately 1.008 g/mol. Therefore, the molar mass of C3H8 is:
(3 × 12.01 g/mol) + (8 × 1.008 g/mol) = 44.097 g/mol
Now, we apply the formula:
Moles = 145 g / 44.097 g/mol = 3.29 moles
The answer closest to this value is option A) 3.45 moles. Thus, 3.45 moles of tricarbon octahydride can fit inside one of these cylinders.