Final answer:
The empirical formula subscripts for 18-karat gold, which consists of 75% gold, 9% silver, and 16% copper by mass, are calculated to be Au4.6, Ag1, Cu3.0, rounded to two significant digits.
Step-by-step explanation:
The question asks for the empirical formula subscripts for 18-karat gold based on its constituent metal percentages by mass. To find the empirical formula, you should first determine the mole ratio of the metals based on their percentage composition.
Let's imagine we have 100 grams of 18-karat gold. This means we would have 75 grams of gold (Au), 9 grams of silver (Ag), and 16 grams of copper (Cu). Next, we find the moles of each metal using their atomic masses (Au: 196.97, Ag: 107.87, Cu: 63.55).
- Moles of Au = 75 g / 196.97 g/mol ≈ 0.381 mol
- Moles of Ag = 9 g / 107.87 g/mol ≈ 0.0834 mol
- Moles of Cu = 16 g / 63.55 g/mol ≈ 0.252 mol
To find the empirical formula subscripts, you divide each molar amount by the smallest number of moles which is 0.0834 moles of Ag:
- Au: 0.381 / 0.0834 ≈ 4.57
- Ag: 0.0834 / 0.0834 ≈ 1
- Cu: 0.252 / 0.0834 ≈ 3.02
After rounding to two significant digits, we get the empirical formula subscripts for 18-karat gold: Au4.6Ag1Cu3.0.