Determining an Empirical Formula from Number of Moles
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One of the interesting aspects of our study of moles is that it will give you the ability to determine the empirical formula of a compound formed in our laboratory, by calculating the molar ratio by which the elements combine. It will also allow you to determine the empirical formula of a compound after you determine a compounds percentage composition by mass. This lesson will go over the math involved in these types of procedures.
I. Determining the empirical formula of a compound from mass.
In an upcoming laboratory activity, you will be asked to experimentally determine the empirical formula of a compound that you produce from the process of burning magnesium. This synthesis reaction will produce magnesium oxide. Your purpose will be to determine the empirical formula of the magnesium oxide by analyzing the molar ratio by which the elements combine.
Ex. 1. What is the empirical formula for a compound if an 8.1 g sample contains 4.9 g of magnesium and 3.2 g of oxygen?
Solution: Remember that a molar ratio is a ratio of the number of moles, not the mass. We are not looking for a ratio of mass to mass, but of moles-moles. Our first step is to determine how many moles of each element are found in this compound. We do that be dividing the mass of the given element by its molar mass:
mass of that element in the sample
# of moles of an element = -------------------------------------
molar mass of the element
Given: mass of magnesium = 4.9 g
molar mass of magnesium = 24.3 g
mass of oxygen = 3.2 g
molar mass of elemental oxygen = 16.0 g (note we use elemental, not diatomic oxygen)
4.9 g
# of moles of magnesium = -------------- = 0.20 moles
24.3 g/mole
3.2 g
# of moles of oxygen = --------------- = 0.20 moles
16.0 g/mole
This problem is easy because, as you can see, the elements are combining in a 0.20 to 0.20 ratio, or in simpler terms, a 1:1 ratio. This means that for every one atom of magnesium, there is one atom of oxygen in the compound. This gives us an empirical formula of MgO.
Answer: MgO
Now, let us try a problem that is a little bit harder.
Example 2. Calculate the empirical formula of a compound that is made from 1.67 g of cerium and 4.54 g of iodine.
Solution: We will solve the problem the same way as example 1, with one exception. After we find out the number of moles of each element present, we will convert are results into a simple, whole number ratio.
mass of that element in the sample
# of moles of an element = -------------------------------------
molar mass of the element
Given: mass of cerium = 1.67 g
molar mass of cerium = 140 g
mass of iodine = 4.54 g
molar mass of iodine = 127 g
1.67 g
# of moles of cerium = ---------- = 0.0119 moles
140 g/mole
4.54 g
# of moles of iodine = ------------- = 0.0357 moles
127 g/mole
Now, to turn the number of moles into a simple whole number ratio, divide the smaller number of moles (0.0119) into both values:
# of moles of Ce = 0.0119 moles
-------------- = 1
0.0119 moles
# of moles of I = 0.0357 moles
--------------- = 3
0.0119 moles
This means that for every one atom of Ce there are 3 atoms of I, so our empirical formula must be CeI3.
Answer: CeI3
II. Determining empirical formula from percentage composition.
This type of problem is essentially the same as the problems described above, with one slight difference. In these problems you start with a percentage composition instead of mass. However, if you assume that you are studying a 100g sample, you can easily change percentages to grams. Then solve the problems exactly as shown above.
Example 1. Determine the empirical formula of a compound that contains 36.5% sodium, 25.4% sulfur, and 38.1% oxygen.
Solution: By assuming that we can study a 100g sample of the compound, we can change % to grams. so:
Example 1. Determine the empirical formula of a compound that contains 36.5g sodium, 25.4g sulfur, and 38.1g oxygen.
Now we can solve them by finding the molar ratio by which the elements combine.
mass of that element in the sample
# of moles of an element = -------------------------------------
molar mass of the element
Given: mass of sodium = 36.5 g
molar mass of sodium = 23.0 g
mass of sulfur = 25.4 g
molar mass of sulfur = 32.1 g
mass of oxygen = 38.1 g
molar mass of oxygen = 16.0 g
36.5 g
# of moles of sodium = ------------- = 1.59 moles
23.0g/mole
25.4g
# of moles of sulfur = --------------- = 0.791 moles
32.1 g/mole
38.1 g
# of moles of oxygen = --------------- = 2.38 moles
16.0 g/mole
Now, find the simplest whole number ratio by dividing the smallest number of moles into all three values.
# of moles of Na = 1.59 moles
-------------- = 2.01
0.791 moles
# of moles of S = 0.791 moles
-------------- = 1
0.791 moles
# of moles of O = 2.38 moles
-------------- = 3.01
0.791 moles
The ratio shows that 2 atoms of sodium combine with 1 atom of sulfur and 3 atoms of oxygen, so our answer is Na2SO3.
Answer: Na2SO3