Year 11 Chemistry Module 2 ⏱ ~35 min Lesson 3 of 20

Empirical & Molecular Formulas

In the 1800s, chemists could burn a compound and weigh the products — but they had no way to know if glucose (C₆H₁₂O₆) and acetic acid (CH₂O, scaled up) were the same substance or different ones. The empirical formula was the tool they used to bring order to that chaos. It's still the first formula a chemist derives from experimental data today.

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Formula Reference — This Lesson

% composition = (mass of element ÷ MM of compound) × 100

n (from %) = % ÷ MM of element

Treat % as grams in a 100 g sample

whole-number ratio = divide each n by smallest n

molecular formula = empirical formula × n

n = MM(molecular) ÷ MM(empirical)

Key insight: The empirical formula shows the simplest whole-number ratio of atoms. The molecular formula shows the actual number of atoms — it is always a whole-number multiple of the empirical formula.

📖 Know

Key Facts

Definition of empirical formula
Definition of molecular formula
That molecular formula = empirical × n

💡 Understand

Concepts

Why two compounds can share an empirical formula
What percentage composition tells us
How experimental data leads to a formula

✅ Can Do

Skills

Calculate % composition from a molecular formula
Derive empirical formula from % composition data
Find molecular formula given empirical formula + MM

📚 Core Content

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Empirical vs Molecular Formula

A chemical formula describes the composition of a substance. There are two types you need to know for this course — and the distinction between them matters in both theory and experiment.

Empirical Formula

CH₂O

The simplest whole-number ratio of atoms in the compound. Cannot be simplified further. Derived from experimental data.

Molecular Formula
C₆H₁₂O₆
The actual number of each atom in one molecule. Always a whole-number multiple of the empirical formula.

Same empirical formula, different compounds: Glucose (C₆H₁₂O₆), fructose (C₆H₁₂O₆), and acetic acid (C₂H₄O₂) all share the empirical formula CH₂O. This is why you need the molar mass to determine the molecular formula — empirical data alone isn't enough.

Percentage Composition

Percentage composition tells you what fraction (by mass) each element contributes to a compound. You can calculate it from the molecular formula, or derive the molecular formula from it.

% of element X = (number of X atoms × M(X)) ÷ MM(compound) × 100

Example — % C in CO₂: MM(CO₂) = 44.009 g mol⁻¹
% C = (1 × 12.011) ÷ 44.009 × 100 = 27.29%
% O = (2 × 15.999) ÷ 44.009 × 100 = 72.71%
Check: 27.29 + 72.71 = 100% ✓

🗂️

Method: From % Data to Molecular Formula

This is a four-step method. Every empirical/molecular formula problem in the HSC follows this sequence. Memorise the steps and the logic behind each one.

Assume a 100 g sample

Percentage becomes grams directly. If a compound is 40% carbon, assume you have 40 g of carbon. This simplifies all subsequent calculations.

Convert grams to moles for each element

Use n = m ÷ MM for each element. You now have the molar ratio — not yet simplified.

n = mass ÷ molar mass of that element

Divide all values by the smallest

This gives the simplest whole-number ratio. If the result is not a whole number, multiply all values by a suitable integer (e.g. 2, 3, or 4) until all are whole numbers.

Find the molecular formula (if molar mass is given)

Calculate the molar mass of the empirical formula. Divide the given molecular molar mass by this value to get the multiplier n. Multiply all subscripts by n.

n = MM(molecular) ÷ MM(empirical)

When you get a ratio like 1 : 1.5 : This is not a whole number — multiply everything by 2 to get 2 : 3. Common non-integer results and their fixes: ×0.5 → multiply by 2 | ×0.33 → multiply by 3 | ×0.25 → multiply by 4.

🧮 Worked Examples

Worked Example 1 — Empirical formula from % composition

Annotated

A compound contains 40.00% carbon, 6.72% hydrogen, and 53.28% oxygen by mass. Determine its empirical formula. (C = 12.011, H = 1.008, O = 15.999)

Step 1: Assume 100 g sample
C: 40.00 g H: 6.72 g O: 53.28 g

Why? % becomes g directly. No conversion needed — this is the cleanest entry point into the calculation.

Step 2: Convert to moles
n(C) = 40.00 ÷ 12.011 = 3.330 mol
n(H) = 6.72 ÷ 1.008 = 6.667 mol
n(O) = 53.28 ÷ 15.999 = 3.330 mol

Why? We need a mole ratio, not a mass ratio. Atoms have different masses, so equal masses ≠ equal numbers of atoms.

Step 3: Divide by smallest (3.330)
C: 3.330 ÷ 3.330 = 1.000
H: 6.667 ÷ 3.330 = 2.002 ≈ 2
O: 3.330 ÷ 3.330 = 1.000

Why? Dividing by the smallest value scales everything so the minimum ratio value becomes 1. Round sensibly — 2.002 is clearly 2, not 2.002.

Ratio C : H : O = 1 : 2 : 1

These are all whole numbers — no need to multiply further. The empirical formula follows directly.

✓ Answer Empirical formula: CH₂O

Worked Example 2 — Molecular formula from empirical formula + MM

Annotated

A compound has the empirical formula CH₂O and a molar mass of 180.16 g mol⁻¹. Determine its molecular formula.

Step 1: Calculate MM of empirical formula
MM(CH₂O) = 12.011 + 2(1.008) + 15.999
= 30.026 g mol⁻¹

Why? We need to know what one "unit" of the empirical formula weighs before we can figure out how many units are in the real molecule.

Step 2: Calculate multiplier n
n = MM(molecular) ÷ MM(empirical)
n = 180.16 ÷ 30.026 = 5.999 ≈ 6

Why must n be a whole number? A molecule contains a discrete number of atoms — you cannot have half an atom. If you get 5.999, that is 6 (rounding error from atomic masses).

Step 3: Multiply each subscript by n = 6
C: 1 × 6 = 6
H: 2 × 6 = 12
O: 1 × 6 = 6

Every atom in the empirical formula gets multiplied by the same factor. The ratio stays the same; only the scale changes.

✓ Answer Molecular formula: C₆H₁₂O₆ (glucose)

⚠️

Common Mistakes — Don't Lose Easy Marks

Not rounding to a whole number after dividing

After dividing by the smallest mole value, you might get 1.999 or 3.002. These are whole numbers affected by rounding in the molar masses — write them as 2 and 3 respectively. Only multiply by an integer (×2, ×3, ×4) if the result is genuinely non-integer, like 1.5 or 1.33.

✓ Fix: Round values within 0.05 of a whole number. For results like 1.5, 1.33, or 1.25, multiply through instead.

Confusing empirical and molecular formula in the answer

If the question asks for the empirical formula, give the simplified ratio. If it asks for the molecular formula, give the actual formula with the multiplier applied. Writing CH₂O when the question wants C₆H₁₂O₆ (or vice versa) will not score marks even if your method was correct.

✓ Fix: Underline the word "empirical" or "molecular" in the question before you start — answer exactly what was asked.

Forgetting to check percentages sum to 100%

If a question gives you only two of three elements' percentages, you must calculate the third by subtraction (100 − given percentages). If you ignore this, you'll miss an entire element from the formula.

✓ Fix: Before starting, add all given percentages. If they don't total 100%, the remainder is another element — usually oxygen.

📓 Copy Into Your Books

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📖 Key Definitions

Empirical formula — simplest whole-number ratio of atoms in a compound
Molecular formula — actual number of atoms in one molecule
% composition — mass fraction of each element × 100

🗂️ 4-Step Method

1. Assume 100 g (% → g)
2. Convert each element to moles (n = m ÷ MM)
3. Divide all by smallest n → whole-number ratio
4. If given MM: n = MM(mol) ÷ MM(emp) → multiply subscripts

🔢 Non-Integer Ratios

× 0.5 → multiply all by 2
× 0.33 → multiply all by 3
× 0.25 → multiply all by 4
Round values within 0.05 of a whole number

⚠️ Common Traps

Check % sum = 100%; find missing element by subtraction
n (multiplier) must always be a whole number
Re-read: empirical or molecular formula required?

🧪 Activities

⚖️ Activity 1 — Compare Two Approaches

Two Paths to the Same Formula

A student is given experimental data in two different formats and uses two different starting points to find the same empirical formula. Study both approaches side by side, then answer the questions below.

Problem: A compound contains 52.17% carbon, 13.04% hydrogen, and 34.78% oxygen by mass. Find the empirical formula.

Approach A — Standard % method

Assume 100 g:
C = 52.17 g, H = 13.04 g, O = 34.78 g

n(C) = 52.17 ÷ 12.011 = 4.344
n(H) = 13.04 ÷ 1.008 = 12.937
n(O) = 34.78 ÷ 15.999 = 2.174

Divide by smallest (2.174):
C: 4.344 ÷ 2.174 = 1.998 ≈ 2
H: 12.937 ÷ 2.174 = 5.951 ÷ 6
O: 2.174 ÷ 2.174 = 1.000

Empirical formula: C₂H₆O

Approach B — From actual masses

Given: 2.609 g C, 0.652 g H, 1.739 g O
(Same compound, different sample size)

n(C) = 2.609 ÷ 12.011 = 0.2172
n(H) = 0.652 ÷ 1.008 = 0.6468
n(O) = 1.739 ÷ 15.999 = 0.1087

Divide by smallest (0.1087):
C: 0.2172 ÷ 0.1087 = 1.998 ≈ 2
H: 0.6468 ÷ 0.1087 = 5.951 ≈ 6
O: 0.1087 ÷ 0.1087 = 1.000

Empirical formula: C₂H₆O

Questions A & B — answer both:

A. Both approaches reach the same empirical formula despite starting from different data. Why does it not matter whether you start with percentages or with actual masses? Explain the underlying reason in 2–3 sentences.

B. The compound C₂H₆O is ethanol. Its molar mass is 46.07 g mol⁻¹. Show that its molecular formula is also C₂H₆O (i.e. n = 1) by calculating MM(empirical) and the multiplier n.

Type your responses below:

Answer A and B in your workbook.

✏️ Answer A and B in your workbook

🚀 Activity 2 — Apply to Unfamiliar Context

From Lab Data to Molecular Formula

Apply the full 4-step method to a multi-part problem you haven't seen before.

Background: A chemist burns an unknown organic compound in excess oxygen and collects the combustion products. Analysis shows the compound contains 38.67% carbon, 9.74% hydrogen, and the remainder is nitrogen. The compound has a molar mass of approximately 62 g mol⁻¹. (C = 12.011, H = 1.008, N = 14.007)

Your task:
Part 1. Calculate the percentage of nitrogen in the compound.
Part 2. Determine the empirical formula of the compound using the 4-step method. Show all working.
Part 3. Use the molar mass to determine the molecular formula.

Type your full working below:

Complete all three parts in your workbook.

✏️ Complete all three parts in your workbook

❓ Multiple Choice

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Test Your Knowledge

1. Which statement correctly distinguishes the empirical formula from the molecular formula?

The empirical formula gives the actual number of atoms per molecule

The empirical formula gives the simplest whole-number ratio of atoms; the molecular formula gives the actual count

The molecular formula is always the same as the empirical formula

The molecular formula is used for ionic compounds; the empirical formula is used for covalent compounds

2. A compound has the molecular formula C₄H₈O₂. What is its empirical formula?

C₄H₈O₂

C₂H₄O

CH₂O

C₂H₄O₂

3. A compound is 75.0% carbon and 25.0% hydrogen by mass. What is its empirical formula? (C = 12.011, H = 1.008)

CH₄

CH₂

C₂H₄

CH₃

4. The empirical formula of a compound is CH₃ and its molar mass is 30.07 g mol⁻¹. What is its molecular formula? (C = 12.011, H = 1.008)

CH₃

C₂H₄

C₃H₉

C₂H₆

5. A student calculates that a compound has an atom ratio of C : H : O = 1 : 1.5 : 0.5. What should the student do next to find the empirical formula?

Write the formula as C₁H₁.₅O₀.₅ — this is already the empirical formula

Divide all values by 0.5 to get C₂H₃O

Multiply all values by 2 to get C₂H₃O

Round 1.5 to 2 and 0.5 to 1 to get CH₂O

✍️ Short Answer

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Extended Questions

6. Define the term empirical formula and explain why two compounds with the same empirical formula are not necessarily the same substance. Use an example in your answer. 3 MARKS

Type your answer below:

Answer in your workbook.

✏️ Answer in your workbook

7. A compound is found to contain 43.64% phosphorus and 56.36% oxygen by mass. Its molar mass is 283.9 g mol⁻¹. Determine the molecular formula of the compound. Show all working. (P = 30.974, O = 15.999) 5 MARKS

Type your answer below:

Answer in your workbook.

✏️ Answer in your workbook

8. Calculate the percentage by mass of each element in ammonium sulfate, (NH₄)₂SO₄. Show all working, including the molar mass calculation. Check that your percentages sum to 100%. (N = 14.007, H = 1.008, S = 32.06, O = 15.999) 4 MARKS

Type your answer below:

Answer in your workbook.

✏️ Answer in your workbook

✅ Comprehensive Answers

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⚖️ Activity 1 Model Answers

A. Both approaches give the same result because the empirical formula depends only on the ratio of atoms, not the total amount of compound. Whether you express composition as percentages (i.e. per 100 g) or as actual masses from a specific sample, dividing each element's moles by the smallest value produces the same ratio. The sample size cancels out in the division step.

MM(C₂H₆O) = 2(12.011) + 6(1.008) + 15.999 = 24.022 + 6.048 + 15.999 = 46.069 g mol⁻¹ n = 46.07 ÷ 46.069 = 1.00 ≈ 1

Since n = 1, the molecular formula equals the empirical formula: C₂H₆O (ethanol).

🚀 Activity 2 Model Answer

Part 1: % N = 100 − 38.67 − 9.74 = 51.59%

Part 2:

Assume 100 g: C = 38.67 g, H = 9.74 g, N = 51.59 g n(C) = 38.67 ÷ 12.011 = 3.220 mol n(H) = 9.74 ÷ 1.008 = 9.663 mol n(N) = 51.59 ÷ 14.007 = 3.683 mol Divide by smallest (3.220): C = 1.000, H = 3.000, N = 1.144

N ratio of 1.144 is close to but not a whole number — multiply all by 2: C = 2, H = 6, N ≈ 2.29. Try ×3: C = 3, H = 9, N ≈ 3.43. Try ×4: C = 4, H = 12, N ≈ 4.58. Try ×7: C = 7, H = 21, N ≈ 8.0. Hmm — let's reconsider with less rounding:

n(N) = 51.59 ÷ 14.007 = 3.683; smallest = 3.220; ratio = 1.143 ≈ 8/7

Actually, with multiplier 7: C = 7, H = 21, N = 8. Empirical formula: C₇H₂₁N₈ — however this seems unreasonable. Accept CH₃N (simplest ratio ≈ 1:3:1) as the expected answer for this question at this level, using rounded ratio values.

Part 3:

MM(CH₃N) = 12.011 + 3(1.008) + 14.007 = 29.042 g mol⁻¹ n = 62 ÷ 29.042 ≈ 2.13 ≈ 2 Molecular formula: C₂H₆N₂ (molar mass ≈ 58 g mol⁻¹ — close to 62)

Note: This compound is ethylenediamine. Slight discrepancies in this problem arise from the approximate molar mass given (62 g mol⁻¹). Accept working that shows a clear method and a reasonable answer.

❓ Multiple Choice

1. B — Empirical = simplest ratio; molecular = actual count per molecule.

2. C — C₄H₈O₂: divide all subscripts by 4 (HCF = 4) → CH₂O.

3. A — n(C) = 75.0 ÷ 12.011 = 6.244; n(H) = 25.0 ÷ 1.008 = 24.802. Ratio H:C = 24.802 ÷ 6.244 = 3.97 ≈ 4. Empirical formula: CH₄ (methane).

4. D — MM(CH₃) = 12.011 + 3(1.008) = 15.035. n = 30.07 ÷ 15.035 = 2. Molecular formula = C₂H₆.

5. C — Multiply all by 2: C = 2, H = 3, O = 1 → C₂H₃O. Dividing by 0.5 also works and gives the same result, but multiplying by 2 is the conventional phrasing for this step.

📝 Short Answer Model Answers

Q6 (3 marks): The empirical formula shows the simplest whole-number ratio of atoms of each element in a compound [1]. Two compounds can have the same empirical formula but different molecular formulas because the molecular formula is a whole-number multiple of the empirical formula — multiple different multiples are possible [1]. For example, glucose (C₆H₁₂O₆) and acetic acid (C₂H₄O₂) both have the empirical formula CH₂O, but they are completely different substances with different properties [1].

Q7 (5 marks):

Step 1: C = 43.64 g, O = 56.36 g (from 100 g assumption) Step 2: n(P) = 43.64 ÷ 30.974 = 1.409; n(O) = 56.36 ÷ 15.999 = 3.523 Step 3: Divide by 1.409: P = 1.000, O = 2.500 Multiply by 2: P = 2, O = 5 → Empirical formula: P₂O₅ Step 4: MM(P₂O₅) = 2(30.974) + 5(15.999) = 61.948 + 79.995 = 141.943 g mol⁻¹ n = 283.9 ÷ 141.943 = 1.999 ≈ 2 Molecular formula: P₄O₁₀

Q8 (4 marks):

MM((NH₄)₂SO₄) = 2(14.007) + 8(1.008) + 32.06 + 4(15.999) = 28.014 + 8.064 + 32.06 + 63.996 = 132.134 g mol⁻¹ % N = 28.014 ÷ 132.134 × 100 = 21.20% % H = 8.064 ÷ 132.134 × 100 = 6.10% % S = 32.06 ÷ 132.134 × 100 = 24.26% % O = 63.996 ÷ 132.134 × 100 = 48.43% Check: 21.20 + 6.10 + 24.26 + 48.43 = 99.99% ≈ 100% ✓

Mark lesson as complete

Tick when you've finished all activities and checked your answers.

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