IB Chemistry HL - Enthalpies of formation and combustion | Free Notes

The big idea: Instead of measuring every reaction in a calorimeter, chemists store the enthalpy of each substance as a standard value and add them up. Two of these matter here:

- Standard enthalpy of formation, ΔH_f⊖ — the enthalpy change when one mole of a compound forms from its elements in their standard states. - Standard enthalpy of combustion, ΔH_c⊖ — the enthalpy change when one mole of a substance is completely burned in oxygen.

Because enthalpy is a state function, you can take a 'paper' route through these values to find a reaction's ΔH⊖ without doing the experiment.

What 'standard' (⊖) means: Standard conditions are 100 kPa pressure and a stated temperature (usually 298 K), with all substances in their standard states.

- ΔH_f⊖ of an element in its standard state is zero (e.g. O₂(g), C(graphite)) — there is nothing to form. - ΔH_c⊖ values are always negative — combustion is exothermic.

The formation route: form the products from elements, minus form the reactants from elements. The lower box is the common starting point — the elements in their standard states.

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To find a reaction's enthalpy change from formation data, take products minus reactants, each multiplied by its coefficient in the balanced equation.

Given in the data booklet — the standard enthalpy of formation route.

: standard enthalpy change of the reaction (kJ mol⁻¹)
: standard enthalpy of formation of a substance (kJ mol⁻¹)
: sum over all species, each multiplied by its coefficient in the equation

Worked example — combustion of methane from ΔH_f⊖

Calculate ΔH⊖ for CH₄(g) + 2O₂(g) → CO₂(g) + 2H₂O(l). Use ΔH_f⊖: CH₄(g) = −74.6, CO₂(g) = −393.5, H₂O(l) = −285.8 kJ mol⁻¹.

Solution

Formula first — products minus reactants:
ΔH_f⊖ of O₂(g) is zero (an element), so substitute the products (note 2 H₂O) and the reactants:
Add the products:
Subtract the reactants — work it out:

Final answer

ΔH⊖ = −890.5 kJ mol⁻¹ (exothermic, as expected for combustion).

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When you are given combustion data instead, the cycle flips: take reactants minus products (the opposite of the formation rule), because everything burns down to the same products.

Given in the data booklet — the standard enthalpy of combustion route.

: standard enthalpy change of the reaction (kJ mol⁻¹)
: standard enthalpy of combustion of a substance (kJ mol⁻¹)
: sum over all species, each multiplied by its coefficient in the equation

Worked example — making ethanol from ΔH_c⊖

Calculate ΔH⊖ for C₂H₄(g) + H₂O(l) → C₂H₅OH(l). Use ΔH_c⊖: C₂H₄(g) = −1411, C₂H₅OH(l) = −1367 kJ mol⁻¹. (Water does not combust.)

Solution

Formula first — reactants minus products for combustion data:
Only C₂H₄ and C₂H₅OH burn (H₂O has no combustion enthalpy), so substitute:
Work it out — keep the sign and unit:

Final answer

ΔH⊖ = −44 kJ mol⁻¹ (slightly exothermic).

Don't mix the two rules up: The sign is the only difference, and it is easy to swap:

- Formation data → ΔH⊖ = products − reactants. - Combustion data → ΔH⊖ = reactants − products.

A quick check: combustion of a fuel should come out negative. If your sign looks wrong, you have probably used the wrong rule.

How this is tested: Energy-cycle calculations are a staple of Paper 2, with the formation/combustion data supplied in a table.

- Paper 2: a part-marks 'calculate ΔH⊖' question — set up the sum, then substitute and solve. - Paper 1A (MCQ): identify the correct expression (which terms are products, which are reactants) or the sign of ΔH⊖.

Most marks are lost on stoichiometric coefficients and the element-is-zero rule — not on the arithmetic.

Three easy marks: (1) Write the correct sum before the numbers (products − reactants for ΔH_f⊖). (2) Multiply each value by its coefficient in the balanced equation. (3) Set ΔH_f⊖ = 0 for any element in its standard state.

IB-style question — combustion of propane

Calculate the standard enthalpy change for the complete combustion of propane: C₃H₈(g) + 5O₂(g) → 3CO₂(g) + 4H₂O(l). Use ΔH_f⊖: C₃H₈(g) = −104.7, CO₂(g) = −393.5, H₂O(l) = −285.8 kJ mol⁻¹.

Solution

Formula first — products minus reactants:
Use the coefficients 3 and 4 for the products; O₂(g) is an element so its ΔH_f⊖ = 0:
Add the products:
Subtract the reactants — work it out:

Final answer

ΔH⊖ = −2219 kJ mol⁻¹ (3 s.f.) — strongly exothermic.

The big idea: Instead of measuring every reaction in a calorimeter, chemists store the enthalpy of each substance as a standard value and add them up. Two of these matter here:

- Standard enthalpy of formation, ΔH_f⊖ — the enthalpy change when one mole of a compound forms from its elements in their standard states. - Standard enthalpy of combustion, ΔH_c⊖ — the enthalpy change when one mole of a substance is completely burned in oxygen.

Because enthalpy is a state function, you can take a 'paper' route through these values to find a reaction's ΔH⊖ without doing the experiment.

What 'standard' (⊖) means: Standard conditions are 100 kPa pressure and a stated temperature (usually 298 K), with all substances in their standard states.

- ΔH_f⊖ of an element in its standard state is zero (e.g. O₂(g), C(graphite)) — there is nothing to form. - ΔH_c⊖ values are always negative — combustion is exothermic.

The formation route: form the products from elements, minus form the reactants from elements. The lower box is the common starting point — the elements in their standard states.

Interactive diagram

Explore the labelled diagram, charts and maps for this topic in full study mode.

Unlock free for 7 days

To find a reaction's enthalpy change from formation data, take products minus reactants, each multiplied by its coefficient in the balanced equation.

Given in the data booklet — the standard enthalpy of formation route.

: standard enthalpy change of the reaction (kJ mol⁻¹)
: standard enthalpy of formation of a substance (kJ mol⁻¹)
: sum over all species, each multiplied by its coefficient in the equation

Worked example — combustion of methane from ΔH_f⊖

Calculate ΔH⊖ for CH₄(g) + 2O₂(g) → CO₂(g) + 2H₂O(l). Use ΔH_f⊖: CH₄(g) = −74.6, CO₂(g) = −393.5, H₂O(l) = −285.8 kJ mol⁻¹.

Solution

Formula first — products minus reactants:
ΔH_f⊖ of O₂(g) is zero (an element), so substitute the products (note 2 H₂O) and the reactants:
Add the products:
Subtract the reactants — work it out:

Final answer

ΔH⊖ = −890.5 kJ mol⁻¹ (exothermic, as expected for combustion).

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When you are given combustion data instead, the cycle flips: take reactants minus products (the opposite of the formation rule), because everything burns down to the same products.

Given in the data booklet — the standard enthalpy of combustion route.

: standard enthalpy change of the reaction (kJ mol⁻¹)
: standard enthalpy of combustion of a substance (kJ mol⁻¹)
: sum over all species, each multiplied by its coefficient in the equation

Worked example — making ethanol from ΔH_c⊖

Calculate ΔH⊖ for C₂H₄(g) + H₂O(l) → C₂H₅OH(l). Use ΔH_c⊖: C₂H₄(g) = −1411, C₂H₅OH(l) = −1367 kJ mol⁻¹. (Water does not combust.)

Solution

Formula first — reactants minus products for combustion data:
Only C₂H₄ and C₂H₅OH burn (H₂O has no combustion enthalpy), so substitute:
Work it out — keep the sign and unit:

Final answer

ΔH⊖ = −44 kJ mol⁻¹ (slightly exothermic).

Don't mix the two rules up: The sign is the only difference, and it is easy to swap:

- Formation data → ΔH⊖ = products − reactants. - Combustion data → ΔH⊖ = reactants − products.

A quick check: combustion of a fuel should come out negative. If your sign looks wrong, you have probably used the wrong rule.

How this is tested: Energy-cycle calculations are a staple of Paper 2, with the formation/combustion data supplied in a table.

- Paper 2: a part-marks 'calculate ΔH⊖' question — set up the sum, then substitute and solve. - Paper 1A (MCQ): identify the correct expression (which terms are products, which are reactants) or the sign of ΔH⊖.

Most marks are lost on stoichiometric coefficients and the element-is-zero rule — not on the arithmetic.

Three easy marks: (1) Write the correct sum before the numbers (products − reactants for ΔH_f⊖). (2) Multiply each value by its coefficient in the balanced equation. (3) Set ΔH_f⊖ = 0 for any element in its standard state.

IB-style question — combustion of propane

Solution

Formula first — products minus reactants:
Use the coefficients 3 and 4 for the products; O₂(g) is an element so its ΔH_f⊖ = 0:
Add the products:
Subtract the reactants — work it out:

Final answer

ΔH⊖ = −2219 kJ mol⁻¹ (3 s.f.) — strongly exothermic.

Enthalpies of formation and combustion

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Related Chemistry HL Topics

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