Chemical Kinetics Calculations

Order of reaction

The order of reaction shows how the concentration of a reactant affects the rate of reaction

Rate = k [A]^m [B]ⁿ

When m or n is zero = the concentration of the reactants does not affect the rate
When the order of reaction (m or n) of a reactant is 0, its concentration is ignored
The overall order of reaction is the sum of the powers of the reactants in a rate equation
For example, in the reaction below, the overall order of reaction is 2 (1 + 1)

Rate = k [NO₂] [Cl₂]

Order of reaction from concentration-time graphs

In a zero-order reaction, the concentration of the reactant is inversely proportional to time
- This means that the concentration of the reactant decreases with increasing time
- The graph is a straight line going down

A zero-order concentration-time graph

A zero-order concentration-time graph is a straight line

In a first-order reaction, the concentration of the reactant decreases with time
- The graph is a curve going downwards and eventually plateaus

A first-order concentration-time graph

Reaction Kinetics - Second Order Concentration, downloadable AS & A Level Chemistry revision notes

A first-order concentration-time graph is a smooth curve

In a second-order reaction, the concentration of the reactant decreases more steeply with time
- The concentration of reactant decreases more with increasing time compared to in a first-order reaction
- The graph is a steeper curve going downwards

A second-order concentration-time graph

Reaction Kinetics - First Order Concentration, downloadable AS & A Level Chemistry revision notes

A second-order concentration-time graph is a smooth and steep curve

Order of reaction from initial rate

The progress of the reaction can be followed by measuring the initial rates of the reaction using various initial concentrations of each reactant
These rates can then be plotted against time in a rate-time graph
In a zero-order reaction, the rate doesn’t depend on the concentration of the reactant
- The rate of the reaction therefore remains constant throughout the reaction
- The graph is a horizontal line
- The rate equation is rate = k

A zero-order rate-time graph

Reaction Kinetics - Zero Order Rate, downloadable AS & A Level Chemistry revision notes

A zero-order rate-time graph is a flat line

In a first-order reaction, the rate is directly proportional to the concentration of a reactant
- The rate of the reaction decreases as the concentration of the reactant decreases when it gets used up during the reaction
- The graph is a straight line
- The rate equation is rate = k [A]

A first-order rate-time graph

Reaction Kinetics - First Order Rate, downloadable AS & A Level Chemistry revision notes

A first-order rate-time graph is a straight line with a fixed gradient, k

In a second-order reaction, the rate is directly proportional to the square of concentration of a reactant
- The rate of the reaction decreases more as the concentration of the reactant decreases when it gets used up during the reaction
- The graph is a curved line
- The rate equation is rate = k [A]²

A second-order rate-time graph

Reaction Kinetics - Second Order Rate, downloadable AS & A Level Chemistry revision notes

A second-order rate-time graph is a smooth curve

Order of reaction from half-life

The order of a reaction can also be deduced from its half-life (t_1/2)
For a zero-order reaction, the successive half-lives decrease with time
- This means that it would take less time for the concentration of reactant to halve as the reaction progresses
The half-life of a first-order reaction remains constant throughout the reaction
- The amount of time required for the concentration of reactants to halve will be the same during the entire reaction
For a second-order reaction, the half-life increases with time
- This means that as the reaction is taking place, it takes more time for the concentration of reactants to halve

Half-lives of zero, first and second-order reactions

Reaction Kinetics - Half-Life, downloadable AS & A Level Chemistry revision notes

Zero-order reactions have a decreasing half-life, first-order reactions have a constant half-life and second-order reactions have an increasing half-life

Calculating the initial rate

The initial rate can be calculated by using the initial concentrations of the reactants in the rate equation
For example, in the reaction of bromomethane (CH₃Br) with hydroxide (OH^-) ions to form methanol (CH₃OH):

CH₃Br + OH^- → CH₃OH + Br^-

The rate equation is:

Rate = k [CH₃Br] [OH^-]

- Where k = 1.75 x 10^-2 dm^-2 mol^-1 s^-1
If the initial concentrations of CH₃Br and OH^- are 0.0200 and 0.0100 mol dm^-3 respectively, the initial rate of reaction is:
- Rate = k [CH₃Br] [OH^-]
- Initial rate = 1.75 x 10^-2 x (0.0200) x (0.0100)
- Initial rate = 3.50 x 10^-6 mol dm^-3 s^-1

Calculating Units

When you are asked to calculate the rate constant, k, for a reaction you must also be able to deduce the units
This is done by replacing the values in the rearranged rate equation with the units of that value
The units can then be combined or cancelled as required
For example, to calculate the units for the above reaction:

Chemical Kinetics Calculations (CIE A Level Chemistry)

Revision Note