New
New
Year 10
Foundation

Checking and securing understanding of substitution

I can substitute particular values into a generalised algebraic statement to find a sense of how the value of the expression changes.

New
New
Year 10
Foundation

Checking and securing understanding of substitution

I can substitute particular values into a generalised algebraic statement to find a sense of how the value of the expression changes.

Lesson details

Key learning points

  1. Expressions and formulae in context can be evaluated for particular values.
  2. Changing the value of the variable changes the overall value of the expression.
  3. Exploring what value gives a particular solution can help you to understand the expression.
  4. Expressions may have multiple variables and you can substitute some or all of them for numbers.

Common misconception

Incorrect evaluation of expressions is common when negative values are substituted. Especially where negative values are squared or pupils rely on calculators without being confident of their use.

When substituting, always put brackets around the value which is substituted. This helps avoid mistakes when using a calculator as well.

Keywords

  • Substitution - Substitute means to put in place of another. In Algebra, substitution can be used to replace variables with values.

This lesson explores substitution in a range of other topics and contexts. This is a good opportunity for revision of KS3 topics and to highlight the importance of accurate substitution in every branch of mathematics. Pupils could reflect on other subjects where they use these skills.
Teacher tip

Licence

This content is © Oak National Academy Limited (2024), licensed on Open Government Licence version 3.0 except where otherwise stated. See Oak's terms & conditions (Collection 2).

Loading...

6 Questions

Q1.
Simplify the following: $$3(2x + 1) + 2(2x + 1) = \square(2x + 1)$$
Correct Answer: 5
Q2.
Simplify the following: $$4(x - 3) + 3(x - 3) = \square(x - 3)$$
Correct Answer: 7
Q3.
If $$b = 9$$, what is $$b^2$$?
Correct Answer: 81
Q4.
If $$p = 9$$, what is $$2p^2$$?
Correct Answer: 162
Q5.
If $$c = 4$$, what is $$4c + 3$$?
Correct Answer: 19
Q6.
If $$c = 4b + 2$$, what is $$3c$$? Give your answer in expanded form.
Correct Answer: 12b + 6

6 Questions

Q1.
Evaluate the expression $$2x - 3$$ for $$x = 5$$
Correct Answer: 7
Q2.
Evaluate the expression $$\frac{3x}{4}$$ for $$x = 8$$
Correct Answer: 6
Q3.
Evaluate the expression $$4x^2$$ for $$x = 3$$
Correct Answer: 36
Q4.
Evaluate the expression $$5(x - 3)$$ for $$x = 7$$
Correct Answer: 20
Q5.
Evaluate the expression $$\frac{3x + 2}{4}$$ for $$x = 6$$
Correct Answer: 5
Q6.
Evaluate the expression $$\frac{x}{x + 1}$$ for $$x = 4$$ and give your answer as a decimal.
Correct Answer: 0.8