YEAR 8 MATHS FOCUS
NUMBER AND ALGEBRA
Equations
Learning Experiences
Concept Teaching
Equations
EQUATIONS
OUTCOME
A student:
MA4-10NA:
operates with positive-integer and zero indices of numerical bases
| LANGUAGE | Describing the steps in the solution of equations provides students with the opportunity to practise using mathematical imperatives in context, e.g. ‘add 5 to both sides’, ‘increase both sides by 5’, ‘subtract 3 from both sides’, ‘take 3 from both sides’, ‘decrease both sides by 3’, ‘reduce both sides by 3’, ‘multiply both sides by 2’, ‘divide both sides by 2’. |
| PURPOSE RELEVANCE | An equation is a statement that two quantities or expressions are equal, usually through the use of numbers and/or symbols. Equations are used throughout mathematics and in our daily lives in obtaining solutions to problems of all levels of complexity. People are solving equations (usually mentally) when, for example, they are working out the right quantity of something to buy, or the right amount of an ingredient to use when adapting a recipe. |
Expectations of Attainment
Solve simple linear equations (ACMNA179) | distinguish between algebraic expressions where pronumerals are used as variables, and equations where pronumerals are used as unknowns {Critical and creative thinking} |
| solve simple linear equations using concrete materials, such as the balance model or cups and counters, stressing the notion of performing the same operation on both sides of an equation | |
| solve linear equations that may have non-integer solutions, using algebraic techniques that involve up to two steps in the solution process, e.g. | |
| – compare and contrast strategies to solve a variety of linear equations {Communicating, Reasoning, Critical and creative thinking} | |
| – generate equations with a given solution, e.g. find equations that have the solution x=5 {Problem Solving} |
Solve linear equations using algebraic techniques and verify solutions by substitution (ACMNA194) | solve linear equations that may have non-integer solutions, using algebraic techniques that involve up to three steps in the solution process, e.g. Figure 7 |
| check solutions to equations by substituting {Critical and creative thinking} |
Solve simple quadratic equations | 0 then there are two values of x that solve a simple quadratic equation of the form x^2=c”}”>determine that if c>0 then there are two values of x that solve a simple quadratic equation of the form x^2=c |
| – explain why quadratic equations could be expected to have two solutions {Communicating, Reasoning, Critical and creative thinking} | |
| – recognise that x^2=c does not have a solution if c is a negative number {Communicating, Reasoning, Critical and creative thinking} | |
| solve simple quadratic equations of the form x^2=c, leaving answers in ‘exact form’ and as decimal approximations |
Learning Experiences
To be added
Concept Teaching
Links to be added