Read the instructions below carefully before attempting the questions.
Question 1
Analyse intercepts, turning points and type of function.
Question 2
Use graph interpretation and correct formulas to solve.
Question 3
Analyse the function carefully and apply the correct rules to determine the answer.
Information for Questions 4β8
Study the graph carefully before answering the questions below.
Question 4
Carefully analyse the graph and identify key features such as intercepts,
turning points, and transformations. Use this information to determine the correct answer.
Question 5
Functions questions require careful analysis of graphs and equations.
Identify key features such as intercepts, turning points, asymptotes, and transformations.
Identify the function type
Find intercepts and key coordinates
Determine transformations
Apply correct formulas
Verify your answer using the graph
Question 6
Explanation:
A function represents a relationship where each input value corresponds to exactly one output value. :contentReference[oaicite:0]{index=0}
Identify the type of function (linear, quadratic, etc.)
Find key points such as intercepts and turning points
Determine intersections between graphs
Use algebraic methods to solve where needed
Verify answers using the graph
Question 7
Explanation:
Functions assign one output to each input, and graphs help us interpret these relationships visually. :contentReference[oaicite:0]{index=0}
Identify the type of function (linear, quadratic, etc.)
Locate intercepts and key coordinates
Determine gradients or turning points
Analyse intersections between graphs
Verify answers using the graph
Understanding features like intercepts, slopes, and transformations is essential when solving Grade 12 function problems. :contentReference[oaicite:1]{index=1}
Question 8
Explanation:
When solving Grade 12 function questions, it is important to analyse the graph carefully and identify key features.
Find intercepts where the graph crosses the axes
Determine turning points (maximum or minimum)
Identify the axis of symmetry for quadratic functions
Check intervals where the function is increasing or decreasing
Use algebraic methods to confirm results
Intercepts and turning points are essential when analysing graphs and determining equations of functions. :contentReference[oaicite:0]{index=0}
