Functions and mappings

Slides:

Advertisements

Similar presentations

Why is it impossible to draw a triangle with two obtuse angles?

Advertisements

Constructions Draw one or more of these – think before you start!

Generating sequences A1.1 Core Plenary

Simplifying expressions

A square number is the result of squaring a whole number.

Using fractions and percentages

(a) Explain how to use this diagram to calculate .

Probability [ S3.1 Core Plenary]

Here are some patterns made from coloured number tiles.

No number has the same square root as its cube root.

Investigate what happens if:

Make them as interesting as you can,

60° 70° 80° 90° 100° 110° 120° Angles recap Here are some angles.

Adding and subtracting fractions

Sums, differences and products

Collecting data [ S1.1 Core Starter]

Linear equations [ A2.2 Extension Plenary]

Lines, shapes and coordinates

Experimental probability

Graphs of real-life situations

Experimental probability

Patterns in coordinates

Describe how they are made.

Jot down what it tells you. Compare your answers with your partner’s.

Congruence GM3.1 Core Plenary

Draw and write down the equations of some lines that pass through

Here are two number sequences … …

Reflection GM4.1 Core Plenary

Constructing triangles

Make up some similar questions of your own. 2 cm

Algebraic methods [ A3.2 Core Plenary]

do not enclose any crossing grid lines and

2-D shapes recap [GM4.1 Core Starter]

Diagonals of quadrilaterals

draw a straight line whose equation is y = −x

Triangle investigation

Comparing distributions

Constructing triangles

Nets This is a drawing of a cubic box without a lid.

Formulae and expressions

[ GM4.4 Extension Plenary]

Calculations with fractions

Functions and mappings

Who is right – Jon or Jean?

Below is the full data set. Would you have launched?

Direct proportion N5.2 Core Plenary

What number is he thinking of? 2x = x + 4 so x = 4 (a) 2x + x = 39

The four straight lines make a square (shaded grey).

You will need some isometric dotty paper and a ruler.

Adding and subtracting fractions

Functions and mappings

Symmetries of plane shapes

Perimeter [ GM3.1 Support Plenary]

Length and perimeter GM1.1 Support Plenary

Squares of side 1m are used to make L-shapes.

Statistical investigations

These two pairs of lines form a parallelogram.

Pyramids can have bases of different shapes.

Factors, multiples, primes and powers

Fractions and decimals

▼ 1 centimetre to 1 kilometre ▼ 1 :

Interpreting and communicating

Multiplying and dividing fractions

Multiplying and dividing fractions

Working with data [ S1.2 Support Plenary]

Construct these triangles. Sides 5 cm, 12 cm and 13 cm

Linear functions This graph is the straight line y = 3x.

Reflection, rotation and translation

Multiplying and dividing

Rotation and reflection

Presentation transcript:

Functions and mappings A3.2 Core Plenary Aijaz drew this mapping diagram on squared paper. He chose a point A and drew straight lines from it to cut the x- and y-lines. He found that the mapping was x → 2x. Investigate the mapping when straight lines are drawn from B and from C. Can you find a pattern? A B C 1 2 3 4 5 6 x y Preamble This activity gives pupils the chance to use the skills they have gained in drawing and interpreting mapping diagrams in an investigative context. Possible content Using and interpreting mapping diagrams, pattern spotting. Resources Squared paper for drawing mapping diagrams. Solution/Notes A: x → 2x B: x → 2x – 1 C: x → 2x − 2 B C 1 2 3 4 5 6 x y