Combining transformationsQuick View
Si_B

Combining transformations

(6)
Worksheet on some simple combined transformations. Final task requires the student to describe the combined transformations as a single transformation. Designed for low ability GCSE group but could make a good introduction for any level.
Similar shapesQuick View
Si_B

Similar shapes

(5)
Trying to make this accessible to a mid ability group so plenty of repetition. Worksheet to consolidate effect of scale factors on length and area.
Plotting linear and quadratic graphsQuick View
Si_B

Plotting linear and quadratic graphs

(3)
Can be used as a starter for AFL. Easily differentiated by doing either the linear or quadratic questions. Could extend the top end by asking about the significance of the intersections between the graphs.
Describing an enlargementQuick View
Si_B

Describing an enlargement

(2)
Lots of examples going up to fractional negative enlargements. Could be extended by asking the students to reverse the image and object.
Angles in polygonsQuick View
Si_B

Angles in polygons

(3)
Basic worksheet for students to think about external angles, internal angles and the sum of the internal angles.
Solving linear simultaneous equations graphicallyQuick View
Si_B

Solving linear simultaneous equations graphically

(1)
<p>Worksheet covering plotting of linear equations and showing that the intersect is the simultaneous solution. Extends to rearranging, plotting a fractional gradient and estimating a solution.</p>
Plotting f(x) funtions and their inverseQuick View
Si_B

Plotting f(x) funtions and their inverse

(1)
Sheet is designed to get students plotting a function, finding its inverse and then plotting that on the same axis. By adding the y-x line, they should see that it creates a line of reflection. <br /> <br /> The extension task is working out why the inverse of some functions is the same as the original function (two examples on this worksheet).
Simple percentage of an amountQuick View
Si_B

Simple percentage of an amount

(0)
Heavily scaffolded to try and get students to think about using &quot;building blocks&quot; of simple percentages of an amount to find the actual percentage.
Reflection in a given lineQuick View
Si_B

Reflection in a given line

(1)
Some simple examples to help students reflect a shape in a given line. More challenging questions on the second sheet.
Translating shapes using vectorsQuick View
Si_B

Translating shapes using vectors

(0)
<p>Simple Poweroint presentation to explain how to translate a shape by a given vector, describe a translation using a vector.</p>
Problem solving with equations of tangentsQuick View
Si_B

Problem solving with equations of tangents

(0)
<p>Consolidation worksheet to embed equations of tangents line into problem solving style questions. Will need to have understanding of basic trigonometry, Pythagoras as well as equations of tangent lines and perpendicular lines.</p>
Matching a quadratic equation to its graphQuick View
Si_B

Matching a quadratic equation to its graph

(0)
<p>Designed to help students visualise why they have solved a quadratic equation. Some can be factorised but mainly solved using the quadratic formula. Student then uses their solutions to find the roots on the graph.</p>
Translation and reflection consolidation worksheetQuick View
Si_B

Translation and reflection consolidation worksheet

(0)
<p>Diagnostic questions that can be used to ensure that students can effectively write a vector to describe a translation. Also assessing students understanding of reflections by identifying mistakes and making corrections to examples.</p>
Working with column vectorsQuick View
Si_B

Working with column vectors

(0)
<p>Starter/recap activity to help students work with column vectors as well as sketching examples to prove resultant vectors (leading into vectors and vector notation)</p>