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| LO 3 |
| Space and Shape (Geometry)The learner will be able to describe and represent characteristics and relationships between two–dimensional shapes and three–dimensional objects in a variety of orientations and positions. |
| We know this when the learner: |
| 3.7 uses various representational systems to describe position and movement between positions, including: |
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| LO 4 |
| MeasurementThe learner will be able to use appropriate measuring units, instruments and formulae in a variety of conte x ts |
| We know this when the learner: |
| 4.1 solves ratio and rate problems involving time, distance and speed; |
| 4.4 uses the theorem of Pythagoras to solve problems involving missing lengths in known geometric figures and solids. |
| LO 5 |
| Data HandlingThe learner will be able to collect, summarise, display and critically analyse data in order to draw conclusions and make predictions and to interpret and determine chance variation. |
| We know this when the learner: |
| 5.1 poses questions relating to human rights, social, economic, environmental and political issues in South Africa; |
| 5.2 selects, justifies and uses appropriate methods for collecting data (alone and/or as a member of a group or team) which include questionnaires and interviews, e x periments, and sources such as books, magazines and the Internet in order to answer questions and thereby draw conclusions and make predictions about the environment; |
| 5.3 organises numerical data in different ways in order to summarise by determining: |
| 5.3.1 measures of central tendency; |
| 5.3.2 measures of dispersion; |
| 5.4 draws a variety of graphs by hand/technology to display and interpret data including: |
| 5.4.1 bar graphs and double bar graphs; |
Discussion
Basic graphical literacy
The first part serves only to familiarise learners with the general appearance of a graph. Help them understand that the legends to the left and bottom of the graph contain meaningful information.
In this section the importance of correct and adequate labelling of graphs has not been emphasized in the learner’s module. This is mainly to keep the graphs legible. The teacher should point out that titles and other explanatory labels are necessary, and at appropriate times discuss the value of and need for annotation of graphs. Learners should always label their own graphs properly.
It will be difficult, as it often is with graphs, to be completely accurate in readings taken from the graph. The main idea is that they learn where and how readings can be taken, and not to want perfectly accurate answers. It is important that they be encouraged to motivate their answers – this will lead them to try and make logical sense of the work, and not to only guess.
1.1 South Asia 1.2 East Asia 1.3 East Asia 1.4 No
1.5 Roughly speaking, the increase was about in the same ratio – each increased by about 50% of what it had been.
1.6 SA started from a very low base (almost no TV sets) and increased fast. The US started with many TV sets and could therefore not increase so much.
2.1 (a) 50 000 – 60 000 (b) about 125 000 (c) nearly a million
2.2 more than 2.3 (see below) 2.4 About thirty years
2.5 Less than ten years 2.6 Yes – the graph goes up to the right.
Question 2.3 – think Second World War!
Question 2.7: The main idea is that it is impossible for the graph to keep on going upwards forever.
Question 3 uses a graph from an area in the Western Cape – maybe it will be possible to find something close to the home range of the learners.
3.1 Between 100 m and 110 m
3.2 About 215 m
3.3 Nearly 3 000 m from Papegaaiberg
Cartesian planes
1. 4 × 36 = 144
2. R4H2 ; L5H4 ; L4S1 ; R2S2 (Please check these answers with the learner’s module)
3. Answer not included – left as an exercise for the teacher.
4. The letters are less useful – but this is the opportunity to bring in zero (for the chairs in the passages) and negative numbers for the seats to the left and to the front.
There is a great deal of terminology coming in at this stage – the more the educator uses the correct terms, the more familiar the learners will become with them.
1. A ( –5 ; 6) B (–4 ; –2) C (5 ; –5) D (2 ; 3)
E (6 ; 0) F (0 ; 8) G (–6 ; –6)
2. Something looking like a dog should emerge.
Tables and graphs
1.1 (The formula is 5 x + 12) a = 57; b = 72; c = 13
1.2 (1 ; 17) (2 ; 22) (3 ; 27) (4 ; 32) (5 ; 37) (6 ; 42) (7 ; 47) (9 ; 57) (12 ; 72) (13 ; 77)
2. This situation illustrates a stepped graph
2.1 1,5 hours is part of two hours and 2,5 hours is part of 3 hours.
2.2 Plot only dots, and don’t join them.
2.4 R245
Homework
| Hours | 0,5 | 1 | 1,5 | 2 | 2,5 | 3 | 3,5 | 4 | 4,5 | 5 | 5,5 | 6 | 6,5 | 7 | 7,5 | 8 |
| A | 125 | 210 | 295 | 380 | 465 | 550 | 635 | 720 | 805 | 890 | 975 | 1060 | 1145 | 1230 | 1315 | 1400 |
| B | 145 | 230 | 315 | 400 | 485 | 570 | 655 | 740 | 825 | 910 | 995 | 1080 | 1165 | 1250 | 1335 | 1420 |
| C | 175 | 175 | 325 | 325 | 475 | 475 | 625 | 625 | 775 | 775 | 925 | 925 | 1075 | 1075 | 1225 | 1225 |
| D | 200 | 200 | 400 | 400 | 600 | 600 | 800 | 800 | 1000 | 1000 | 1200 | 1200 | 1400 | 1400 | 1600 | 1600 |
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