310 likes | 422 Views
Scottish Survey of Literacy & Numeracy. Support material for Measurement Second Level - Area Produced by Education Scotland. Transforming lives through learning. Scottish Survey of Literacy and Numeracy 2011. Performance in Measurement at Second Level
E N D
Scottish Survey of Literacy & Numeracy Support material for Measurement Second Level - Area Produced by Education Scotland Transforming lives through learning
Scottish Survey of Literacy and Numeracy 2011 Performance in Measurement at Second Level Based on the recent SSLN 2011 survey, evidence indicates that over half of P7 pupils answered correctly, questions based on the measurement organiser. Ican use my knowledge of the sizes of familiar objects or places to assist me when making an estimate of measure.MNU 2-11a I can use the common units of measure, convert between related units of the metric system and carry out calculations when solving problems MNU 2-11b I can explain how different methods can be used to find the perimeter and area of a simple 2D shape orvolume of a simple 3D object.MNU 2-11c
Scottish Survey of Literacy and Numeracy 2011 Evidence from this survey also suggests that pupils have difficulty with other aspects of measurement at P7: • Calculating volumes • Where fractions, decimal fractions and percentages was a secondary organiser • Area and perimeter • Conversion of units, especially those involving decimal fractions.
This presentation will: • Explore aspects of measurement pupils find challenging • Consider why these aspects cause particular difficulties • Identify strategies to support learning with the aim of promoting deeper understanding
Second Level - Experiences & Outcomes I can use the common units of measure, convert between related units of the metric system and carry out calculations when solving problems. MNU2-11b
Common units of measure • Length : mm, cm, m and km • Area: mm2, cm2, m2 and km2 • Volume: mm3, cm3, m3 and km3 • Mass: mg, g, kg and tonne
2011 Scottish Survey of Literacy and Numeracy Based on evidence from the survey, less than half of pupils gave the correct response to this question. Question How many grams are there in 4.75 kg? “I can use the common units of measure, convert between related units of the metric system.” MNU 2-11b
Pupil responses include: • A 4750 g • B 475 g • C 4500 g • D 4075 g Reflective question How would you plan learning and teaching to resolve the ‘common errors’?Support for multiplication at Second Level can be found on the Education Scotland website.
Units Why do learners find the conversion of units so challenging? Is it the unit conversion or the inability to multiply and divide by 10, 100 and 1000 that causes difficulty? Exploringthe language of units could enhance learners’ understanding. Through learners understanding the significance of the prefixes ‘centi-’, ‘milli-’ and ‘kilo-’ , converting between units becomes easier.
Language of Measure Building on language from the Es and Os in First level For example: I have discussed the important part that numbers play in the world and explored a variety of systems that have been used by civilisations throughout history to record numbers. MTH 1-12a
Metric system ~ milli • Latin for thousand ( mille) • Millennium • millipede • milliamp
Metric system ~ centi • French for hundred • Century • Centurion • U.S. currency
Metric system ~ kilo • Ancient Greek for thousand • kilograms • kilobytes • kilocalories • kilohertz
Scottish Survey of Literacy and Numeracy 2011 Based on evidence from the survey, less than half of pupils gave the correct response to this question. Question Which of the following is the most likely to be nearest to the weight of an average man? Tick () one box. A 8.5 kg B 85 kg C 185 kg D 850 kg E 1850 kg
Pupil responses Reflective question What real life contexts could you include, when planning learning and teaching, to enable pupils to select appropriate units for length, area and weight?
Second Level - Experiences & Outcomes I can explain how different methods can be used to find the perimeter and area of a simple 2D shape or volume of a simple 3D object. MNU2-11c
Building on First Level area The following Es and Os contribute to progression in learning within MNU 2-11c MNU 1-11a MNU 1-11b MNU 1-01a MNU 1-02a MNU 1-03a MTH 1-16a
Units and Area Here is an example of a question that has been shown to be problematic for learners. Question: Find the area of the rectangle 0.25m 50cm • Why does a question like this cause difficulty? • Does over reliance on using a formula reinforce the difficulty? • How do we enable learners to interrogate a question to extract the relevant information?
50 cm 1 m 25 cm 25 cm 0.25 m 0.25 m 0.5 m 0.5 m 25 cm 1 m 25 cm 100 cm = 1 m 25 cm 50 cm 50 cm
Scottish Survey of Literacy and Numeracy 2011 Based on evidence from the survey, a quarter of pupils gave the correct response to this question. Question: A 4 cm square is cut from a piece of card which is 8 cm by 6 cm. What is the area of the card remaining after the square is cut? 8 cm 4 cm 6 cm
Pupil responses Reflective question How would you plan learning and teaching to improve the number of pupils, who can successfully answer this type of question?
Reflective questions • Consider the following questions: • How often do you: • Emphasise the part units play in area calculations? • Plan rich learning tasks which consolidate learning of area? • Consider other shapes where the product of length and breadth is not applicable? • Plan tasks which involve conversion of units?
Different methods to find the area of 2D shapes: Area of a triangle It is important that learners consider the relationship between rectangles and triangles. They should be encouraged to investigate why the area of a triangle is half the area of the corresponding rectangle.
Through an investigative approach, learners should establish that the area of a triangle is one half that of the corresponding rectangle, a formula can then be discussed.
Consider this triangle . . . 12 cm 16 cm 12 cm 16 cm
Developing numeracy • Calculating the area of the type of triangle in the previous slide, discussion could support the development of incorporating a secondary organiser eg fraction or decimal fraction. • Is the area ½ of 12 multiplied by 16? • Is the area ½ of 16 multiplied by 12? • Is the area 12 multiplied by 16 and then halved? • Do we need to half both? • What could determine which number we should half, to simplify the number calculation?
Key features to consider when planning CPD for learning and teaching • There is a clear developmental sequence throughout the lesson , learners recognise links with earlier work, build on prior learning in numeracy and confidently use their knowledge within familiar and unfamiliar contexts. • An appropriate balance between developing and synthesising/using key facts. • Programmes of study and practitioners’ lesson plans make effective use of prior learning to build on learners’ numeracy knowledge and skills including second and third level interface. • Learners confidently use mental strategies.
Key features to consider when planning CPD for learning and teaching • Learners give explanations of their reasoning as well as their methods. • Non-routine problems, open ended tasks and investigations are often used by learners to develop their problem solving skills to develop their problem solving skills including reasoning and generalising. • Staff introduce new numeracy terms, vocabulary and symbols meaningfully and expect and encourage correct use. The Numeracy Principles and Practice Paper is essential reading for everyone and can be used to prompt discussion amongst staff.