Level 2 Read, write, understand fractions Recognise, name and write fractions 1/2, 1/3, 1/4 of a length, shape, set of objects or quantity Recognise, name and write fractions 2/4 and 3/4 of a length, shape, set of objects or quantity Counting fractions Count in halves and quarters including representing pictorially and on numberlines Low Recognise and use fractions as numbers: unit fractions with small denominators Recognise that tenths arise from dividing an object into 10 equal parts and in dividing onedigit numbers or quantities by 10 Count in small denominator fractions including representing pictorially and on numberlines Level 3 High Recognise and use non-unit fractions with small denominators Recognise that hundredths arise when dividing an object by one hundred e.g. 5/6, 3/8, 6/10 (The above objective has been split over high 3 and low 4) Combine tenths of shapes, objects, quantities or measures to find 2/10, 3/10 Count up and down in hundredths Ext: Counting in hundredths that crosses boundaries e.g. 99/100 100/100 101/100 Count up and down in tenths to one whole Compare and order fractions Which is larger, ½ or ¼ and why? Identify the larger of 1/3 and 1/5 with supporting diagrams. Equivalent fractions and converting Count in halves and quarters. Count in other fractions with small denominators using number lines Recognise and show, using diagrams, equivalent fractions with small denominators Calculating with fractions Express counting in halves and quarter as equations Express counting in unit fractions as equations ½ + ½ = 2/2 e.g. 1/6 + 1/6 +1/6 + 1/6 = 4/6 ¼ + ¼ = 2/4 This will help to build understanding of what non-unit fractions mean for 3b ¼+¼+¼=¾ ¼ + ¼ + ¼ + ¼= 4/4 Compare and order unit fractions, and fractions with the same denominators Identify and explain the larger of 2/5 and 3/5 Create fraction families through division by 3 and 5. Work practically to identify equivalence. Identify the smaller out of 3/8 and 1/4 with supporting diagrams. Recognise and show, using diagrams, families of common equivalent fractions e.g. halves, quarters, thirds, fifths, tenths, hundredths Add and subtract fractions with the same denominator within one whole [ π π π for example, + = ] π π π Low Recognise that hundredths arise when dividing tenths by ten (The above objective has been split over high 3 and low 4) Counting to give rise to improper fractions e.g. 9/10, 10/10, 11/10, 12/10 Work on when is a whole reached? What would two wholes look like as an improper fraction? Create equivalent fractions through multiplication and division of the denominator by a common factor Identify, name and write equivalent fractions of a given fraction, represented visually, including tenths and hundredths Level 4 High Low Level 5 High Recognise mixed numbers and improper fractions Understand what digits represent in diagrams, writing, materials Counting in proper fractions giving rise to improper fractions and mixed numbers, represent pictorially, on number lines Compare and Identify the order fractions smaller out of 2/3 whose and 13/18 and denominators are write down a all multiples of the fraction that is same number between them. Identify the smaller out of 2/3 and 13/18. Mixed numbers and improper fractions (when counting, recognition and understanding of values secure - see above): write convert from one mathematical form to the other statements > 1 as a mixed number π π [for example, + π π π π π Identify and compare fractions more efficiently by finding the lowest common denominator Use common factors to simplify fractions; use common multiples to express fractions in the same denomination Compare and order fractions, including fractions > 1 i.e. improper, mixed numbers, range of denominators Apply knowledge to compare and order range of fraction types including decimals and percentages as Level 5 level of difficulty Apply knowledge to convert range of fraction types and find equivalencies, explaining how they know, and using these to calculate and solve problems including decimals and percentages as Level 5 level of difficulty π = =1 ] Add and subtract fractions with the same denominator (also part of Year 5 objective) Calculate 3/9 + 8/9 = 11/9 and 11/9 β 8/9 = 3/9. They realise that 11/9 is greater than one Ext: suggest ways to Add and subtract mixed numbers With the same denominator e.g. 3 ¼ +9 ¼ where the fraction is not improper Add and subtract fractions with denominators that are multiples of the same number e.g 2/3 + 5/18 = 17/18 Then where the answer is improper 2/3 + 13/18 = 25/18 Then convert into a mixed number Add and subtract fractions with denominators that are not multiples of the same number e.g. 3/4 + 5/6 Can be by creating /24. If understood lowest common Add and subtract fractions with denominators that are multiples of the same number where the solution is improper and requires an additional conversion e.g. 4¾+2½ =6 + ¾ + ½ Add and subtract fractions with different denominators and mixed numbers, using the concept of equivalent fractions e.g. 4 4/6 + 17/4 + 2/3 -β Need to convert all fractions record this. Find 1/2, 1/3, ¼ of a length, shape, set of objects or quantity NB ½ of 12 = 6 is the same mathematically as ½ x 12 This would not be shown to children in this way at this stage Solving problems with fractions One-step problems involving multiplication and division, using materials, arrays, repeated add, mental methods, multiplication division facts, including problems in contexts Find 2/4 and 3/4 of a length, shape, set of objects or quantity Recognise, find and write fractions of a discrete set of objects: unit fractions and non-unit fractions with small denominators e.g. 5/6, 3/8, 6/10 NB 3/4 of 24 = 18 is the same mathematically as 3/4 x 24 This would not be shown to children in this way at this stage NB 5/6 of 600 = 500 is the same mathematically as 5/6 x 600 This would not be shown to children in this way at this stage Solve problems that involve all of the above Lower: pupils can solve problems such as 'I have 12 counters. One-third of them are yellow. The rest are blue. How many blue counters do I have Higher: pupils can devise problems such as 'I have 24 counters. One-third of them are blue, one-sixth are red and one-eighth are green. The rest are yellow. How many are yellow?' Apply knowledge 6/10 of 120 = 120 ÷10 =12 12 x 6 = 72 25/18 = 1 7/18 Build up by: ½ x (or of) 49 Halving odd numbers β realise you can divide whole ones again ¼x Unit fractions e.g. 1/3, 1/5, 1/8, 1/16 5=1¼ proper fractions x by whole diagrams and materials Solve problems involving increasingly harder fractions to calculate quantities, and fractions to divide quantities, including non-unit fractions where the answer is a whole number Lower: 'I have 12 oatcakes. I eat 3/4 of them for lunch. Do I have enough left to eat two for a snack in the afternoon?' Higher: 'I have £12. I spend 2/5 of it on lunch and need to save 1/3 of it for the bus fare home. Do I have enough to spend £2.40 on an ice cream?' I have 20 oatcakes. I eat 2/5 of them for lunch and need to save 1/4 of them for an afternoon snack. Do I have enough to give my friend 8 of them for her lunch? denominator (above) would be looking for /12 =6 + 5/4 =6+ 1 ¼ =7 ¼ Multiply proper fractions and mixed numbers by whole numbers, supported by materials and diagrams 5 x 3/8 = 15/8 or 1 7/8 therefore 5 x 2 3/8 = 10 + 15/8 = 11 7/8, using appropriate diagrams. Divide proper fractions by whole numbers [for example, 1/3 ÷ 2= 1/6 -β into /12 Convert this answer into mixed numbers Explain how to divide a fraction by a whole number and why it works. Calculate 1/4 ÷ 5 using a diagram. Solve problems involving multiplication and division, including scaling by simple fractions and problems involving simple rates A packet of biscuits was xx there was 1/9 off the price they are now 72p. How much were they? Half of the children in class 4 go to the high school, of those that are left, ¾ get to bake a cake. What fraction of the whole got to bake a cake? Decimals Blue β Year 2 Level 2 Reading, writing and understandin g decimals Red β Year 3 Green β Year 4 Purple β Year 5 Orange β Year 6 Black β Guidance and exemplars Low Identifying the value of the digits Value of digits remaining at tenths Use of place value chart and dienes blocks Level 3 Recognise and write decimal π π equivalents to , , π π π π Use of place value chart and dienes blocks High Find the effect of dividing a one- or two-digit number by 10 and 100, identifying the value of the digits in the answer as ones, tenths and hundredths Low Recognise and write decimal equivalents of any number of tenths or hundredths Level 4 Read, write, order and compare numbers with up to two decimal places Know that 20 hundredths= 2/10=0.2 High Low Read, write, order and compare numbers with up to three decimal places Associate a fraction with division and calculate decimal fraction equivalents [for example, 0.375] for a simple fraction [for example 3/8] Recognise and use thousandths and relate them to tenths, hundredths and decimal equivalents Read and write decimal numbers as fractions [for example, 0.71 = ππ ] πππ Rounding decimals Calculating decimals Solving problems with decimals Add and subtract amounts of money to give change, using both £ and p in practical contexts 20% Using and applying 50% Number 20% Measures 10% Handling Data Count up and down in tenths; recognise that tenths arise from dividing an object into 10 equal parts and in dividing one-digit numbers or quantities by 10 Round decimals with one decimal place to the nearest whole number Round decimals with two decimal places to the nearest whole number Round decimals with three decimal places to the nearest whole number and to one decimal place Add and subtract decimals to one decimal place without crossing boundaries Understanding of division of multiples of 10, 100, 1000 by 10, 100 or 1000 e.g. 20÷100= 0.2 Multiply and divide whole numbers and those involving decimals by 10, 100 and 1000 Add and subtract decimals to two decimal places without crossing boundaries Add and subtract decimals to one decimal place crossing the tenth boundary Add and subtract decimals to two decimal places crossing the hundredths boundary into the tenths Estimate, compare and calculate different measures, including money in pounds and pence Low: Solve simple money problems with use of concrete materials. High: Solve different problems up to one decimal place with use of length cm, m, km and mass kg, g, capacity l. 342÷ 100= 0r 34.2÷10= Solve simple measure and money problems involving fractions and decimals to two decimal places Solve problems involving number up to three decimal places e.g. race which person came first with times given to 3dp. Solve problems which require answers to be rounded to specified degrees of accuracy When decimal is recurring to use correct notation. Multiply one-digit numbers with up to two decimal places by whole numbers 1.34 x 4 Recall and use equivalences between simple fractions, decimals and percentages, including in different contexts. Multiply one-digit numbers with up to two decimal places by whole numbers 1.34 x 37 Use written division methods in cases where the answer has up to one decimal place Use all four operations to solve problems involving measure [for example, length, mass, volume, money] (The above objective has been split over high 4 and low 5.) Use all four operations to solve problems involving measure [for example, length, mass, volume, money] using decimal notation, including scalinge.g. ratio (The above objective has been split over high 4 and low 5.) Level 5 Identify the value of each digit in numbers given to three decimal places and multiply and divide numbers by 10, 100 and 1000 giving answers up to three decimal places Use written division methods in cases where the answer has up to two decimal places High Recall and use equivalences between simple fractions, decimals and percentages, including in different contexts. Percentages Level 2 Blue β Year 2 Low Red β Year 3 Level 3 Green β Year 4 Purple β Year 5 Orange β Year 6 High Low Understand per cent as meaning number of parts per hundred. Relate simple percentages to hundredths and find such percentages of quantities with an understanding of fractions. E.g. know that 50% is equivalent to half, so find 50% of a quantity by halving it. Level 4 Recognise the per cent symbol (%) and understand that per cent relates to βnumber of parts per hundredβ, and write percentages as a fraction with denominator 100, and as a decimal Black β Guidance and exemplars 20% Using and applying 50% Number 20% Measures 10% Handling Data High Recall and use equivalences between simple fractions, decimals and percentages, including in different contexts. Low Apply knowledge of fractions to find any percentage equivalents using these to solve problems. e.g. 2 different percentages of 2 different values, which is better value, which is more etc... Level 5 65% of xx = 200. What was xx? Prices after and before discounts. Use of inverse and mixture of operations to solve amounts Solve problems which require knowing percentage and decimal Solve problems involving the calculation of percentages [for example, of measures, and such as 15% of 360] and the use of percentages for comparison π equivalents of , π π π π π , , , and π π π π those fractions with a denominator of a multiple of 10 or 25 High Data Handling Level 2 Interpret data Interpret and construct simple pictograms, tally charts, block diagrams and simple tables Blue β Year 2 Low Red β Year 3 Level 3 Green β Year 4 Purple β Year 5 Orange β Year 6 Black β Guidance and exemplars High Interpret and present data using bar charts, pictograms and tables Low: Read and interpret data where parts of an image or block are used to represent a single piece of data. E.g. using a quarter of a symbol to represent a single piece of data when the key indicates one symbol represents 4 objects. Scale represented as 2, 5, 10 Middle: Where symbols represent more than one e.g. a whole symbol represents 100 and therefore ¼ of the symbol represents 25. Estimate between the markers when scales of 5, 10, 20, 100 are used. Is it closer to 20, 25 30 Low Interpret and present discrete data using appropriate graphical methods, including bar charts (The above objective has been split between low 4 and mid-4.) Level 4 Answer questions using simple pictograms, tally charts, block diagrams. Where the scale is 1 or 2. Where the images represent 1 or 2. Where the numbers are within level 2. Solve one-step and two-step questions [for example, βHow many more?β and βHow many fewer?β] using information presented in scaled bar charts and pictograms and tables Low: Solve problems such as 'Which category has the most objects in it?' Middle: Solve problems such as 'Order the categories by the number of objects they contain'. High: Solve problems about the categories using comparison, sum and difference and make up some questions of their own about the situation. Solve comparison, sum and difference problems using information presented in bar charts, pictograms, tables and other graphs Low Level 5 High Interpret and present continuous data using appropriate graphical methods, including time graphs (The above objective has been split between low 4 and mid-4.) Complete, read and interpret information in tables, including timetables Read and interpret more complex timetables where information has to be inferred from the information displayed. Solve problems using timetables such as 'I need to be in Plymouth by 10 a.m. Which is the latest train from Bodmin I can catch and be there in time?' E.g. Where it an express train Extend understanding f line graphs to interpret scatter graphs and conversion graphs. Interpret and construct simple pie charts where fractions are easily identifiable. E.g. segments that represent halves, quarters and eighths percentages are linked to the size of the segments 50%, 25%, 75%, 10% Interpret and construct more complex pie charts where more difficult fractions are used-e.g. 2/3 or sixths, a mixture of denomination of fractions e.g. ¼, 1/3, 5/12 or percentages are linked to the size of the segmentsmoving to 12.5%, 23%, 47% Interpret and construct pie charts and line graphs and use these to solve problems Solve comparison, sum and difference problems using information presented in a line graph Interpret and use time graphs to solve problems where a time interval has to be calculated/ converted. Begin to understand the purpose of the calculation of the mean and the process for the calculation of the mean comparing these to other types of averagemedian, range, mode Calculate and interpret the mean as an average. Evaluate use of types of average. Which is the most appropriate and explain why. High: Begin to convert simple block graphs into bar charts. Interpret and refine construction of bar charts to be appropriate for discrete data, e.g. bars separated and continuous grouped data e.g. bars adjacent to one another. Identify which graph is more appropriate for the data they are presenting. Solve problems involving data High 20% Using and applying 50% Number 20% Measures 10% Handling Data
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