Transcript Number 2
Number 2 Place value Number 2 level descriptors • LEVEL 3: WRITE NUMBERS IN WORDS • LEVEL 4: MULTIPLY BY POWERS OF 10 • ORDER WHOLE NUMBERS • MULTIPLY BY MULTIPLES OF 10 • LEVEL 5: ROUND NUMBERS TO NEAREST 1, 10, etc • ROUND NUMBERS TO ONE AND TWO DECIMAL PLACES • LEVEL 6: ORDER DECIMAL NUMBERS • APPROXIMATE DECIMALS TO A SENSIBLE DEGREE OF ACCURACY • LEVEL 7: ESTIMATE TO 1, 2 AND 3 SIGNIFICANT FIGURES SF • USE SF TO ESTIMATE CALCULATIONS • LEVEL 8: • SOLVE PROBLEMS USING STANDARD FORM KEY WORDS • • • • • • • ESTIMATE INTEGER MULTIPLY DIVIDE APPROXIMATE ROUNDING MULTIPLES • • • • • PLACE VALUE POWERS ORDER DECIMAL PLACE SIGNIFICANT FIGURES • STANDARD FORM NUMBERS IN WORDS • OBJECTIVE • LEVEL 3: UNDERSTAND HOW TO WRITE NUMBERS IN WORDS • SUCCESS CRITERIA • WRITE NUMBERS OF INCREASING MAGNITUDE IN WORDS • CONVERT NUMBERS WRITTEN IN WORDS INTO DECIMAL NUMBERS TYPES OF NUMBER • • • • • • • Counting numbers Natural numbers Odd numbers Even numbers Integers Positive integers Negative integers 1, 2, 3, 4, 5, … 1, 2, 3, 4, 5, … 1, 3, 5, 7, 9, … 2, 4, 6, 8, 10, … …,-2, -1, 0, 1, 2, … +1, +2, +3, +4, … -1, -2, -3, -4, -5, … Match the words to the numbers Match the words to the numbers Sixty two thousand and five 60025 Sixty two thousand and five 60025 Sixty thousand two hundred and five 625 Sixty thousand two hundred and five 625 Six thousand two hundred and fifty 60205 Six thousand two hundred and fifty 60205 Sixty thousand and twenty five 6025 Sixty thousand and twenty five 6025 Sixty two thousand five hundred 600025 Sixty two thousand five hundred 600025 Six hundred and twenty five 62005 Six hundred and twenty five 62005 Six thousand and twenty five 6205 Six thousand and twenty five 6205 Six thousand two hundred and five 62500 Six thousand two hundred and five 62500 Six hundred thousand and twenty five 6250 Six hundred thousand and twenty five 6250 Complete the table Ten thousands thousands hundreds tens units words Hundred thousands millions 3 4 0 9 0 thirty four thousand and ninety three million and fifty six 4 0 0 0 0 9 3 three hundred and fifty six thousand 3 3 6 2 9 9 0 4 5 2 9 2 4 7 1 8 4 2 1 8 5 CREATE YOUR OWN NUMBER whole numbers in words IN WORDS What does the 9 represent in each case 9 653 Nine thousand or 9000 85 096 49 632 839 9 828 400 96 000 000 What does the 9 represent in each case 9 653 Nine thousand or 9000 85 096 Nine tens or 90 Nine thousands or 9000 49 632 Nine units or 9 839 9 828 400 Nine million or 9000 000 96 000 000 Ninety million or 90 000 000 Write out the decimal numbers in words 5.96 Five point nine six 98.7 2.945 52.87 96.709 0.009 0.06 Note: the most common mistake is to say 5.96 is five point ninety six. This is five point nine six Write out the decimal numbers in words 5.96 Five point nine six 98.7 2.945 Ninety eight point seven 52.87 Two point nine four five Fifty two point eight seven 96.709 Ninety six point seven zero nine 0.009 Zero point zero zero nine Zero point zero six 0.06 Note: the most common mistake is to say 5.96 is five point ninety six. This is five point nine six CREATE YOUR OWN NUMBER decimal numbers in words IN WORDS What does the 4 represent in each case 53.47 8.504 9.642 83.49 6.84 93.004 Four tenths or 4/10 Four thousandths or 4/1000 Four hundredths or 4/100 What does the 4 represent in each case 53.47 8.504 9.642 83.49 6.84 93.004 Four tenths or 4/10 Four thousandths or 4/1000 Four hundredths or 4/100 Four tenths or 4/10 Four hundredths or 4/100 Four thousandths or 4/1000 NUMBERS IN WORDS REVIEW • WRITE NUMBERS OF INCREASING MAGNITUDE IN WORDS • CONVERT NUMBERS WRITTEN IN WORDS INTO DECIMAL NUMBERS • IDENTIFY MAGNITUDE BY POSITION MULTIPLY AND DIVIDE BY POWERS OF 10 • OBJECTIVE • LEVEL 4: UNDERSTAND HOW TO MULTIPLY AND DIVIDE BY POWERS OF 10 • SUCCESS CRITERIA • MULTIPLY BY 10 AND ADD A ZERO • MULTIPLY BY 100 AND ADD TWO ZERO’S • MULTIPLY A DECIMAL BY 10 AND THE NUMBERS MOVE TO THE LEFT • DIVIDE A DECIMAL BY 10 AND THE NUMBERS MOVE TO THE RIGHT Starter a) 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 = b) 5 + 5 + 5 + 5 + 5 + 5 + 5 + 5 + 5 + 5 = c) 8 + 8 + 8+ 8 + 8 + 8 + 8 + 8 + 8 + 8 = d) Is there a quick way to add the same number ten times? Modulus • MODULUS means size irrespective of sign |-4| = 4 |6| = 6 |-0.06| = 0.06 The decimal point needs to be put back into the number 7850 16300 47600 233000 650000 650000 650000 185730 31200 07500 Seven point eight five Sixteen point three Four point seven six three Two hundred and thirty three Sixty five thousand Six thousand five hundred Six hundred and fifty Eighteen point five seven three Three hundred and twelve Zero point seven five The decimal point needs to be put back into the number 7 850 16 300 4 7630 233 000 65000 0 6500 00 650 000 18 5730 312 00 0 7500 Seven point eight five Sixteen point three Four point seven six three Two hundred and thirty three Sixty five thousand Six thousand five hundred Six hundred and fifty Eighteen point five seven three Three hundred and twelve Zero point seven five Multiply numbers by ten • When a number is multiplied by ten the modulus of the number increases. • If a whole number is multiplied by 10 a zero is placed on the right hand end of the number 16 × 10 = 160 7 × 10 = 70 • If a decimal number is multiplied by 10 then the numbers move one place to the left of the decimal point and empty spaces are replaced by zero’s 2.76 × 10 = 27.6 0.62 × 10 = 6.2 Multiply numbers by 10 Example 1. 2. 3. 4. 5. 6. 7. 8. 45 × 10 = 450 45 × 10 = 5 × 10 = 57 × 10 = 20 × 10 = 89 × 10 = 128 × 10 = 167 × 10 = 360 × 10 = Example 1. 2. 3. 4. 5. 6. 7. 8. 5.7 × 10 = 57 5.1 × 10 = 9.2 × 10 = 12.8 × 10 = 10.9 × 10 = 6.056 × 10 = 0.67 × 10 = 0.061 × 10 = 0.0074 × 10 = Multiply numbers by 10 Example 1. 2. 3. 4. 5. 6. 7. 8. 45 × 10 = 450 45 × 10 = 450 5 × 10 = 50 57 × 10 = 570 20 × 10 = 200 89 × 10 = 890 128 × 10 = 1280 167 × 10 = 1670 360 × 10 = 300 Example 1. 2. 3. 4. 5. 6. 7. 8. 5.7 × 10 = 57 5.1 × 10 = 51 9.2 × 10 = 92 12.8 × 10 = 128 10.9 × 10 = 109 6.056 × 10 = 60.56 0.67 × 10 = 6.7 0.061 × 10 = 0.61 0.0074 × 10 = 0.074 Multiply numbers by one hundred • When a number is multiplied by one hundred the modulus of the number increases. • If a whole number is multiplied by 100 two zero’s are placed on the right hand end of the number 46 × 100 = 4600 8 × 100 = 800 • If a decimal number is multiplied by 100 then the numbers move two places to the left of the decimal point and empty spaces are replaced by zero’s 2.6 × 100 = 260 0.38 × 100 = 38 Multiply numbers by 100 Example 37 × 100 = 3700 Example 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 × 100 = 9 × 100 = 27 × 100 = 60 × 100 = 49 × 100 = 524 × 100 = 973 × 100 = 940 × 100 = 5.7 × 100 = 570 8.1 × 100 = 3.2 × 100 = 16.8 × 100 = 14.9 × 100 = 8.056 × 100 = 0.95 × 100 = 0.039 × 100 = 0.0059 × 100 = Multiply numbers by 100 Example 37 × 100 = 3700 Example 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 × 100 = 8900 9 × 100 = 900 27 × 100 = 2700 60 × 100 = 6000 49 × 100 = 4900 524 × 100 = 52400 973 × 100 = 97300 940 × 100 = 94000 5.7 × 100 = 570 8.1 × 100 = 810 3.2 × 100 = 320 16.8 × 100 = 1680 14.9 × 100 = 1490 8.056 × 100 = 805.6 0.95 × 100 = 95 0.039 × 100 = 3.9 0.0059 × 100 = 0.59 Divide numbers by 10 • When a number is divided by ten the modulus of the number decreases. • If a whole number is divided by 10 then the numbers move one place to the right of the decimal point and empty spaces are filled with zero’s 16 ÷ 10 = 1.6 8 ÷ 10 = 0.8 • If a decimal number is divided by 10 then the numbers move one place to the right of the decimal point and empty spaces are filled with zero’s 14.6 ÷ 10 = 1.46 0.46 ÷ 10 = 0.046 Divide numbers by 10 Example 49 ÷ 10 = 4.9 Example 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 ÷ 10 = 5 ÷ 10 = 87 ÷ 10 = 40 ÷ 10 = 39 ÷ 10 = 174 ÷ 10 = 925 ÷ 10 = 620 ÷ 10 = 9.5 ÷ 10 = 0.95 65.1 ÷ 10 = 43.2 ÷ 10 = 6.8 ÷ 10 = 4.9 ÷ 10 = 7.046 ÷ 10 = 0.51 ÷ 10 = 0.064 ÷ 10 = 0.0038 ÷ 10 = Divide numbers by 10 Example 49 ÷ 10 = 4.9 Example 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 ÷ 10 = 8.9 5 ÷ 10 = 0.5 87 ÷ 10 = 8.7 40 ÷ 10 = 4 39 ÷ 10 = 3.9 174 ÷ 10 = 17.4 925 ÷ 10 = 92.5 620 ÷ 10 = 62 9.5 ÷ 10 = 0.95 65.1 ÷ 10 = 6.51 43.2 ÷ 10 = 4.32 6.8 ÷ 10 = 0.68 4.9 ÷ 10 = 0.49 7.046 ÷ 10 = 0.7046 0.51 ÷ 10 = 0.051 0.064 ÷ 10 = 0.0064 0.0038 ÷ 10 = 0.00038 Divide numbers by 100 • When a number is divided by one hundred the modulus of the number decreases. • If a whole number is divided by 100 then the numbers move two places to the right of the decimal point and empty spaces are filled with zero’s 67 ÷ 100 = 0.67 4 ÷ 100 = 0.04 • If a decimal number is divided by 100 then the numbers move two places to the right of the decimal point and empty spaces are filled with zero’s 67.8 ÷ 100 = 0.678 0.86 ÷ 100 = 0.0086 Divide numbers by 100 Example 49 ÷ 100 = 0.49 Example 9.5 ÷ 100 = 0.095 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 ÷ 100 = 63 ÷ 100 = 7 ÷ 100 = 90 ÷ 100 = 73 ÷ 100 = 714 ÷ 100 = 953 ÷ 100 = 630 ÷ 100 = 9.1 ÷ 100 = 6.2 ÷ 100 = 46.8 ÷ 100 = 34.9 ÷ 100 = 7.056 ÷ 100 = 0.74 ÷ 100 = 0.062 ÷ 100 = 0.0094 ÷ 100 = Divide numbers by 100 Example 49 ÷ 100 = 0.49 Example 9.5 ÷ 100 = 0.095 1. 2. 3. 4. 5. 6. 7. 8. 1. 2. 3. 4. 5. 6. 7. 8. 89 ÷ 100 = 0.89 63 ÷ 100 = 0.63 7 ÷ 100 = 0.07 90 ÷ 100 = 0.9 73 ÷ 100 = 0.73 714 ÷ 100 = 7.14 953 ÷ 100 = 9.53 630 ÷ 100 = 6.3 9.1 ÷ 100 = 0.091 6.2 ÷ 100 = 0.062 46.8 ÷ 100 = 0.468 34.9 ÷ 100 = 0.349 7.056 ÷ 100 = 0.07056 0.74 ÷ 100 = 0.0074 0.062 ÷ 100 = 0.00062 0.0094 ÷ 100 = 0.000094 × 100 × 100 × 10 ÷ 100 ÷ 10 ÷ 10 ÷ 10 30 ÷ 10 30000 ÷ 10 300 × 100 3 × 10 30 × 100 ÷ 100 3000 3000 ÷ 10 ÷ 10 3000 ÷ 10 30 300 ÷ 10 ÷ 10 30000 300 × 100 30 Create and complete your own snake × 10 × ÷ 10 ÷ name………………………. Multiply by Powers of 10 review • MULTIPLY BY 10 AND ADD A ZERO • MULTIPLY BY 100 AND ADD TWO ZERO’S • MULTIPLY A DECIMAL BY 10 AND THE NUMBERS MOVE TO THE LEFT OF THE DECIMAL POINT • DIVIDE A DECIMAL BY 10 AND THE NUMBERS MOVE TO THE RIGHT OF THE DECIMAL POINT ORDER WHOLE NUMBERS • OBJECTIVE • LEVEL 4: UNDERSTAND HOW TO ORDER WHOLE NUMBERS • SUCCESS CRITERIA • ORDER NEGATIVE NUMBERS • ORDER POSITIVE NUMBERS • ORDER INTEGERS Complete the Number lines -10 -6 -60 -250 0 -20 0 -50 0 2 4 8 40 80 100 250 Order whole numbers • We are often asked to place numbers in order of size. We must remember that: • Negative numbers are smaller than positive numbers • Zero lies between the positive and negative numbers • If in doubt – think of a number line Number lines -10 -8 -6 -4 -2 0 2 4 6 8 10 -100 -80 -60 -40 -20 0 20 40 60 80 100 -250 -200 -150 -100 -50 0 50 100 150 200 250 ORDER POSITIVE INTEGERS • Example • Place the following numbers in order, smallest first 6, 8, 24, 17, 81, 12, 15 6, 8, 12, 15, 17, 24, 81 ORDER POSITIVE INTEGERS Place the following sets of numbers in order, smallest first. Place the temperatures in order, highest to lowest 1. 2. 3. 4. 5. 1. 2. 3. 4. 5. 12, 83, 27, 1, 5 30, 41, 5, 17, 46 41, 1, 24, 56, 28 12, 91, 72, 8, 93 81, 93, 56, 34, 9 760C, 210C, 260C 150C, 180C, 160C 910C, 120C, 390C 510C, 170C, 560C 190C, 160C, 730C EXTENSION – calculate the totals for each question 1 ORDER POSITIVE INTEGERS Place the following sets of numbers in order, smallest first. Place the temperatures in order, highest to lowest 1. 2. 3. 4. 5. 1. 2. 3. 4. 5. 1, 5 , 12, 27, 83 5, 17, 30, 41, 46 1, 24, 28, 41, 56 8, 12, 72, 91, 93 9, 34, 56, 81, 93 EXTENSION – 128, 123 210C, 260C, 760C 150C, 160C, 180C, 120C, 390C, 910C 170C, 510C, 560C 160C, 190C, 730C ORDER NEGATIVE INTEGERS • Example • Place the following numbers in order, smallest first -6, -8, -4, -7, -18, -2, -5 -18, -8, -7, -6, -5, -4, -2 ORDER NEGATIVE INTEGERS Place the following sets of numbers in order, smallest first. Place the temperatures in order, highest to lowest 1. 2. 3. 4. 5. 1. 2. 3. 4. 5. -2, -8, -17, -1, -52 -3, -4, -8, -27, -16 -3, -18, -2, -76, -26 -7, -9, -2, -18, -28 -8, -56, -42, -37 -92 -150C, -20C, -160C -120C, -80C, -60C -90C, -150C, -190C -50C, -70C, -90C -120C, -60C, -80C EXTENSION – calculate the totals for each question 1 ORDER NEGATIVE INTEGERS Place the following sets of numbers in order, smallest first. Place the temperatures in order, highest to lowest 1. 2. 3. 4. 5. 1. 2. 3. 4. 5. -52, -17, -8, -2, -1 -27, -16, -8, -4, -3 -76, -26, -18, -3, -2 -28, -18, -9, -7, -2 -92, -56, -42, -37 -8 EXTENSION – -80, -33 -160C, -150C, -20C -120C, -80C, -60C -190C, -150C, -90C -90C, -70C, -50C -120C, -80C, -60C ORDER INTEGERS • Example • Place the following numbers in order, smallest first 6, 0, -8, 4, 7, 8, -2, -5 -8, -5, -2, 0, 4, 6, 7, 8 ORDER INTEGERS Place the temperatures in order, lowest to highest 1. 2. 3. 4. 5. 6. 60C, 20C, 80C, -50C, -20C, -60C 50C, 80C, 00C, -20C, -80C, -60C 10C, 120C, 90C, -90C, -150C, -190C 50C, 70C, 60C, 00C, -70C, -90C 190C, 160C, 70C, -120C, -60C, -80C What is the difference between the highest and lowest values EXTENSION – calculate the totals for each set of values ORDER INTEGERS Place the temperatures in order, lowest to highest 1. 2. 3. 4. 5. 6. -60C, -50C, -20C, 20C, 60C, 80C -80C, -60C, -20C, 00C, 50C, 80C -190C, -150C, -90C, 10C, 90C, 120C -90C, -70C, 00C, 50C, 60C, 70C, -120C, -80C, -60C, 70C, 160C, 190C 14, 16, 31, 16, 31 EXTENSION – 1, -3, -21, 2,16 ORDER INTEGERS -60C, -40C, -20C, 00C, 20C, 40C, 60C , 80C 1. 2. 3. 4. Calculate the total for the temperatures Which is the coldest temperature List the three coldest temperatures List the three highest temperatures Extension What is the difference between the highest and coldest temperatures ORDER INTEGERS -60C, -40C, -20C, 00C, 20C, 40C, 60C , 80C 1. 2. 3. 4. Calculate the total for the temperatures 8 Which is the coldest temperature -6 List the three coldest temperatures -6, -4, -2 List the three highest temperatures 4, 6, 8 Extension What is the difference between the highest and coldest temperatures 14 ORDER INTEGERS 5 7 0 3 1 1. Create the largest number using all five cards 2. Create the smallest number using all five cards 3. Create the largest number using only the four smallest cards 4. Create a number from four cards that can be divided by 2 Extension Create a four digit number that is divisible by 3 ORDER INTEGERS 5 7 0 3 1 1. Create the largest number using all five cards 75310 2. Create the smallest number using all five cards10357 3. Create the largest number using only the four smallest cards, 5310 4. Create a number from four cards that can be divided by 2, ends in 0 Extension Create a four digit number that is divisible by 3, digits add up to a multiple of 3 Change in temperature 1. Calculate the temperature if it drops by 100C from 70C 2. Calculate the temperature if it drops by 150C from -20C 3. Calculate the temperature if it rises by 120C from 40C 4. Calculate the temperature if it rises by 150C from -80C ORDER WHOLE NUMBERS REVIEW • ORDER NEGATIVE NUMBERS • ORDER POSITIVE NUMBERS • ORDER INTEGERS Rounding numbers • OBJECTIVE • LEVEL 5: UNDERSTAND HOW TO ROUND INTEGERS AND DECIMAL NUMBERS TO ONE AND TWO DECIMAL PLACES • SUCCESS CRITERIA • ROUND INTEGERS TO THE NEAREST 10 AND 100 • ROUND DECIMAL NUMBERS TO ONE DECIMAL PLACE • ROUND DECIMAL NUMBERS TO TWO DECIMAL PLACES Which is closer 1. Is 390 closer to 400 or 300 2. Is 7647 closer to 7640 or 7650 3. Is 4849 closer to 4900 or 4800 4. Is 38 closer to 100 or 0 Rounding Numbers Rules for rounding numbers • To round to the nearest 10 we look at the number in the units column • To round to the nearest 100 we look at the number in the tens column • If the number is less than 5 we round down • If the number is 5 or greater we round up • Example Note: Round 5946 to the nearest a) 10 b) 100 c) 1000 a) 5950 c) 6000 b) 5900 27 to the nearest 100 is 0 974 to the nearest 100 is 1000 Complete the table Extension Nearest 10 Nearest 100 Nearest 1000 6794 9485 6328 593 786 78 82 17 78325 Complete the table Extension Nearest 10 Nearest 100 Nearest 1000 6794 9485 6328 6790 9490 6330 6800 9500 6300 7000 9000 6000 593 786 78 82 590 790 80 80 600 800 100 100 1000 1000 0 0 17 78325 20 78330 0 78300 0 78000 Rounding Decimal numbers Rules for rounding decimal numbers • To round to one decimal place we look at the number in the second decimal place • To round to two decimal places we look at the number in the third decimal place • If the number is less than 5 we round down • If the number is 5 or greater we round up • Example Note: Round 48.7852 to a) 3 dp b) 2 dp c) 1 dp a) 48.765 c) 48.8 b) 48.79 3.96 rounded to 1 decimal place is 4.0 4.796 rounded to 2 decimal places is 4.80 Complete the table 1 dp 5.7626 94.7549 6.8463 8.7638 16.482 47.839 38.978 42.73 18.48 2 dp Extension 3 dp Complete the table 1 dp 2 dp Extension 3 dp 5.7626 94.7549 6.8463 5.8 94.8 6.8 5.76 94.75 6.85 5.763 94.755 6.846 8.7638 16.482 47.839 38.978 8.8 16.5 47.8 39.0 8.76 16.48 47.84 38.98 8.764 16.482 47.839 38.978 42.73 18.48 42.7 18.5 42.73 18.48 42.730 18.480 Round the number in the centre in different ways 5649.4 1 decimal place 5650 Nearest 10 5649.3976 Write a number in the centre and round in different ways Extension • Is it possible to round a number to a given number of decimal places by rounding in stages. • Example round 7.3241 to 1 dp • 7.3241 7.324 7.32 7.3 change to 3 dp then2dp then 1dp Will this method work for any number 5.247 Rounding numbers review • ROUND INTEGERS TO THE NEAREST 10 AND 100 • ROUND DECIMAL NUMBERS TO ONE DECIMAL PLACE • ROUND DECIMAL NUMBERS TO TWO DECIMAL PLACES Order decimal numbers • OBJECTIVE • LEVEL 6: UNDERSTAND HOW TO ORDER DECIMAL NUMBERS • SUCCESS CRITERIA • LOOK AT PLACE VALUE TO ORDER DECIMAL NUMBERS • MULTIPLY BY 10, 100, 1000 WHEN ORDERING DECIMALS STARTER ORDER INTEGERS Place the temperatures in order, lowest to highest 1. 2. 3. 4. 5. 6. 60C, 20C, 80C, -50C, -20C, -60C 50C, 80C, 00C, -20C, -80C, -60C 10C, 120C, 90C, -90C, -150C, -190C 50C, 70C, 60C, 00C, -70C, -90C 190C, 160C, 70C, -120C, -60C, -80C What is the difference between the highest and lowest values EXTENSION – calculate the totals for each set of values ORDER INTEGERS Place the temperatures in order, lowest to highest 1. 2. 3. 4. 5. 6. -60C, -50C, -20C, 20C, 60C, 80C -80C, -60C, -20C, 00C, 50C, 80C -190C, -150C, -90C, 10C, 90C, 120C -90C, -70C, 00C, 50C, 60C, 70C, -120C, -80C, -60C, 70C, 160C, 190C 14, 16, 31, 16, 31 EXTENSION – 1, -3, -21, 2,16 Multiply by 1000 Multiply each set of numbers by 1000 1. 2. 3. 4. 5. 15.798, 22.782, 35.562, 18.386, 39.784 23.42, 49.02, 89.34, 12.73, 27.56 38.12, 39.94, 29.48, 16.89, 27.39 3.82, 9.03, 6.37, 1.93, 7.48, 2.83 2.3, 4.7, 8.3, 2.5, 0.5, 0.6, 0.2, 0.4 Multiply by 1000 answers Multiply each set of numbers by 1000 1. 2. 3. 4. 5. 15798, 22782, 35562, 18386, 39784 23420, 49020, 89340, 12730, 27560 38120, 39940, 29480, 16890, 27390 3820, 9030, 6370, 1930, 7480, 2830 2300, 4700, 8300, 2500, 500, 600, 200, 400 ORDER DECIMAL NUMBERS Rules to order decimal numbers method 1 • First look at the whole number part of the decimal number and place in order of size • Then look at the first decimal place and place in order based on this number • Then move to the next decimal place and place in order based on this number ORDER DECIMAL NUMBERS Example method 1 Place the following numbers in order, largest to smallest 1.607, 1.67, 0.6, 0.7, 1.7, 0.76, 0.607 Look at the whole number part and arrange by whole number 1.607, 1.67, 1.7, 0.6, 0.7, 0.76, 0.607 Look at the first decimal place and arrange in order 1.7, 1.607, 1.67, 0.7, 0.76, 0.6, 0.607 Look at the next decimal place and arrange in order 1.7, 1.67, 1.607, 0.76, 0.7, 0.6, 0.607 Look at the next decimal place and arrange in order 1.7, 1.67, 1.607, 0.76, 0.7, 0.607, 0.6 ORDER DECIMALS 0.85 2.508 2.5 0.58 0.805 0.08 1. Which is the largest number 2. Which is the smallest number 3. Place the numbers in order of size, smallest first Extension What is the difference between the smallest and largest ORDER DECIMALS 0.85 2.508 2.5 0.58 0.805 0.08 1. Which is the largest number 2.508 2. Which is the smallest number 0.08 3. Place the numbers in order of size, smallest first 0.08, 0.58, 0.805, 0.85, 2.508 Extension What is the difference between the smallest and largest 2.5 ORDER DECIMAL NUMBERS Place the following sets of numbers in order, smallest first. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 1. 2. 3. 4. 5. 6. 7. 0.8, 0.4, 0.6, 0.5, 0.3 0.7, 0.77, 0.76, 0.07 0.45, 0.05, 0.4, 0.04 0.9, 0.2, 0.18, 0.28 0.56, 0.42, 0.37, 0.92 1.7, 1.8, 1.07, 1.08 3.5, 0.05, 2.05, 2.5 0.507, 0.57, 0.705, 0.75 0.604, 0.46, 0.406, 0.405 0.704, 0.074, 0.477, 0.774 1.507, 1.705, 1.075, 2.1 3.701, 2.509, 1.909, 4,39 2.009, 0.009, 0.034, 1.001 1.607, 1.76, 1.067, 1.007 EXTENSION – calculate the totals for each question 1 ORDER DECIMAL NUMBERS Place the following sets of numbers in order, smallest first. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 1. 2. 3. 4. 5. 6. 7. 0.3, 0.4, 0.5, 0.6, 0.8 0.07, 0.7, 0.76, 0.77 0.04, 0.05, 0.4, 0.45 0.18, 0.2, 0.28, 0.9 0.37, 0.42, 0.56, 0.92 1.07, 1.08, 1.7, 1.8 0.05, 2.05, 2.5, 3.5 0.507, 0.57, 0.705, 0.75 0.405, 0.406, 0.46, 0.604 0.074, 0.477, 0.704, 0.774 1.075, 1.507, 1.705, 2.1 1.909, 2.509, 3.701, 4,39 0.009, 0.034, 1.001, 2.009 1.007, 1.067, 1.607, 1.76 EXTENSION – calculate the totals for each question 1 ORDER DECIMAL NUMBERS Rules to order decimal numbers method 2 Look at the numbers to be ordered, identify the highest number of decimal places from the set of numbers If the highest number of decimal places is one then multiply all numbers by 10 If the highest number of decimal places is two then multiply all numbers by 100 If the highest number of decimal places is three then multiply all numbers by 1000 This method converts all the decimal numbers into whole numbers first, we then order the numbers. We must remember to convert back at the end. ORDER DECIMAL NUMBERS Example method 2 Place the following numbers in order, largest to smallest 1.607, 1.67, 0.6, 0.7, 1.7, 0.76, 0.607 Look at the number of decimal places, the biggest number of decimal places is three We must multiply every number by 1000 to give 1607, 1670, 600, 700, 1700, 760, 607 We now place this set of numbers in order 1700, 1670, 1607, 760, 700, 607, 600 We now divide all numbers by 1000 to give 1.7, 1.67, 1.607, 0.76, 0.7, 0.607, 0.6 ORDER DECIMALS 0.907 1.6 1.69 0.609 0.9 0.96 1. Multiply all numbers by 1000 2. Place the multiplied numbers in order, smallest first 3. Place the original numbers in order, smallest first Extension Add the numbers together 6.666 ORDER DECIMALS 0.907 1.6 1.69 0.609 0.9 Multiply all numbers by 1000 907, 1600, 1690, 609, 900, 960 Place the multiplied numbers in order, smallest first 609, 900, 907, 960, 1600, 1690 Place the original numbers in order, smallest first 0.609, 0.9, 0.907, 0.96, 1.6, 1.69 Extension Add the numbers together 6.666 0.96 ORDER DECIMAL NUMBERS Multiply each number by 100. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 0.8, 0.84, 0.86, 0.08 0.7, 0.77, 0.76, 0.07 0.45, 0.05, 0.4, 0.04 0.9, 0.2, 0.18, 0.28 0.56, 0.42, 0.37, 0.92 1.7, 1.8, 1.07, 1.08 3.5, 0.05, 2.05, 2.5 Multiply each number by 1000. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 0.507, 0.57, 0.705, 0.75 0.604, 0.46, 0.406, 0.405 0.704, 0.074, 0.477, 0.774 1.507, 1.705, 1.075, 2.1 3.701, 2.509, 1.909, 4,39 2.009, 0.009, 0.034, 1.001 1.607, 1.76, 1.067, 1.007 EXTENSION – calculate the totals for each question 1 ORDER DECIMAL NUMBERS Multiply each number by 100. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 0.8, 0.84, 0.86, 0.08 0.7, 0.77, 0.76, 0.07 0.45, 0.05, 0.4, 0.04 0.9, 0.2, 0.18, 0.28 0.56, 0.42, 0.37, 0.92 1.7, 1.8, 1.07, 1.08 3.5, 0.05, 2.05, 2.5 Multiply each number by 1000. Place the following sets of numbers in order, smallest first. 1. 2. 3. 4. 5. 6. 7. 0.507, 0.57, 0.705, 0.75 0.604, 0.46, 0.406, 0.405 0.704, 0.074, 0.477, 0.774 1.507, 1.705, 1.075, 2.1 3.701, 2.509, 1.909, 4,39 2.009, 0.009, 0.034, 1.001 1.607, 1.76, 1.067, 1.007 EXTENSION – calculate the totals for each question 1 Place numbers in the empty boxes so they increase in size NAME 1 2 1.1 1.9 0.5 0.9 0.1 0.4 2.1 2.2 0.1 0.2 Order decimal numbers review • • • • • MULTIPLY BY 10, 100, 1000 TO ORDER DECIMALS USE PLACE VALUE TO ORDER DECIMALS ORDER DECIMALS WITH ONE DECIMAL PLACE ORDER DECIMALS WITH TWO DECIMAL PLACES ORDER DECIMALS WITH THREE DECIMAL PLACES SENSIBLE DEGREE OF ACCURACY • OBJECTIVE • LEVEL 6: UNDERSTAND HOW TO APPROXIMATE DECIMALS TO A SENSIBLE DEGREE OF ACCURACY • SUCCESS CRITERIA • DETERMINE THE SENSIBLE DEGREE OF ACCURACY • GIVE ANSWERS TO A SENSIBLE DEGREE OF ACCURACY Starter – how many decimal places are in each number a) 4.78 b) 5.059 c) 0.05 d) 0.0008 DETERMINE THE DEGREE OF ACCURACY • We are sometimes asked to give answers to a sensible degree of accuracy. • To determine the degree of accuracy we must look at the accuracy of the values given in the question • If values are given to 3 decimal places then the answer should be given to two decimal places • If the values given in the question are currency then the answer should be given to 2 decimal places to indicate pounds and pence Determine the degree of accuracy • Example 1 • A room is measured for carpet fitting. The length of the room is 4.3 m and the width is 3.62 m • Calculate the area of the carpet required to a sensible degree of accuracy • Answer Area = length × width Area = 4.3 × 3.62 Area = 15.566 m2 As the length and width were given to an accuracy of up to 2 decimal places the area should be given to the same degree of accuracy Area = 15.57 m2 Determine the degree of accuracy • Example 2 • A 4.6 m length of timber is required to build a fence. The timber costs £4.68 per metre • Calculate the cost of the length of timber • Answer Cost = length × price per m Cost = 4.6 × £4.68 Cost = £21.528 As the final answer is pounds and pence then a sensible degree of accuracy would be 2 decimal places. Cost = £21.53 Complete the table Calculation 4.6 × 7.25 2.8 × £3.50 3.52 × £2.43 7.642 × 7.2 14.6 × 37.2 4.63 × £1.24 5.216 × £0.63 Level of accuracy 2 dp Answer Complete the table Calculation 4.6 × 7.25 2.8 × £3.50 3.52 × £2.43 7.642 × 7.2 14.6 × 37.2 4.63 × £1.24 5.216 × £0.63 Level of accuracy 2 dp 2 dp 2 dp 3 dp 1 dp 2 dp 3 dp Ans. 2dp Answer 33.35 £9.80 £8.55 55.022 543.12 £5.74 £3.29 SENSIBLE DEGREE OF ACCURACY REVIEW • DETERMINE THE SENSIBLE DEGREE OF ACCURACY • GIVE ANSWERS TO A SENSIBLE DEGREE OF ACCURACY SIGNIFICANT FIGURES • OBJECTIVE • LEVEL 7: UNDERSTAND HOW TO APPROXIMATE NUMBERS USING SIGNIFICANT FIGURES • SUCCESS CRITERIA • EXPRESS NUMBERS USING SIGNIFICANT FIGURES • APPROXIMATE CALCULATIONS USING SIGNIFICANT FIGURES Starter Why would the number one hundred and seventy three be written like this? 17 3 Significant figures The numbers 127, 6.24, 0.0278, 809, 0.504 and 62500 all have three significant figures • 0.0278 has three significant figures as the zero’s at the front don’t count • 62500 has three significant figures as the zero’s at the end don’t count • 809 has three significant figures as the zero’s between other digits count Significant figures How many significant figures do these numbers have? 1. 2 2. 91 3. 183 4. 408 5. 87000 6. 2408 How many significant figures do these numbers have? 1. 3.1 2. 5.09 3. 0.7 4. 0.083 5. 0.508 6. 0.0006 Significant figures How many significant figures do these numbers have? 1. 2 1 sf 2. 91 2 sf 3. 183 3 sf 4. 408 3 sf 5. 87000 2 sf 6. 2408 4 sf How many significant figures do these numbers have? 1. 3.1 2 sf 2. 5.09 3 sf 3. 0.7 1 sf 4. 0.083 2 sf 5. 0.508 3 sf 6. 0.0006 1 sf Rounding numbers using significant figures Numbers can be rounded using significant figures in much the same way as we round decimals. • If the digit in the next column of significance is 5 or greater then we round up, else it stays the same • 347 rounded to 2 significant figures is 350 Estimate the following to one significant figure 1. 2. 3. 4. 5. 6. 7. 8. 9. 29 68 72 14 172 149 184 227 678 1. 2. 3. 4. 5. 6. 7. 8. 9. 17.5 128.9 0.67 0.37 0.92 0.029 0.079 0.052 0.0068 Estimate the following to one significant figure 1. 2. 3. 4. 5. 6. 7. 8. 9. 30 70 70 10 200 100 200 200 700 1. 2. 3. 4. 5. 6. 7. 8. 9. 20 100 0.7 0.4 0.9 0.03 0.08 0.05 0.007 Estimate the following to two significant figure 1. 2. 3. 4. 5. 6. 7. 8. 9. 562 672 272 146 138 128 1560 37600 45200 1. 2. 3. 4. 5. 6. 7. 8. 9. 45.9 386.9 0.268 0.382 0.578 0.0946 0.0942 0.00638 0.000836 Estimate the following to two significant figure 1. 2. 3. 4. 5. 6. 7. 8. 9. 560 670 270 150 140 130 1600 38000 45000 1. 2. 3. 4. 5. 6. 7. 8. 9. 46 39 0.27 0.38 0.58 0.095 0.094 0.0064 0.00084 Rounding numbers using significant figures number 346 2894 2.476 19.382 14.975 0.2784 0.003864 0.07399 0.799 1 sf 2 sf 3 sf Rounding numbers using significant figures number 346 2894 2.476 19.382 14.975 0.2784 0.003864 0.07399 0.799 1 sf 300 3000 2 20 10 0.3 0.004 0.07 0.8 2 sf 350 2900 2.5 19 15 0.28 0.0039 0.074 0.80 3 sf 346 2890 2.48 19.4 15.0 0.278 0.00386 0.0740 0.799 Estimating using significant figures • Estimating is when we change numbers into numbers we can use to calculate answers in our heads. Round all numbers to 1 significant figure 37 × 9 ≈ 40 × 10 ≈ 400 • We can now see that 37 × 9 should give a value near 400 Estimate the answer example Estimate the answers to the following problem 317 . 9 56 . 3 47 . 2 Answer 317 . 9 56 . 3 47 . 2 300 60 50 360 50 360 60 6 Estimate answers to the following problems 1) Estimate the answers a) 34 1 56 . 3 to the following b) 19 . 7 c) 8 .2 7 .8 29 . 7 37 . 9 56 . 4 18 . 3 e) d) 9 .2 1 5 .7 29 . 5 18 . 2 68 . 3 f) 46 . 2 2 ) Calculate problems 278 28 17 . 4 the actual answers and compare answers 1 a) 10 d) 5 b) 0.6 e) 28 c) 5 f) 450 2 a) 9.66 d) 4.9 b) 0.54 e) 26.9 c) 5.2 f) 447 Create your own problem showing how you would calculate an estimate of the answer. calculate the actual answer. Then compare answers and comment SIGNIFICANT FIGURES REVIEW • EXPRESS NUMBERS USING SIGNIFICANT FIGURES • APPROXIMATE CALCULATIONS USING SIGNIFICANT FIGURES STANDARD FORM • OBJECTIVE • LEVEL 8: UNDERSTAND HOW TO USE STANDARD FORM • SUCCESS CRITERIA • KNOW WHY WE USE STANDARD FORM • CONVERT NUMBERS INTO STANDARD FORM • CONVERT NUMBERS FROM STANDARD FORM • WHEN TO ADD AND SUBTRACT INDEX NUMBERS • USE STANDARD FORM IN CALCULATIONS (NON CALC) • USE STANDARD FORM IN CALCULATIONS (CALCULATOR) STARTER COMPLETE THE TABLE NUMBER TEN TIMES TEN DIVIDE POWER OF 10 WRITTEN 10n 10 100 1 × 10 × 10 1000 1 × 10 × 10 × 10 102 10000 100000 0.1 0.01 1 ÷ 10 ÷ 10 0.001 1 ÷ 10 ÷ 10 ÷ 10 0.0001 0.00001 10-2 Laws of indices ya × yb = ya + b ya ÷ yb = ya - b (ya )b = yab y0 = 1 y1 = y Laws of indices Example a y × 72 × 74 = 72 + 4 = 7 6 Exercise Simplify 1. 32 × 34 = 2. 54 × 55 = 3. 88 × 84 = 4. 61 × 65 = 5. 92 × 96 = b y = a + b y Laws of indices Example a y ÷ 76 ÷ 74 = 76 - 4 = 7 2 Exercise Simplify 1. 36 ÷ 34 = 2. 59 ÷ 55 = 3. 88 ÷ 84 = 4. 68 ÷ 65 = 5. 94 ÷ 96 = b y = a b y Laws of indices Example (ya)b ab =y (76)4 = 76 × 4 = 724 Exercise Simplify 1. (36)4 = 2. (59)5 = 3. (83)4 = 4. (68)5 = 5. (94)6 = = ya × b Laws of indices cont y a 1 y a 1 yn n y a y b b y a ( b y) a Laws of indices cont y a 1 y a 1 yn n y a y b b y a ( b y) a KNOW WHY WE USE STANDARD FORM Standard form is used to express very large and very small numbers in a different way • 620000000000000 is a very large number • In standard form 620000000000000 = 6.2 × 1014 • 0.000000000017 is a very small number • In standard form 0.000000000017 = 1.7 × 10-12 CONVERT NUMBERS INTO STANDARD FORM To write numbers in standard form they must conform to these rules A × 10n 1 ≤ A <10 and n is an integer • This means A must be greater than or equal to 1 but less than 10. It must have a single digit (1, 2, 3, 4, 5, 6, 7, 8, 9) before the decimal point. • n is a positive or negative whole number CONVERT NUMBERS INTO STANDARD FORM • Example 1 • Convert 267000 into standard form • Example 2 • Convert 34000 into standard form • The decimal point must move 5 places to give 2.67 • The decimal point must move 4 places left to give 3.4 • 267000 = 2.67 × 105 • 34000 = 3.4 × 104 CONVERT NUMBERS INTO STANDARD FORM A × 10n • • • • • • 290 7300 68000 72000 45100 742000 = = = = = = 2.9 × 102 7.3 × 103 6.8 × 104 7.2 × 104 4.51 × 103 7.42 × 105 CONVERT NUMBERS INTO STANDARD FORM 1 1. 2. 3. 4. 5. 6. 7. 8. Convert into standard form 120 = 1.2 × 102 450 270 780 6300 3400 2300 7800 2 Convert into standard form 1. 620 = 6.2 × 102 2. 950 3. 1700 4. 9830 5. 2390 6. 54000 7. 83900 8. 18000 CONVERT NUMBERS INTO STANDARD FORM 1 1. 2. 3. 4. 5. 6. 7. 8. Convert into standard form 1900 = 1.9 × 103 2600 7900 8300 16000 39000 43000 28000 2 Convert into standard form 1. 6500 = 6.5 × 103 2. 9300 3. 13000 4. 94000 5. 390000 6. 240000 7. 98000000 8. 59000000 CONVERT NUMBERS INTO STANDARD FORM • Example 1 • Convert 0.00056 into standard form • Example 2 • Convert 0.0058 into standard form • The decimal point must move 4 places to give 5.6 • The decimal point must move 3 places to give 5.8 • 0.00056 = 5.6 × 10-4 • 0.0058 = 5.8 × 10-3 CONVERT NUMBERS INTO STANDARD FORM A × 10n • • • • • • 0.037 0.0028 0.00038 0.00029 0.00582 0.0000283 = = = = = = 3.7 × 10-2 2.8 × 10-3 3.8 × 10-4 2.9 × 10-4 5.82 × 10-3 2.83 × 10-5 CONVERT NUMBERS INTO STANDARD FORM Convert into standard form 1. 0.038 = 3.8 × 10-2 2. 0.049 3. 0.068 4. 0.039 5. 0.0032 6. 0.0084 7. 0.0067 8. 0.00074 Convert into standard form 1. 0.098 = 9.8 × 10-2 2. 0.063 3. 0.0048 4. 0.0019 5. 0.000062 6. 0.000084 7. 0.000000062 8. 0.00000000293 CONVERT NUMBERS INTO STANDARD FORM Convert into standard form 1. 0.0028 = 2.8 × 10-3 2. 0.0049 3. 0.00068 4. 0.00039 5. 0.00032 6. 0.000084 7. 0.000067 8. 0.0000074 Convert into standard form 1. 0.0063 = 63 × 10-3 2. 0.0042 3. 0.00093 4. 0.00049 5. 0.000056 6. 0.00000748 7. 0.000000000412 8. 0.0000000000843 CONVERT NUMBERS FROM STANDARD FORM • Example 1 • Convert 5.39 × 104 into an ordinary number • Example • Convert 6.73 × 105 into an ordinary number • The decimal point must move 4 places to the right • The decimal point must move 5 places to the right • 5.39 × 104 = 53900 • 6.73 × 105 = 673000 CONVERT NUMBERS FROM STANDARD FORM • Convert into ordinary numbers 1. 5.3 × 102 = 530 2. 3.8 × 102 3. 3.5 × 102 4. 2.4 × 102 5. 3.5 × 103 6. 9.3 × 103 7. 5.27 × 103 8. 5.034 × 103 • 1. 2. 3. 4. 5. 6. 7. 8. Convert into ordinary numbers 6.5 × 103 = 6500 8.1 × 103 3.9 × 103 6.2 × 104 7.4 × 104 8.5 × 104 7.23 × 105 2.307 × 105 CONVERT NUMBERS FROM STANDARD FORM • Example 1 • Convert 6.7 × 10-3 into an ordinary number • Example 2 • Convert 8.31 × 10-3 into an ordinary number • The decimal point must move 3 places to the left • The decimal point must move 3 places to the left • 6.7 × 10-3 = 0.0067 • 8.31 × 10-3 = 0.00831 CONVERT NUMBERS FROM STANDARD FORM • Convert into ordinary numbers 1. 5.9 × 10-2 = 0.059 2. 7.9 × 10-2 = 3. 3.6 × 10-2 = 4. 4.7 × 10-2 = 5. 2.6 × 10-3 = 6. 4.9 × 10-3 = 7. 3.1 × 10-3 = 8. 8.63 × 10-3 = • 1. 2. 3. 4. 5. 6. 7. 8. Convert into ordinary numbers 8.3 × 10-3 = 0.0083 2.9 × 10-3 = 1.8 × 10-3 = 9.5 × 10-3 = 8.4 × 10-4 = 9.8 × 10-4 = 2.8 × 10-4 = 4.35 × 10-4 = WHEN TO ADD AND SUBTRACT INDEX NUMBERS • The number 107 is written in index form. The number 10 is the base number and the number 7 is the index number Index number 7 10 Base number WHEN TO ADD INDEX NUMBERS When two index form numbers are multiplied together and they have the same base we can add the index numbers 103 × 105 = 103 + 5 = 108 WHEN TO ADD INDEX NUMBERS • Example 1 • Simplify • • Example 2 Simplify 10-2 × 107 • The base numbers are the same so we can add the index numbers 104 × 103 • The base numbers are the same so we can add the index numbers 104 × 103 = 104 + 3 = 107 10-2 × 107 = 10-2 + 7 = 105 WHEN TO ADD INDEX NUMBERS • Simplify • Simplify 1. 104 × 105 = 109 2. 102 × 105 3. 106 × 103 4. 107 × 104 5. 104 × 107 6. 106 × 104 7. 104 × 102 8. 103 × 105 1. 104 × 107 = 1011 2. 103 × 105 3. 106 × 105 4. 108 × 104 5. 10-4 × 107 6. 10-6 × 1014 7. 10-4 × 107 8. 10-3 × 105 WHEN TO ADD INDEX NUMBERS • Simplify • Simplify 1. 10-4 × 107 = 103 2. 10-2 × 105 3. 106 × 10-2 4. 107 × 10-3 5. 10-4 × 107 6. 106 × 10-2 7. 104 × 10-2 8. 10-3 × 105 1. 10-2 × 10-7 = 10-9 2. 10-3 × 10-5 3. 10-4 × 10-5 4. 10-8 × 10-3 5. 10-4 × 10-8 6. 10-6 × 10-4 7. 10-4 × 10-6 8. 10-3 × 10-8 WHEN TO SUBTRACT INDEX NUMBERS When two index form numbers are divided and they have the same base we can subtract the index numbers 107 ÷ 105 = 107 – 5 = 102 WHEN TO SUBTRACT INDEX NUMBERS • Example 1 • Simplify • • Example 2 Simplify 10-5 ÷ 103 • The base numbers are the same so we can add the index numbers 108 ÷ 103 • The base numbers are the same so we can add the index numbers 108 ÷ 103 = 108 – 3 = 105 10-5 ÷ 103 = 10-5 – 3 = 10-8 WHEN TO SUBTRACT INDEX NUMBERS • Simplify 1 • Simplify 2 1. 109 ÷ 107 = 102 2. 108 ÷ 105 3. 107 ÷ 103 4. 105 ÷ 104 5. 108 ÷ 103 6. 105 ÷ 103 7. 104 ÷ 102 8. 102 ÷ 105 1. 109 ÷ 104 = 105 2. 108 ÷ 103 3. 1011 ÷ 103 4. 107 ÷ 104 5. 10-5 ÷ 10-2 6. 10-2 ÷ 103 7. 104 ÷ 10-2 8. 10-8 ÷ 10-3 WHEN TO SUBTRACT INDEX NUMBERS • Simplify 3 • Simplify 4 1. 10-5 ÷ 106 = 10-11 2. 10-8 ÷ 105 3. 10-7 ÷ 103 4. 10-5 ÷ 104 5. 108 ÷ 10-3 6. 105 ÷ 10-4 7. 104 ÷ 10-2 8. 10-2 ÷ 10-5 1. 10-7 ÷ 10-5 = 10-2 2. 10-6 ÷ 10-2 3. 10-1 ÷ 10-3 4. 10-7 ÷ 10-3 5. 10-8 ÷ 10-4 6. 10-2 ÷ 10-8 7. 10-9 ÷ 10-2 8. 10-8 ÷ 10-5 USE STANDARD FORM IN CALCULATIONS (NON CALC) • We can simplify expressions given in standard form using the skills we have gained. • • • • • Example Simplify 3.0 × 105 × 4.0 × 103 Rearrange 3.0 × 4.0 × 105 × 103 Multiply together Answer 12 × 108 = 1.2 × 109 USE STANDARD FORM IN CALCULATIONS (NON CALC) • • • • • • • • • Simplify 1 2.0 × 105 × 4.0 × 103 3.0 × 106 × 2.0 × 102 5.0 × 102 × 3.0 × 103 4.0 × 103 × 3.0 × 104 2.0 × 107 × 2.5 × 103 1.5 × 104 × 4.0 × 105 2.0 × 105 × 1.5 × 106 2.5 × 104 × 3.0 × 103 • • • • • • • • • Simplify 2 2.0 × 106 × 2.5 × 104 1.5 × 105 × 4.0 × 106 2.0 × 106 × 1.5 × 107 2.5 × 105 × 3.0 × 108 2.0 × 104 × 4.3 × 102 3.4 × 103 × 2.0 × 104 5.0 × 104 × 2.1 × 105 4.0 × 103 × 3.1 × 104 USE STANDARD FORM IN CALCULATIONS (NON CALC) • We can simplify expressions given in standard form using the skills we have gained. • • • • • Example Simplify Rearrange Divide Answer 8.0 × 105 ÷ (4.0 × 103) 8.0 ÷ 4.0 × 105 ÷ 103 2.0 × 102 USE STANDARD FORM IN CALCULATIONS (NON CALC) • • • • • • • • • Simplify 1 8.0 × 105 ÷ 8.0 × 107 ÷ 6.0 × 103 ÷ 4.0 × 105 ÷ 9.0 × 109 ÷ 2.0 × 105 ÷ 5.0 × 104 ÷ 3.0 × 103 ÷ (4.0 × 103) (2.0 × 102) (3.0 × 107) (2.0 × 106) (3.0 × 102) (4.0 × 103) (2.5 × 104) (1.5 × 106) • • • • • • • • • Simplify 2 6.0 × 105 ÷ 9.0 × 107 ÷ 6.0 × 103 ÷ 4.0 × 105 ÷ 5.0 × 109 ÷ 2.0 × 105 ÷ 9.0 × 104 ÷ 7.0 × 103 ÷ (3.0 (3.0 (2.0 (2.0 (2.5 (4.0 (4.5 (3.5 × × × × × × × × 106) 107) 105) 109) 105) 107) 108) 104) USE STANDARD FORM IN CALCULATIONS (CALCULATOR) • To enter 105 into a calculator we must use the raise to power button xy • 8.6 × 105 when entered into a calculator we press the buttons in this sequence • 8.6 x 10 xy 5 = 860000 USE STANDARD FORM IN CALCULATIONS (CALCULATOR) Example Simplify 3.2 × 10 3.2 × 108 × 4.0 × 1012 xy 8 × 4.0 × 10 xy 12 = 25.6 × 1020 3.2 × 108 × 4.0 × 1012 = 2.56 × 1021 USE STANDARD FORM IN CALCULATIONS (CALCULATOR) • • • • • • • • • Simplify 1 2.0 × 105 × 4.0 × 103 3.0 × 106 × 2.0 × 102 5.0 × 102 × 3.0 × 103 4.0 × 103 × 3.0 × 104 2.0 × 107 × 2.5 × 103 1.5 × 104 × 4.0 × 105 2.0 × 105 × 1.5 × 106 2.5 × 104 × 3.0 × 103 • • • • • • • • • Simplify 2 2.0 × 106 × 2.5 × 104 1.5 × 105 × 4.0 × 106 2.0 × 106 × 1.5 × 107 2.5 × 105 × 3.0 × 108 2.0 × 104 × 4.3 × 102 3.4 × 103 × 2.0 × 104 5.0 × 104 × 2.1 × 105 4.0 × 103 × 3.1 × 104 USE STANDARD FORM IN CALCULATIONS (CALCULATOR) • Example • simplify 4.8 × 108 2.4 × 1012 4.8 × 10 xy 8 ÷ (2.4 × 10 xy 12) = 2.0 × 10-4 4.8 × 108 = 2.0 × 10-4 2.4 × 1012 R USE STANDARD FORM IN CALCULATIONS (NON CALC) • • • • • • • • • Simplify 1 8.0 × 105 ÷ 8.0 × 107 ÷ 6.0 × 103 ÷ 4.0 × 105 ÷ 9.0 × 109 ÷ 2.0 × 105 ÷ 5.0 × 104 ÷ 3.0 × 103 ÷ (4.0 × 103) (2.0 × 102) (3.0 × 107) (2.0 × 106) (3.0 × 102) (4.0 × 103) (2.5 × 104) (1.5 × 106) • • • • • • • • • Simplify 2 6.0 × 105 ÷ 9.0 × 107 ÷ 6.0 × 103 ÷ 4.0 × 105 ÷ 5.0 × 109 ÷ 2.0 × 105 ÷ 9.0 × 104 ÷ 7.0 × 103 ÷ (3.0 (3.0 (2.0 (2.0 (2.5 (4.0 (4.5 (3.5 × × × × × × × × 106) 107) 105) 109) 105) 107) 108) 104) STANDARD FORM REVIEW • • • • • KNOW WHY WE USE STANDARD FORM CONVERT NUMBERS INTO STANDARD FORM CONVERT NUMBERS FROM STANDARD FORM WHEN TO ADD AND DIVIDE INDEX NUMBERS USE STANDARD FORM IN CALCULATIONS (NON CALC) • USE STANDARD FORM IN CALCULATIONS (CALCULATOR) Number 2 level descriptors • OBJECTIVE • LEVEL 7: UNDERSTAND HOW TO ESTIMATE TO 1, 2 AND 3 SIGNIFICANT FIGURE • SUCCESS CRITERIA • KNOW WHY WE ESTIMATE NUMBERS • WRITE NUMBERS TO 1, 2 AND 3 SIGNIFICANT FIGURES • KEEP ZERO’S TO MAINTAIN MAGNITUDE Number 2 level descriptors • OBJECTIVE • LEVEL 7: UNDERSTAND HOW TO ESTIMATE TO SIGNIFICANT FIGURES TO FIND APPROXIMATE ANSWERS TO PROBLEMS • SUCCESS CRITERIA • FIND APPROXIMATE SOLUTIONS TO PROBLEMS BY ESTIMATING NUMBERS Number 2 level descriptors • OBJECTIVE • LEVEL 8: UNDERSTAND HOW TO WRITE NUMBERS IN STANDARD FORM • SUCCESS CRITERIA • CONVERT A NUMBER WRITTEN IN DECIMAL FORM INTO STANDARD FORM Number 2 level descriptors • OBJECTIVE • LEVEL 8: UNDERSTAND HOW TO WRITE STANDARD FORM NUMBERS IN DECIMAL FORM • SUCCESS CRITERIA • CONVERT A NUMBER WRITTEN IN STANDARD INTO DECIMAL FORM Number 2 level descriptors • OBJECTIVE • LEVEL 8: UNDERSTAND HOW TO SOLVE PROBLEMS USING STANDARD FORM WITH A CALCULATOR • SUCCESS CRITERIA • USE THE XY BUTTON ON A CALCULATOR • USE BRACKETS TO KEY IN PROBLEMS Number 2 level descriptors • OBJECTIVE • LEVEL 8: UNDERSTAND HOW TO SOLVE PROBLEMS USING STANDARD FORM • SUCCESS CRITERIA • USE THE LAWS OF INDICES TO MULTIPLY AND DIVIDE NUMBERS WRITTEN IN STANDARD FORM • ADD AND SUBTRACT NUMBERS WRITTEN IN STANDARD FORM NUMBER STARTERS Write numbers in words • Objectives • Success Criteria • Understand how to round off integers • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results Key Words • • • • • • • • Integers Natural numbers Decimal numbers Decimal place Significant figures Approximate Estimate Rounding • • • • • • • • Standard form Place value Multiply Divide Rounding Powers Nearest Zero Rounding integers • Objectives • Success Criteria • Understand how to round off integers • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results School Bus Journey 1 3 2 5 4 7 6 9 8 School Bus Journey 10 30 20 50 40 70 60 90 80 School Bus Journey • Which bus stop would you get on if you lived: • 18km from school • 33km from school • 11km from school • 75km from school • 94km from school • 35km from school • 87km from school • 25km from school School Bus Journey 100 300 200 500 400 700 600 900 800 School Bus Journey • Which bus stop would you get on if you lived: • 418km from school • 303km from school • 630km from school • 750km from school • 946km from school • 135km from school • 597km from school • 825km from school Rounding Off – nearest 10 Round off the following numbers to the nearest 10: 1) 2) 3) 4) 5) 6) 7) 8) 9) 6 13 17 321 925 1369 8394 6929 12937 ans = ans = ans = ans = ans = ans = ans = ans = ans = Rounding Off – nearest 100 Round off the following numbers to the nearest 100 1) 2) 3) 4) 5) 6) 7) 8) 9) 27 53 88 145 150 1983 2943 12948 40385 ans = ans = ans = ans = ans = ans = ans = ans = ans = Rounding Off – nearest 1000 Round off the following numbers to the nearest 1000 1) 2) 3) 4) 5) 6) 7) 8) 9) 500 1200 2499 3501 6700 37814 67194 93167 48560 ans = ans = ans = ans = ans = ans = ans = ans = ans = Rounding decimals • Objectives • Success Criteria • Understand how to round off decimals • Be able to round off decimals to the nearest whole number or to 1 decimal place. • Check results • Be able to tell if an answer is of the correct order of magnitude. School Bus Journey 1 3 2 5 4 7 6 9 8 School Bus Journey 1km 2km 2 3km 4 4km 6 5km 8 School Bus Journey • Which bus stop would you get on if you lived: • • • • • • • • 1.8km 3.3km 1.1km 4.5km 5.4km 3.5km 4.7km 2.5km from from from from from from from from school school school school school school school school School Bus Journey • Which bus stop would you get on if you lived: • • • • • • • • 4.18km 3.03km 2.35km 4.54km 3.46km 1.35km 4.97km 3.25km from from from from from from from from school school school school school school school school Rounding Off – nearest whole number Round off the following decimals to the nearest whole number: 1) 2) 3) 4) 5) 6.3 1.3 1.7 2.8 5.4 ans = ans = ans = ans = ans = Rounding Off – 0ne decimal place Round off the following decimals to one decimal place 1) 2) 3) 4) 5) 2.74 5.36 8.81 1.45 1.58 ans ans ans ans ans = = = = = Rounding Off – one decimal place Round off the following decimals to one decimal place • • • • • 1) 2) 3) 4) 5) 5.09 ans = 12.24ans = 24.89ans = 35.11 ans = 67.06ans = Rounding Off – two decimal places Round off the following decimals to two decimal places • • • • • 1) 2) 3) 4) 5) 5.093ans = 12.247ans = 24.891ans = 35.117ans = 67.065ans = Standard form intro • Objectives • Understand how to write numbers in standard form • Success Criteria • Be able to write numbers in standard form. • Be able to express numbers given in standard form as normal decimal form. Standard form harder • Objectives • Understand how to calculate with numbers in standard form • Success Criteria • Be able to use numbers in standard form to: • Multiply • Divide. Significant figures • Objectives • Success Criteria • Understand how to write numbers using significant figures • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results Calculations with significant figures • Objectives • Success Criteria • Understand how to write numbers using significant figures • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results Multiply by multiples of 10 • Objectives • Success Criteria • Understand how to write numbers using significant figures • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results Estimation • Objectives • Success Criteria • Understand how to write numbers using significant figures • Be able to round off integers to the nearest 10, 100 or 1000 • Be able to tell if an answer is of the correct order of magnitude. • Check results