GCSE Maths – Episode 3 Sherlock Holmes Mysteries - Free GCSE Maths Worksheets
GCSE Maths Starter 18
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Transcript of GCSE Maths Starter 18
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GCSE Maths Starter 18
1. Write down the reciprocal of ¼
2. A small pot costs 20 pence. A large pot costs 150% more, how much does the large pot cost?
3. Copy the pattern into your book, add one more square so the pattern has one line of symmetry
4. Write these numbers in order of size, smallest first:1.8, 3.71, 0.5, 12.4
5.
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Lesson 18 Estimation and using a calculator
Mathswatch clip (14/101/63).
• To round numbers to a given degree of accuracy (Grade E )
• To use your calculator to solve numerical problems (Grade E/D)
EXTN: To calculate an estimate for a given sum (Grade C)
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4 . 3 3 2 5
Significant Figures (Rounding)
Numbers can be rounded to 1,2, 3 or more significant figures. We count the number of figures from the first non-zero digit.
Rounding to 1 s.f
5 or bigger ?
4
5. 7 4 2 5
5 or bigger ?
6
0. 0 4 2 5
5 or bigger ?
0.04
No Yes No
First non-zero
digit.
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Rounding to 1 s.f
0 . 0 7 6
5 or bigger ?
0.08
0. 0 0 1 5
5 or bigger ?
0.002
Yes Yes
First non-zero
digit.
First non-zero
digit.
Significant Figures (Rounding)
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1 . 4 7 2 9
5 or bigger ?
1.5
0. 0 5 3 5
5 or bigger ?
0.054
Yes Yes
First non-zero
digit.
Significant Figures (Rounding)
Rounding to 2 s.f
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2 . 0 7 5 9
5 or bigger ?
2.08
0. 0 2 0 4 6 3
5 or bigger ?
0.0205
Yes Yes
First non-zero
digit.
Significant Figures (Rounding)
Rounding to 3 s.f
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The following number could be the population of a country at a particular instant in time.Write this number to 1, 2, 3, 4, 5, 6 and 7 significant figures.
56 345 67860 000 000 56 000 000 56 300 000
56 350 000 56 346 000 56 345 700
56 345 680
Lesson 18 Estimation and using a calculator
Mathswatch clip (14/101/63).
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Martin uses his calculator to work out 39 × 72.
The display shows an answer of 1053.
How do you know this answer must be wrong?
“is approximately equal to”
39 × 72 40 × 70 = 2800
The product of 39 and 72 must therefore end in an 8.
9 × 2 = 18.9 × 2 = 18.
Estimation
Also, if we multiply together the last digits of 39 and 72 we have
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3.5 × 17.5 can be approximated to:
4 × 20 = 80
3 × 18 = 54
4 × 17 = 68
or between 3 × 17 = 51 and 4 × 18 = 72
How could we estimate the answer to 3.5 × 17.5?
Estimation
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4948 ÷ 58 can be approximated to:
5000 ÷ 60 = ?
5000 ÷ 50 = 100
4950 ÷ 50 = 99
or 4800 ÷ 60 = 80
How could we estimate the answer to 4948 ÷ 58?
Estimation
(60 does not divide into 5000)
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Estimate the following. (Clearly show your rounded values)
1) 29 × 51 2) 431 × 48 3) 2184 × 3962
4) 17.41 × 8.73 5) 4.372 × 1.821 6) 5.32 × 0.236
7) 0.731 × 0.489 8) 0.0813 × 0.27 9) 1.043 × 4.21
10) 2.73 × 4.1 × 6.2 11) 2.43 × 0.045 × 3 12) 0.23 × 2.74 × 3.05 × 0.97
1500
20,000
8,000,000
180
8 1
0.35
0.024
4
72
0.3
1.8
Lesson 18 Estimation and using a calculator
Mathswatch clip (14/101/63).
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Solving complex calculations mentally
What is ?3.2 + 6.8
7.4 – 2.4
3.2 + 6.8
7.4 – 2.4=
10
5= 2
We could also write this calculation as: (3.2 + 6.8) ÷ (7.4 – 2.4).
How could we work this out using a calculator?
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Using bracket keys on the calculator
What is ?3.7 + 2.1
3.7 – 2.1
We start by estimating the answer:
3.7 + 2.1
3.7 – 2.1 3
6
2=
Using brackets we key in:
(3.7 + 2.1) ÷ (3.7 – 2.1) = 3.625
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Lesson 18 Estimation and using a calculatorMathswatch clip (14/101/63).
Some for you to try..
Four people used their calculators to work out .9 + 30
15 – 7
Tracy gets the answer 4.
Fiona gets the answer 4.875.
Andrew gets the answer –4.4.
Sam gets the answer 12.75.
Who is correct?
What did the others do wrong?
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Lesson 18 Estimation and using a calculatorMathswatch clip (14/101/63).
Some for you to try..
![Page 16: GCSE Maths Starter 18](https://reader035.fdocuments.in/reader035/viewer/2022081506/56813942550346895da0dc30/html5/thumbnails/16.jpg)
Lesson 18 Estimation and using a calculatorMathswatch clip (14/101/63).
Exam questions