OCR MEI S1 — Question 5 20 marks

Exam BoardOCR MEI
ModuleS1 (Statistics 1)
Marks20
PaperDownload PDF ↗
Mark schemeDownload PDF ↗
TopicData representation
TypeEstimate mean and standard deviation from histogram
DifficultyModerate -0.3 This is a standard S1 histogram question covering routine techniques: reading frequency densities, calculating mean/SD from grouped data, identifying outliers using the 2SD rule, and recognizing skewness. While multi-part with several marks, each component is a textbook exercise requiring methodical application of formulas rather than problem-solving or insight. Slightly easier than average due to the straightforward, procedural nature.
Spec2.02a Interpret single variable data: tables and diagrams2.02b Histogram: area represents frequency2.02f Measures of average and spread2.02g Calculate mean and standard deviation2.02h Recognize outliers
5 A pear grower collects a random sample of 120 pears from his orchard. The histogram below shows the lengths, in mm , of these pears. \includegraphics[max width=\textwidth, alt={}, center]{056d3e9a-088d-4c97-9546-7cecb59b8727-3_815_1628_505_304}
  1. Calculate the number of pears which are between 90 and 100 mm long.
  2. Calculate an estimate of the mean length of the pears. Explain why your answer is only an estimate.
  3. Calculate an estimate of the standard deviation.
  4. Use your answers to parts (ii) and (iii) to investigate whether there are any outliers.
  5. Name the type of skewness of the distribution.
  6. Illustrate the data using a cumulative frequency diagram.
Question 5:
Part (i)
AnswerMarks Guidance
AnswerMarks Guidance
\(10 \times 2 = 20\)M1 For \(10 \times 2\)
A1 CAO
[2]
Part (ii)
AnswerMarks Guidance
AnswerMarks Guidance
\(\text{Mean} = \frac{10\times65 + 35\times75 + 55\times85 + 20\times95}{120} = \frac{9850}{120} = 82.08\)M1 For midpoints
M1For double pairs
A1 CAO
It is an estimate because the data are groupedE1 indep
[4]
Part (iii)
AnswerMarks Guidance
AnswerMarks Guidance
\(10\times65^2 + 35\times75^2 + 55\times85^2 + 20\times95^2 = 817000\)M1 For \(\Sigma fx^2\)
\(S_{xx} = 817000 - \frac{9850^2}{120} = 8479.17\)M1 For valid attempt at \(S_{xx}\)
\(s = \sqrt{\frac{8479.17}{119}} = 8.44\)A1 CAO
[3]
Part (iv)
AnswerMarks Guidance
AnswerMarks Guidance
\(\bar{x} - 2s = 82.08 - 2\times8.44 = 65.2\)M1 FT for \(\bar{x} - 2s\)
\(\bar{x} + 2s = 82.08 + 2\times8.44 = 98.96\)M1 FT for \(\bar{x} + 2s\)
So there are probably some outliersA1 For both
E1dep on A1
[4]
Part (v)
AnswerMarks Guidance
AnswerMarks Guidance
NegativeB1
[1]
Part (vi)
AnswerMarks Guidance
AnswerMarks Guidance
Cumulative frequencies: 0, 10, 45, 100, 120C1 For cumulative frequencies
Correct scalesS1
Labels: Length and CFL1
Points plotted correctlyP1
Points joinedJ1 dep on P1
[5]All dep on attempt at cumulative frequency
TOTAL [19] 
## Question 5:

### Part (i)
| Answer | Marks | Guidance |
|--------|-------|----------|
| $10 \times 2 = 20$ | M1 | For $10 \times 2$ |
| | A1 CAO | |
| | **[2]** | |

### Part (ii)
| Answer | Marks | Guidance |
|--------|-------|----------|
| $\text{Mean} = \frac{10\times65 + 35\times75 + 55\times85 + 20\times95}{120} = \frac{9850}{120} = 82.08$ | M1 | For midpoints |
| | M1 | For double pairs |
| | A1 CAO | |
| It is an estimate because the data are grouped | E1 | indep |
| | **[4]** | |

### Part (iii)
| Answer | Marks | Guidance |
|--------|-------|----------|
| $10\times65^2 + 35\times75^2 + 55\times85^2 + 20\times95^2 = 817000$ | M1 | For $\Sigma fx^2$ |
| $S_{xx} = 817000 - \frac{9850^2}{120} = 8479.17$ | M1 | For valid attempt at $S_{xx}$ |
| $s = \sqrt{\frac{8479.17}{119}} = 8.44$ | A1 CAO | |
| | **[3]** | |

### Part (iv)
| Answer | Marks | Guidance |
|--------|-------|----------|
| $\bar{x} - 2s = 82.08 - 2\times8.44 = 65.2$ | M1 | FT for $\bar{x} - 2s$ |
| $\bar{x} + 2s = 82.08 + 2\times8.44 = 98.96$ | M1 | FT for $\bar{x} + 2s$ |
| So there are probably some outliers | A1 | For both |
| | E1 | dep on A1 |
| | **[4]** | |

### Part (v)
| Answer | Marks | Guidance |
|--------|-------|----------|
| Negative | B1 | |
| | **[1]** | |

### Part (vi)
| Answer | Marks | Guidance |
|--------|-------|----------|
| Cumulative frequencies: 0, 10, 45, 100, 120 | C1 | For cumulative frequencies |
| Correct scales | S1 | |
| Labels: Length and CF | L1 | |
| Points plotted correctly | P1 | |
| Points joined | J1 | dep on P1 |
| | **[5]** | All dep on attempt at cumulative frequency |
| | **TOTAL [19]** | |

---
5 A pear grower collects a random sample of 120 pears from his orchard. The histogram below shows the lengths, in mm , of these pears.\\
\includegraphics[max width=\textwidth, alt={}, center]{056d3e9a-088d-4c97-9546-7cecb59b8727-3_815_1628_505_304}\\
(i) Calculate the number of pears which are between 90 and 100 mm long.\\
(ii) Calculate an estimate of the mean length of the pears. Explain why your answer is only an estimate.\\
(iii) Calculate an estimate of the standard deviation.\\
(iv) Use your answers to parts (ii) and (iii) to investigate whether there are any outliers.\\
(v) Name the type of skewness of the distribution.\\
(vi) Illustrate the data using a cumulative frequency diagram.

\hfill \mbox{\textit{OCR MEI S1  Q5 [20]}}
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