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# Essential Statistics for the Pharmaceutical Sciences. Edition No. 2

• ID: 3195800
• Book
• October 2015
• 432 Pages
• John Wiley and Sons Ltd

Essential Statistics for the Pharmaceutical Sciences is targeted at all those involved in research in pharmacology, pharmacy or other areas of pharmaceutical science; everybody from undergraduate project students to experienced researchers should find the material they need.

This book will guide all those who are not specialist statisticians in using sound statistical principles throughout the whole journey of a research project - designing the work, selecting appropriate statistical methodology and correctly interpreting the results.  It deliberately avoids detailed calculation methodology.  Its key features are friendliness and clarity.   All methods are illustrated with realistic examples from within pharmaceutical science.

This edition now includes expanded coverage of some of the topics included in the first edition and adds some new topics relevant to pharmaceutical research.

• a clear, accessible introduction to the key statistical techniques used within the pharmaceutical sciences
• all examples set in relevant pharmaceutical contexts.
• key points emphasised in summary boxes and warnings of potential abuses in ‘pirate boxes’.
• supplementary material - full data sets and detailed instructions for carrying out analyses using packages such as SPSS or Minitab – provided at:
[external URL]

An invaluable introduction to statistics for any science student and an essential text for all those involved in pharmaceutical research at whatever level.

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Preface xiii

Statistical packages xix

PART 1: PRESENTING DATA 1

1 Data types 3

1.1 Does it really matter? 3

1.2 Interval scale data 4

1.3 Ordinal scale data 4

1.4 Nominal scale data 5

1.5 Structure of this book 6

1.6 Chapter summary 6

2 Data presentation 7

2.1 Numerical tables 8

2.2 Bar charts and histograms 9

2.3 Pie charts 14

2.4 Scatter plots 16

2.5 Pictorial symbols 21

2.6 Chapter summary 22

PART 2: INTERVAL-SCALE DATA 23

3 Descriptive statistics for interval scale data 25

3.1 Summarising data sets 25

3.2 Indicators of central tendency: Mean, median and mode 26

3.3 Describing variability – Standard deviation and coefficient of variation 33

3.4 Quartiles – Another way to describe data 36

3.5 Describing ordinal data 40

3.6 Using computer packages to generate descriptive statistics 43

3.7 Chapter summary 45

4 The normal distribution 47

4.1 What is a normal distribution? 47

4.2 Identifying data that are not normally distributed 48

4.3 Proportions of individuals within 1SD or 2SD of the mean 52

4.4 Skewness and kurtosis 54

4.5 Chapter summary 57

4.6 Appendix: Power, sample size and the problem of attempting to test for a normal distribution 58

5 Sampling from populations. The standard error of the mean 63

5.1 Samples and populations 63

5.2 From sample to population 65

5.3 Types of sampling error 65

5.4 What factors control the extent of random sampling error when estimating a population mean? 68

5.5 Estimating likely sampling error – The SEM 70

5.6 Offsetting sample size against SD 74

5.7 Chapter summary 75

6 95% Confidence Interval for the Mean and Data Transformation 77

6.1 What is a confidence interval? 78

6.2 How wide should the interval be? 78

6.3 What do we mean by ‘95%’ confidence? 79

6.4 Calculating the interval width 80

6.5 A long series of samples and 95% C.I.s 81

6.6 How sensitive is the width of the C.I. to changes in the SD, the sample size or the required level of confidence? 82

6.7 Two statements 85

6.8 One-sided 95% C.I.s 85

6.9 The 95% C.I. for the difference between two treatments 88

6.10 The need for data to follow a normal distribution and data transformation 90

6.11 Chapter summary 94

7 The two-sample t-test (1): Introducing hypothesis tests 95

7.1 The two-sample t-test – an example of an hypothesis test 96

7.2 Significance 103

7.3 The risk of a false positive finding 104

7.4 What aspects of the data will influence whether or not we obtain a significant outcome? 106

7.5 Requirements for applying a two-sample t-test 108

7.6 Performing and reporting the test 109

7.7 Chapter summary 110

8 The twoÂ]sample t-test (2): The dreaded P value 111

8.1 Measuring how significant a result is 111

8.2 P values 112

8.3 Two ways to define significance? 113

8.4 Obtaining the P value 113

8.5 P values or 95% confidence intervals? 114

8.6 Chapter summary 115

9 The two-sample t-test (3): False negatives, power and necessary sample sizes 117

9.1  What else could possibly go wrong? 118

9.2  Power 119

9.3  Calculating necessary sample size 122

9.4  Chapter summary 130

10 The two-sample t-test (4): Statistical significance, practical significance and equivalence 131

10.1 Practical significance – Is the difference big enough to matter? 131

10.2 Equivalence testing 135

10.3 Non-inferiority testing 139

10.4 P values are less informative and can be positively misleading 141

10.5 Setting equivalence limits prior to experimentation 143

10.6 Chapter summary 144

11 The two-sample t-test (5): One-sided testing 145

11.1 Looking for a change in a specified direction 146

11.2 Protection against false positives 148

11.3 Temptation! 149

11.4 Using a computer package to carry out a one-sided test 153

11.5 Chapter summary 153

12 What does a statistically significant result really tell us? 155

12.1 Interpreting statistical significance 155

12.2 Starting from extreme scepticism 159

12.3 Bayesian statistics 160

12.4 Chapter summary 161

13 The paired t-test: Comparing two related sets of measurements 163

13.1 Paired data 163

13.2 We could analyse the data by a two-sample tÂ]test 165

13.3 Using a paired t-test instead 165

13.4 Performing a paired t-test 166

13.5 What determines whether a paired t-test will be significant? 169

13.6 Greater power of the paired t-test 170

13.7 Applicability of the test 170

13.8 Choice of experimental design 171

13.9 Requirement for applying a paired t-test 172

13.10 Sample sizes, practical significance and one-sided tests 173

13.11 Summarising the differences between paired and two-sample t-tests 175

13.12 Chapter summary 175

14 Analyses of variance: Going beyond t-tests 177

14.1 Extending the complexity of experimental designs 177

14.2 One-way analysis of variance 178

14.3 Two-way analysis of variance 188

14.4 Fixed and random factors 198

14.5 Multi-factorial experiments 204

14.6 Chapter summary 204

15 Correlation and regression – Relationships between measured values 207

15.1 Correlation analysis 208

15.2 Regression analysis 218

15.3 Multiple regression 225

15.4 Chapter summary 235

16 Analysis of Covariance 237

16.1 A clinical trial where ANCOVA would be appropriate 238

16.2 General interpretation of ANCOVA results 239

16.3 Analysis of the COPD trial results 241

16.4 Advantages of ANCOVA over a simple twoÂ]sample tÂ]test 244

16.5 Chapter summary 249

PART 3: NOMINAL-SCALE DATA 251

17 Describing categorised data and the goodness of fit chi-square test 253

17.1 Descriptive statistics 254

17.2 Testing whether the population proportion might credibly be some pre-determined figure 258

17.3 Chapter summary 264

18 Contingency chi-square, Fisher’s and McNemar’s tests 265

18.1 Using the contingency chiÂ]square test to compare observed proportions 266

18.2 Extent of change in proportion with an expulsion – Clinically significant? 270

18.3 Larger tables – Attendance at diabetic clinics 270

18.4 Planning experimental size 273

18.5 Fisher’s exact test 275

18.6 McNemar’s test 277

18.7 Chapter summary 279

18.8 Appendix 280

19 Relative Risk, Odds Ratio and Number Needed to Treat 283

19.1 Measures of treatment effect – Relative Risk, Odds Ratio and Number Needed to Treat 283

19.2 Similarity between Relative Risk and Odds Ratio 287

19.3 Interpreting the various measures 288

19.4 95% confidence intervals for measures of effect size 289

19.5 Chapter summary 293

20 Logistic regression 295

20.1 Modelling a binary outcome 295

20.2 Additional predictors and the problem of confounding 304

20.3 Analysis by computer package 307

20.4 Extending logistic regression beyond dichotomous outcomes 308

20.5 Chapter summary 309

20.6 Appendix 309

PART 4: ORDINAL-SCALE DATA 311

21 Ordinal and non-normally distributed data. Transformations and non-parametric tests 313

21.1 Transforming data to a normal distribution 314

21.2 The Mann–Whitney test – a nonÂ]parametric method 318

21.3 Dealing with ordinal data 323

21.4 Other non-parametric methods 325

21.5 Chapter summary 333

21.6 Appendix 334

PART 5: OTHER TOPICS 337

22 Measures of agreement 339

22.1 Answers to several questions 340

22.2 Several answers to one question – do they agree? 344

22.3 Chapter summary 358

23 Survival analysis 361

23.1 What special problems arise with survival data? 362

23.2 Kaplan–Meier survival estimation 363

23.3 Declining sample sizes in survival studies 369

23.4 Precision of sampling estimates of survival 369

23.5 Indicators of survival 371

23.6 Testing for differences in survival 374

23.7 Chapter summary 383

24 Multiple testing 385

24.1 What is it and why is it a problem? 385

24.2 Where does multiple testing arise? 386

24.3 Methods to avoid false positives 388

24.4 The role of scientific journals 392

24.5 Chapter summary 393

25 Questionnaires 395

25.1 Types of questions 396

25.2 Sample sizes and low return rates 398

25.3 Analysing the results 399

25.4 Problem number two: Confounded questionnaire data 401

25.5 Problem number three: Multiple testing with questionnaire data 401

25.6 Chapter summary 403

Index 000

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Philip Rowe School of Pharmacy and Chemistry.
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