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Quantitative Methods Designing experiments - keeping it simple.

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Presentation on theme: "Quantitative Methods Designing experiments - keeping it simple."— Presentation transcript:

1 Quantitative Methods Designing experiments - keeping it simple

2 Three principles of experimental design Replication Randomisation Blocking

3 Designing experiments - keeping it simple Three principles of experimental design

4 Designing experiments - keeping it simple Three principles of experimental design Design and analysis ReplicationDegrees of freedom

5 Designing experiments - keeping it simple Three principles of experimental design Replication Randomisation Blocking

6 Designing experiments - keeping it simple Three principles of experimental design

7 Designing experiments - keeping it simple Three principles of experimental design UnitTrRandTr 1A 2A 3A 4A 5B 6B 7B 8B 9C 10C 11C 12C 13D 14D 15D 16D sample 16 Tr RandTr

8 Designing experiments - keeping it simple Three principles of experimental design UnitTrRandTr 1AC 2AB 3AD 4AB 5BB 6BA 7BD 8BA 9CD 10CB 11CA 12CC 13DC 14DD 15DC 16DA sample 16 Tr RandTr

9 Designing experiments - keeping it simple Three principles of experimental design Design and analysis Replication Randomisation Degrees of freedom Valid estimate of EMS

10 Designing experiments - keeping it simple Three principles of experimental design

11 Designing experiments - keeping it simple Three principles of experimental design Design and analysis Replication Randomisation Degrees of freedom Valid estimate of EMS

12 Designing experiments - keeping it simple Three principles of experimental design Replication Randomisation Blocking

13 Designing experiments - keeping it simple Three principles of experimental design

14 Designing experiments - keeping it simple Three principles of experimental design

15 Designing experiments - keeping it simple Three principles of experimental design

16 Designing experiments - keeping it simple Three principles of experimental design Design and analysis Replication Randomisation Blocking Degrees of freedom Valid estimate of EMS Elimination

17 Designing experiments - keeping it simple Fitted values and models

18 Designing experiments - keeping it simple Fitted values and models

19 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 Designing experiments - keeping it simple Fitted values and models

20 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 16.6750 + Designing experiments - keeping it simple Fitted values and models

21 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BLOCK 16.6750 + 1 0.0417 + 2 2.3917 3 -1.4750 4 -0.9584 Designing experiments - keeping it simple Fitted values and models

22 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple Fitted values and models

23 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple So the fitted value for a plot in Block 2 planted with bean variety 6 is Fitted values and models

24 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple So the fitted value for a plot in Block 2 planted with bean variety 6 is 16.6750+ Fitted values and models

25 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple So the fitted value for a plot in Block 2 planted with bean variety 6 is 16.6750+2.3917+ Fitted values and models

26 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple So the fitted value for a plot in Block 2 planted with bean variety 6 is 16.6750+2.3917+(-6.2250) Fitted values and models

27 Term Coef Constant 16.6750 BLOCK 1 0.0417 2 2.3917 3 -1.4750 BEAN 1 5.0750 2 5.7000 3 -0.6000 4 -0.2500 5 -3.7000 BEAN 1 5.0750 BLOCK 2 5.7000 16.6750 + 1 0.0417 + 3 -0.6000 2 2.3917 4 -0.2500 3 -1.4750 5 -3.7000 4 -0.9584 6 -6.2250 Designing experiments - keeping it simple So the fitted value for a plot in Block 2 planted with bean variety 6 is 16.6750+2.3917+(-6.2250) = 12.7817 Fitted values and models

28 Designing experiments - keeping it simple Orthogonality

29 Designing experiments - keeping it simple Orthogonality

30 Designing experiments - keeping it simple Orthogonality

31 Designing experiments - keeping it simple Orthogonality

32 Designing experiments - keeping it simple Orthogonality

33 Designing experiments - keeping it simple Orthogonality

34 Designing experiments - keeping it simple Design and analysis Replication Randomisation Blocking Orthogonality Degrees of freedom Valid estimate of EMS Elimination Seq=Adj SS Orthogonality

35 Designing experiments - keeping it simple Next week: Combining continuous and categorical variables Read Chapter 6 Experiments should be designed and not just happen Think about reducing error variation and –replication: enough separate datapoints –randomisation: avoid bias and give separateness –blocking: managing the unavoidable error variation The statistical ideas we’ve been learning so far in the course help us to understand experimental design and analysis Last words…

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