nested and split plot designs. nested and split-plot designs these are multifactor experiments that...
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Nested and Split Plot Designs
Nested and Split-Plot Designs
These are multifactor experiments that address common economic and practical constraints encountered in experimentation with real systems.
Nested and split-plot designs frequently involve one or more random factors.
There are many variations of these designs.
Fertilizers can be applied to individual fields;Insecticides must be applied to an entire farm
from an airplane
Fertilizers can be applied to individual fields;Insecticides must be applied to an entire farm
from an airplane
Agricultural Field Trial
Investigate the yield of a new variety of crop Factors
• Insecticides• Fertilizers
Experimental Units• Farms• Fields within farms
Experimental Design ?Experimental Design ?
Agricultural Field Trial
Insecticides applied to farms One-factor ANOVA
Main effect: Insecticides MSE: Farm-to-farm
variability
Farms
Agricultural Field Trial
Fertilizers applied to fields
One-factor ANOVAMain Effect: FertilizersMSE: Field-to-field
variability
Fields
Agricultural Field Trial
Insecticides applied to farms, fertilizers to fields
Two sources of variability Insecticides subject to
farm-to-farm variability Fertilizers and
insecticides x fertilizers subject to field-to-field variability
Farms
Fields
Two-Stage Nested Design
Nested designthe levels of one factor (B) are similar to, but not identical to each other at different levels of another factor (A).
Consider a company that purchases material from three suppliers• The material comes in batches.• Is the purity of the material uniform?
Experimental design • Select four batches at random from each
supplier.• Make three purity determinations from each
batch.
Two-Stage Nested Design
Nested Design
A factor B is considered nested in another factor, A if the levels of factor B differ for different levels of factor A.
The levels of B are different for The levels of B are different for different levels of A.different levels of A.
Synonyms indicating nesting:• Depends on, different for, within, in,
each
Examples - Nested
Examples - Nested
Examples - Crossed5-1 The yield of a chemical process is being studied. The two most important variables are thought to be the pressure and the temperature. Three levels of each factor are selected, and a factorial experiment with two replicates is performed. The yield data follow:
Pressure Temperature 200 215 230
150 90.4 90.7 90.2 90.2 90.6 90.4
160 90.1 90.5 89.9 90.3 90.6 90.1
170 90.5 90.8 90.4 90.7 90.9 90.1
Examples - Crossed
5-2 An engineer suspects that the surface finish of a metal part is influenced by the feed rate and the depth of cut. She selects three feed rates and four depths of cut. She then conducts a factorial experiment and obtains the following data:
Depth of Cut (in) Feed Rate (in/min) 0.15 0.18 0.20 0.25
74 79 82 99 0.20 64 68 88 104
60 73 92 96 92 98 99 104
0.25 86 104 108 110 88 88 95 99 99 104 108 114
0.30 98 99 110 111 102 95 99 107
Examples - Nested
Two-Stage Nested DesignStatistical Model and ANOVA
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Two-Stage Nested DesignStatistical Model and ANOVA
Residual AnalysisResidual Analysis
Calculation of residuals.Calculation of residuals.
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mm-Stage Nested Design-Stage Nested Design
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m-Stage Nested Design
Test statistics depend on the type of Test statistics depend on the type of factors and the expected mean squares.factors and the expected mean squares.• Random.Random.• Fixed.Fixed.
Expected Mean SquaresExpected Mean Squares
Assume that fixtures and layouts are fixed, operators are random – gives a mixed model
(use restricted form).
Alternative Analysis
If the need detailed analysis is not available, start with multi-factor ANOVA and then combine sum of squares and degrees of freedom.
Applicable to experiments with only nested factors as well as experiments with crossed and nested factors.Sum of squares from interactions are combined with the sum of squares for a
nested factor – no interaction can be determined from the nested factor.
Alternative Analysis
Split-Plot Design
Two hierarchically nested factors,with additional crossed factors occurring within
levels of the nested factor
Two sizes of experimental units,one nested within the other, with crossed
factors applied to the smaller units
An Experiment Can Have Either of these Features
Split-Plot Design
Whole-Plot Experiment : Whole-Plot Factor = A
Level A1
Level A2
Level A2
Level A1
Split Plot DesignsAnalysis of Variance Table
Source dfWhole-Plot Analysis
Factor A a-1Whole-Plot Error a(r-1)
Split-Plot DesignSplit-Plot Design
Split-Plot Experiment : Split-Plot Factor = B
Level A1
Level A2
Level A2
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B2
B1
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Split Plot DesignsSplit Plot DesignsAnalysis of Variance TableAnalysis of Variance Table
Source dfWhole-Plot Analysis
Factor A a-1Whole-Plot Error a(r-1)
Split-Plot AnalysisFactor B b-1A x B (a-1)(b-1)Split-Plot Error a(b-1)(r-1)Total abr-1
Agricultural Field Trial
Agricultural Field TrialAgricultural Field Trial
Insecticide 2Insecticide 2
Insecticide 2
Insecticide 1 Insecticide 1
Insecticide 1
Agricultural Field TrialAgricultural Field Trial
Fert B Fert AFert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert AFert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert A
Fert AFert B Fert B
Fert B
Fert B
Fert B
Fert BFert B
Fert B
Fert BFert B
Fert B
Fert B
Fert B
Fert B
Fert B
Fert B
Fert B
Fert BFert B
Insecticide 2Insecticide 2
Insecticide 2
Insecticide 1 Insecticide 1
Insecticide 1
Agricultural Field TrialAgricultural Field Trial
Whole Plots = Farms
Split Plots = Fields
Large Experimental Units
Small Experimental Units
Agricultural Field TrialAgricultural Field Trial
Whole Plots = Farms
Split Plots = Fields
Large Experimental Units
Small Experimental Units
Whole-Plot Factor = InsecticideWhole-Plot Error = Whole-Plot Replicates
Split-Plot Factor = FertilizerSplit-Plot Error = Split-Plot Replicates
The Split-Plot Design
The split-plot is a multifactor experiment where it is not practical to completely randomize the order of the runs.
Example – paper manufacturing• Three pulp preparation methods.• Four different temperatures.• The experimenters want to use three
replicates.• How many batches of pulp are required?
The Split-Plot Design
Pulp preparation method is a hard-to-change factor.
Consider an alternate experimental design:• In replicate 1, select a pulp preparation
method, prepare a batch.• Divide the batch into four sections or samples,
and assign one of the temperature levels to each.
• Repeat for each pulp preparation method.• Conduct replicates 2 and 3 similarly.
The Split-Plot Design
Each replicate has been divided into three parts, called the whole plots.• Pulp preparation methods is the whole plot
treatment. Each whole plot has been divided into four
subplots or split-plots.• Temperature is the subplot treatment.
Generally, the hard-to-change factor is assigned to the whole plots.
This design requires 9 batches of pulp (assuming three replicates).
The Split-Plot Design
Tensile StrengthRep (Day) 1 Rep (Day) 2 Rep (Day) 3
Pulp Prep Method 1 2 3 1 2 3 1 2 3
Temperature200 30 34 29 28 31 31 31 35 32
225 35 41 26 32 36 30 37 40 34
250 37 38 33 40 42 32 41 39 39
275 36 42 36 41 40 40 40 44 45
The Split-Plot Design
There are two levels of randomization restriction.• Two levels of experimentation
Tensile StrengthRep (Day) 1 Rep (Day) 2 Rep (Day) 3
Pulp Prep Method 1 2 3 1 2 3 1 2 3
Temperature200 30 34 29 28 31 31 31 35 32
225 35 41 26 32 36 30 37 40 34
250 37 38 33 40 42 32 41 39 39
275 36 42 36 41 40 40 40 44 45
Experimental Units in Split Plot Designs
Possibilities for executing the example split plot Possibilities for executing the example split plot design.design.• Run separate replicates. Each pulp prep method (randomly Run separate replicates. Each pulp prep method (randomly
selected) is tested at four temperatures (randomly selected).selected) is tested at four temperatures (randomly selected). Large experimental unit is four pulp samples.Large experimental unit is four pulp samples. Smaller experimental unit is a an individual sample.Smaller experimental unit is a an individual sample.
• If temperature is hard to vary select a temperature at random If temperature is hard to vary select a temperature at random and then run (in random order) tests with the three pulp and then run (in random order) tests with the three pulp preparation methods.preparation methods.
Large experimental unit is three pulp samples.Large experimental unit is three pulp samples. Smaller experimental unit is a an individual sample.Smaller experimental unit is a an individual sample.Tensile Strength
Rep (Day) 1 Rep (Day) 2 Rep (Day) 3Pulp Prep Method 1 2 3 1 2 3 1 2 3
Temperature200 30 34 29 28 31 31 31 35 32
225 35 41 26 32 36 30 37 40 34
250 37 38 33 40 42 32 41 39 39
275 36 42 36 41 40 40 40 44 45
The Split-Plot Design
Another way to view a split-plot Another way to view a split-plot design is a RCBD with replication.design is a RCBD with replication.• Inferences on the blocking factor can be Inferences on the blocking factor can be
made with data from replications.made with data from replications.
The Split-Plot Design Model The Split-Plot Design Model and Statistical Analysisand Statistical Analysis
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There are two error structures; the whole-plot error and the subplot error
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