Главная
Study mode:
on
1
Design of Experiments: Models Introduction
2
Design of Experiments: Projection Matrix onto c(X)
3
Design of Experiments: Projection Matrix onto c(X) Example
4
Design of Experiments: Least Square Estimator of Beta
5
Estimability (part 1/4): Necessary and Sufficient Conditions
6
Estimability (part 2/4): Unique Unbiased Estimator
7
Estimability (part 3/4): Gauss Markov Theorem
8
Estimability (part 4/4): Generating Estimable Functions
9
Design of Experiments: Estimating the Error Variance
10
1-way fixed-effects ANOVA (part 1/10): Model Development
11
1-way fixed-effects ANOVA (part 1/10): (Example) Model Development
12
1-way fixed-effects ANOVA (part 2/10): Estimating Parameters
13
1-way fixed-effects ANOVA (part 2/10): (Example) Estimating Parameters
14
1-way fixed-effects ANOVA (part 3/10): Partitioning the Sum of Squares
15
1-way fixed-effects ANOVA (part 3/10): (Example) Partitioning the Sum of Squares
16
1-way fixed-effects ANOVA (part 4/10): Sum of Squares Derivations
17
1-way fixed-effects ANOVA (part 4/10): (Example) Sum of Squares Derivations
18
1-way fixed-effects ANOVA (part 5/10): F Test and C.I.'s
19
1-way fixed-effects ANOVA (part 5/10): (Example) F Test and C.I.'s
20
1-way fixed-effects ANOVA (part 6/10): Unbalanced Case
21
1-way fixed-effects ANOVA (part 7/10): Contrasts
22
1-way fixed-effects ANOVA (part 7/10): (Example) Contrasts
23
1-way fixed-effects ANOVA (part 8/10): Contrasts with Normal Assumptions
24
1-way fixed-effects ANOVA (part 8/10): (Example) Contrasts with Normal Assumptions
25
1-way fixed-effects ANOVA (part 9/10): Orthogonal Contrasts
26
1-way fixed-effects ANOVA (part 9/10): (Example) Orthogonal Contrasts
27
1-way fixed-effects ANOVA (part 10/10): Partitioning SS(trt)
28
1-way fixed-effects ANOVA (part 10/10): (Example) Partitioning SS(trt)
29
1-way fixed-effects ANOVA (part 11/10): Residuals
30
1-way fixed-effects ANOVA (part 11/10): (Example) Residuals
31
1-way Random-Effects ANOVA(part 1/6): Model Development
32
1-way Random-Effects ANOVA(part 2/6): Distributional Properties of SS
33
1-way Random-Effects ANOVA(part 3/6): Another Proof for the Distribution for SS(trt)
34
1-way Random-Effects ANOVA(part 4/6): Variance Components Estimation
35
1-way Random-Effects ANOVA(part 5/6): F Test & C I's
36
1-way Random-Effects ANOVA(part 6/6): R Software
37
Repeated Measures 1-way fixed effects ANOVA (part 1/7): Model Development
38
Repeated Measures 1-way fixed effects ANOVA (part 2/7): Perpendicular Projection Matrices
39
Repeated Measures 1-way fixed effects ANOVA (part 3/7): Column Space of the Design Matrix
40
Repeated Measures 1-way fixed effects ANOVA (part 4/7): Partitioning the Sum of Squares
41
Repeated Measures 1-way fixed effects ANOVA (part 5/7): Distributional Properties of the SS.
42
Repeated Measures 1-way fixed effects ANOVA (part 6/7): Contrasts
43
Repeated Measures 1-way fixed effects ANOVA (part 7/7): R Software Illustrating Parts 1-6
44
Randomized Complete Blocks ANOVA (part 1/6): Model Development
45
Randomized Complete Blocks ANOVA (part 2/6): Projection Matrices and Column Spaces
46
Randomized Complete Blocks ANOVA (part 3/6): Sum of Squares and F-Test
47
Randomized Complete Blocks ANOVA (part 4/6): Estimability and Treatment Contrasts
48
Randomized Complete Blocks ANOVA (part 5/6): Random Treatment Effects
49
Randomized Complete Blocks ANOVA (part 6/6): R Software Illustration
50
The Regression Approach to ANOVA (part 1/4): Partial F Test
51
The Regression Approach to ANOVA (part 2/4): Type I, II, III, IV Sum of Squares
52
The Regression Approach to ANOVA (part 3/4): Balanced Designs
53
The Regression Approach to ANOVA (part 4/4): R Software Illustration
54
Balanced Incomplete Block Design (part 0/8): Rough Draft
55
Balanced Incomplete Block Design (part 1/8): Model Development
56
Balanced Incomplete Block Design (part 2/8): Column Spaces of the Design Matrix
57
Balanced Incomplete Block Design (part 3/8): Deriving the Least Squares Estimates
58
Balanced Incomplete Block Design (part 4/8): Sum of Squares Error and Partial F Test
59
Balanced Incomplete Block Design (part 5/8): Notation and Properties for Upcoming Contrast Videos
60
Balanced Incomplete Block Design (part 6/8): Estimability and Treatment Contrasts
61
Balanced Incomplete Block Design (part 7/8): Partitioning SS(trt) with Orthogonal Contrasts
62
Balanced Incomplete Block Design (part 8/8): R Software Illustration
63
Analysis of Covariance (part 1/9): Model Development
64
Analysis of Covariance (part 2/9): Column Spaces of the Design Matrix
65
Analysis of Covariance (part 3/9): Deriving the Least Squares Estimates
66
Analysis of Covariance (part 4/9): Sum of Squared Error and Partial F Tests
67
Analysis of Covariance (part 5/9): Estimability and Treatment Contrasts
68
Analysis of Covariance (part 6/9): Balanced 1-way fixed-effects ANOVA with 1 Covariate
69
Analysis of Covariance (part 7/9): Balanced Randomized Complete Block Design ANOVA with 1 Covariate
70
Analysis of Covariance (part 8/9): 1-way fixed-effects ANOVA w/ 1covariate
71
Analysis of Covariance (part 9/9): 2 Factor ANOVA w/ 2 covariate (NoInteraction)
72
Balanced 2 Factor Factorial Design without Interaction (part 1/7): Model Development
73
Balance 2 Factor Factorial Design without Interaction (part 2/7):Column Spaces of the Design Matrix
74
Balanced 2 Factor Factorial Design without Interaction (part 3/7): Partitioning the SS
75
Balanced 2 Factor Factorial Design without Interaction (part 4/7): Distribution of Sum of Squares
76
Balanced 2 Factor Factorial Design without Interaction (part 5/7): F Tests for Factor Effects
77
Balanced 2 Factor Factorial Design without Interaction (part 6/7): Contrasts
78
Balanced 2 Factor Factorial Design without Interaction (part 7/7): R Software Illustration
79
Balanced 2 Factor Factorial Design with Interaction (part 1/8): Model Development
80
Balanced 2 Factor Factorial Design with Interaction (part 2/8): Column Spaces of the Design Matrix
81
Balanced 2 Factor Factorial Design with Interaction (part 3/8): Partitioning the SS
82
Balanced 2 Factor Factorial Design with Interaction (part 4/8): Distribution of SS and F Tests
83
Balanced 2 Factor Factorial Design with Interaction (part 5/8): Contrasts
84
Balanced 2 Factor Factorial Design with Interaction (part 6/8): Random Effects Model
85
Balanced 2 Factor Factorial Design with Interaction (part 7/8): Random Effects Model F Tests
86
Balanced 2 Factor Factorial Design with Interaction (part 8/8): R Software Illustration
87
Hierarchical Designs (part 1/11): Model Development
88
Hierarchical Designs (part 2/11): Columns Spaces of the Design Matrix
89
Hierarchical Designs (part 3/11): Partitioning the SS
90
Hierarchical Designs (part 4/11): Distribution of SS and F Tests
91
Hierarchical Designs (part 5/11): Contrasts
92
Hierarchical Designs (part 6/11): Random Effects
93
Hierarchical Designs (part 7/11): Variance Components Estimation
94
Hierarchical Designs (part 8/11): 3 Stage Nested
95
Hierarchical Designs (part 9/11): Nested and Crossed
96
Hierarchical Designs (part 10/11): R Illustration of 2-Stage Nested Design
97
Hierarchical Designs (part 11/11): R Illustration of a Nested and Crossed Design
98
Split Plot Design (part1/10): Model Development
99
Split Plot Design (part 2/10): Design Matrix
100
Split Plot Design (part 3/10): Perpendicular Projection Matrices
101
Split Plot Design (part 4/10): Column Spaces of the Design Matrix
102
Split Plot Design (part 5/10): Best Linear Unbiased Estimate
103
Split Plot Design (part 6/10): Partitioning the Total SS
104
Split Plot Design (part 7/10): Expected SS
105
Split Plot Design (part 8/10): Distribution of SS
106
Split Plot Design (part 9/10): F Tests
107
Split Plot Design (part 10/10): R Illustration / Example
Description:
Explore an extensive 22-hour course on General Linear Models focusing on the Design of Experiments. Delve into various statistical concepts including ANOVA models, randomized complete block designs, balanced incomplete block designs, analysis of covariance, factorial designs, hierarchical designs, and split plot designs. Learn to develop models, estimate parameters, partition sum of squares, perform F-tests, analyze contrasts, and interpret results. Gain practical skills using R software for data analysis and visualization throughout the course. Master advanced statistical techniques essential for experimental design and analysis in research and industry applications.
General Linear Models - Design of Experiments
statisticsmatt
Add to list
#Mathematics
#Statistics & Probability
#Linear Regression
#Social Sciences
#Research Methods
#Experimental Design
#ANOVA
0:00 / 0:00
1 of 107