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Population Marginal Means. Two factor model with replication. Population Marginal Means. Population Marginal Means. The above expectation depends on the design Population marginal means depend only on the unknown parameters; it is these quantities that LSMEANS estimates.
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Population Marginal Means • Two factor model with replication
Population Marginal Means • The above expectation depends on the design • Population marginal means depend only on the unknown parameters; it is these quantities that LSMEANS estimates
Missing CellsPopulation Marginal Means • Additive two factor model with replication • Example from Searle • a=2, b=2, n22=0 • Searle et al use unusual constraints—choice of constraints doesn’t affect estimators for either the observed or unobserved cell means
Missing CellsPopulation Marginal Means • Table of expectations (note that 22= 12+ 21- 11)
Missing CellsPopulation Marginal Means • Table of least squares estimates
Population Marginal Means • LSMEANS for the population marginal means: LSMEANS
Missing CellsPopulation Marginal Means • Table of expectations for the interaction model
Missing CellsEstimability • Table of least squares estimates for the interaction model • PMM(2), PMM(2), PMM(22) are also non-estimable
Missing CellsEstimability • Worksheet Example • Yandell notes that cell means in an additive model are always estimable if the design is connected • Connectedness is easy to verify in a two-way layout; difficult in other contexts.