I apologize in advance for the simplicity of this question.
My question at it's essence is "what is the correct test to run in this scenario?"
I have been collecting data of the following nature:
Insufficiently active adults (N = 116, M age=40.1±10.3 years; 78% female; M daily steps = 4854.99 ± 1332.75) were recruited in self-selected teams (N = 24) to receive a web-based intervention with gamification component (TECH+C) or without (TECH). PA and SB were measured on 7 days at baseline and after the intervention (12 weeks) using an accelerometer.
My questions that I would like answered are:
I have highlighted my analysis plan questions with how I would like to answer them. First and foremost, if anyone has any recommendations that appear better, please help me learn! Mostly, I am worried about the ANCOVA. is that appropriate here? It seems I have leveled data of the two groups split by intervention measured at two time points. However, people enrolled with sort of a “team” for the program, so we do expect there could be differences amongst these teams for PA, though less potential for sedentary time and it doesn’t seem like there are differences here… but,there were a number of these “teams” within each of the intervention conditions.
Is a HLM more appropriate here to capture the baseline and group differences? Any resources or discourse would help straighten out my mind, but I needed someone to talk to before proceeding which brought me to you bright individuals.
You don't state what your concerns are about using ANCOVA, but from what I can see, it ought to work properly.
@joebacon wrote:
My biggest concern about using ANCOVA is that there are two time points and two groups (one with the intervention and one without) but within these two groups there were "teams". How do i control for those teams that could potentionally lead to difference within the groups? Or do I just examine their means and collapse them between groups?
If you think teams have an effect, and you have the team information recorded in the data, then you add the variable that represents team into the model.
Normality will be examined and transformations will be done if needed
You say this several times, and I just want to point out that it is the residuals after the model fit that must be normally distributed. It doesn't matter whether anything else is normally distributed when you fit such a model.
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