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Determining the Independence of Variables & Variates ■ Much quantitative research compares distributions (empirical/ theoretical) ■ But are the variables/ variates independent? ■ Importance: the kind of hypothesis testing & assessment of probability related to independence ■ Comparing: – Surface area of skeletal elements collected together at a point along a river – Heart rates of individuals before/ after each climbs four flights of stairs – Opinions about a bill to tax farm effluents among adult males in a small farming community Determining the Independence of Variables & Variates ■ Key question to ask: – How reasonable is the assumption of independence in light of the null hypothesis? ■ Subsistence strategy and post-marital residence among societies that all share a “recent” common origin? ■ Opinions about an issue among people who have never associated ■ Change over a five year period in the percentage of people involved in wage labour in several communities in Mexico. Determining the Independence of Variables & Variates ■ Steps to take to figure this out: – Think about what you need to know? Become familiar with related literature surrounding an issue. – State your variable definitions and assumptions in such a way that both you and others can evaluate them – Plan your choice of statistical tests around expectations about independence or its absence* * Yes, more on these tests later Problem Statement ■ You now have: – Determining relevant problem in the literature – Articulating a clear hypothesis – Considering variables, operational definition & independence – Statistical population, samples, and sampling methods Probability ■ Descriptive & inferential stats depend on probability – And probability based on assumption of empirical/ theoretical regularities in world Theoretical Determination of Probability ■ Coin example: –With a fair coin flip, 50% chance heads, 50% tails ■ P(H)=0.5, P(T)=0.5 with summed probabilities= 1 ■ Dice example: – With fair dice, total of 36 combinations – Only one way to role a two, 1/36 = 0.03; two ways to role a three, 2/36 = 0.05, etc. – Determine all logical possibilities Empirical Determination of Probability ■ Calculate probabilities by measuring actual trials – A concern: are you characterizing a regularity that applies to relevant space and time? Complex Events & Determination of Probability ■ Deck of card example: – Individual card, 1/52, e.g., P(2♣)=0.02 – P(♣)=13/52=0.25 ■ Complex Events (more than one) : – P(♣Ŭ♠)= 13/52+13/52 = 0.50 ■ Complex Events (consecutive independent successes) – P(n events) = (event freq. / trials)n – P(♠twice in row)= (13/52)x(13/52)=0.06 The Binomial Distribution & Empirical Probabilities ■ Binomial distribution formalizes calculation of probabilities when two possible outcomes, and specific number of trials – P(p+q)n – For 3 trials: (p+q)x(p+q)x(p+q) p3 + 3p2q + 3pq2 + q3 ■ Randomly grading the labs, what is the probability that you will be the top scorer at least once over the first three labs? – 1 of 24 students – p = 0.04, q = 0.96 – Plug in p and q for terms than include at least one success = 0.12 Probabilities for Events & Probabilities for Distributions ■ Calculate probability of events under assumptions of regularity and consistency (theoretically or empirically determined) ■ Determine how likely our event is, and then interpret it accordingly. ■ However, often want to know how likely is a distribution given assumptions of regularity? ■ Or, how likely is this variate in a distribution of variates? ■ Answering these kinds of questions require a theoretical foundation in the normal distribution.
