Testing Hypotheses

Testing Hypotheses

Basic Research Designs • Descriptive Designs: • Descriptive Studies: thoroughly describe a single variable in order to better understand it • Correlational Studies: examine the relationships between two or more quantitative variables as they exist with no effort to manipulate them • Inferential Designs: • Quasi-Experimental Studies: make comparisons between naturally-occurring groups of individuals • Experimental Studies: make comparisons between actively manipulated groups

Chain of Reasoning in Inferential Statistics Population With Parameters Sample With Statistics Random Selection Inference Sampling Distributions Of the Statistics Probability

Inferential Reasoning • Population: group under investigation • Sample: a smaller group representing the population • A sample that has been randomly selected should be representative of the population Random Selection Inference

Hypothesis Testing • Hypothesis Testing: the process of using inferential procedures to determine whether a hypothesis is supported by the results of a research study

Hypothesis Testing • Conceptual Hypothesis: a general statement about the relationship between the independent and dependent variables • Statistical Hypothesis: a mathematical statement that can be shown to be supported or not supported. It is designed to make inferences about a population or populations.

Hypothesis Testing • In psychological research, no hypotheses can be proven to be true. • Modus Tollens: a procedure of falsification that relies on the fact that a single observation can lead to the conclusion that the premise or prior statement is incorrect • Null Hypothesis (H0):statements of equality (no relationship; no difference); statements of opposing difference • Alternative (Research) Hypothesis (H1 or HA):a statement that there is a relationship or difference between levels of a variable; statements of inequality

Types of Research Hypotheses • Nondirectional Research Hypothesis: reflects a difference between groups, but the direction of the difference is not specified (two-tailed test) • H1: X ≠ Y • Directional Research Hypothesis: reflects a difference between groups, and the direction of the difference is specified (one-tailed test) • H1: X > Y • H1: X < Y z= -1.96 µ z = 1.96 p = .025 p = .025 µ z= 1.645 p = .05

Rejecting the Null Hypothesis • Alpha Level (α): the level of significance set by the researcher. It is the confidence with which the researcher can decide to reject the null hypothesis. • Significance Level (p): the probability value used to conclude that the null hypothesis is an incorrect statement • If p > α cannot reject the null hypothesis • If p ≤ α reject the null hypothesis

Determining the Alpha Level • Type I Error (α): the researcher rejects the null hypothesis when in fact it is true; stating that an effect exists when it really does not • Type II Error (β): the researcher fails to reject a null hypothesis that should be rejected; failing to detect a treatment effect

Determining the Significance Level (Probability) • The distribution used to determine the probability of a specific score (or difference between scores) is determined by multiple factors. • Regardless of the distribution used, the logic and process used to determine probability is essentially the same. • All statistical distributions mimic the function of the standard normal distribution.

The Normal Curve • Three Main Characteristics: • Symmetrical: perfectly symmetrical about the mean; the two halves are identical • Mean = Median = Mode • Asymptotic Tail: the tails come closer and closer to the horizontal axis, but they never touch

The Normal Distribution and the Standard Deviation • In the normal distribution… • 68% of scores fall between +/-1 standard deviations • 95% of scores fall between +/-2 standard deviations • 99.7% of scores fall between +/- 3 standard deviations • It is possible to determine the probability of obtaining any given score (or any differences between scores).

The Normal Curve and Probability • The normal distribution is the most commonly used distribution in behavioral science research. • The scores of variables can be converted to standard z-scores, which can be used to determine the probability of a specific score. • All probabilities are a number between 0.0 and 1.0, and given all possible outcomes of an event, the probabilities must equal 1.0. µ z = 1.645 µ z = 1.645

z-scores • z-score: represents the distance between an observed score and the mean relative to the standard deviation; a score on an assessment expressed in standard deviation units • Formula: • z = X – M s • z = X – µ σ

More Curves and Probability µ z = 2.326 p = .01 µ z = 1.282 p = .10 z = -1.645 µ p = .05 µ z = 1.645 p = .05

Testing Hypotheses