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Statistics 2
Statistics Test 2: Hypothesis Testing
70
Mathematics
Undergraduate 3
03/28/2010

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Cards

Term
The Four Step Hypothesis Test Process
Definition

1) State Your Hypothesis

2) Set the Criteria for a Decision

3) Collect Data and Computer Sample Statistic

4) Make a Decision

Term
Null Hypothesis¹
Definition

The most important of the two hypothesis; states that the treatment has no effect.

H0

Term
The Alternative Hypothesis11
Definition

Simply states the opposite of the null hypothesis; states that the treatment DOES have an effect

H1

Term
The Alpha Level
Definition

A specific probability value that represents the low-probability samples. Common ones are .05, .01 and .001. The values that fall within these alpha levels are considered in the CRITICAL REGION

Data located in this region reject the null hypothesis

α

Term
Obtaining Critical Regions
Definition

Using the alpha level and a unit normal table you can determine where the critical regions are

x table, t table, f table

2 tail is divided by 2 (+/-) and 1 tail is not (+ or -)

Term
Z Score Formula for a Sample Mean
Definition
z= M-μ/σm
Term
Type I Error
Definition

Type I Error occurs when you reject the null hypothesis when in fact there isn't any treatment effect

Most dangerous type of error because you would move forward with a treatment that is ineffective

 

α level determines the probability of obtaining a Type I Error

Term
Type II Error
Definition

Less serious than a Type I, occurs when a researcher fails to reject the null hypothesis when the treatment really does have an effect

Type II Errors do not have a specific measurable statistics but the probability of obtaining a Type II error is represented by β

Term
Selecting Alpha Levels
Definition
A small alpha level results in less chance of a Type I Error but increases the chances of a Type 2 Error
Term
Z Test Notation
Definition

Reject Null Hypothesis: z=(?), p<.05

Fail to Reject: z=(?, p>.05

Term
Three Factors That Can Influence the Outcome of a Hypothesis Test
Definition

1) The Size of the difference between the sample mean and the original population (the numerator of the z-score)

 

2) The variability of the scores, which is measured either by the standard deviation or the variance. Variability influence the standard error in the denominator

 

3) The number of scores in the sample. This value also influence the size of the standard error

Term
Assumptions for Hypothesis Testing with Z Scores
Definition

1) Random Sampling: The sample must be representative of the population so it must be chosen at random

2) Independent Observation: The sample values must be independent of each other

3) The value of the standard deviation doesn't change

4) Normal Sampling Distribution: The unit normal table we use to find the critical regions can only be used with normal distributions

 

Term
One-Tailed Hypothesis Tests
Definition

Notation includes a greater than/less than sign and the null hypothesis includes a greater than/less than and equal to symbol such as

H1

H0≤μ

The alpha level is only found in a single tail

Also called a directional test because the researcher specifies which direction they expect the effect to occur

Term
The General Elements of Hypothesis Testing
Definition

1) Hypothesized Population Parameter (null hypothesis)

2) Sample Statistic (M or μ)

3) Estimate of Error

4) The Alpha Level

Term
Criticism of Hypothesis Testing
Definition

1) Hypothesis testing is focused on data rather than on the hypothesis

2) Statistical significance does not provide any real information about the absolute size of a treatment effect

Term
Cohen's D
Definition
μtreatment - μno treatment
Term
2 Reasons Why The Sample Mean May be Different
Definition

1) Systematic: there is a treatment effect and the sample mean probably comes from a distribution with a different population mean

 

2)Random: Sampling error - the sample mean is just different because its based on a sample and not the population

Term
Standard Error
Definition

σM= σ/√n or

s2/√n

Term

Z score Hypothesis Notation

 

Definition

Two Tailed: H1: μ = X bar, H2: μ ≠ X bar

 

Term
Sample Variance
Definition
s2= SS/df
Term
Standard Error
Definition
σxbar= √s2/n
Term
The t statistic
Definition
t = Xbar -μ/sxbar
Term
Degrees of Freedom
Definition

n-1

The greater the value of df, the better the sample variance matches the population variance

This means that df of the sample variance describes how well t represents z

Term
The Difference Between a z Distribtion and a t Distribution
Definition

A t distribution will be flatter than a z distribution. why?

 

When calculating a z score, the denominator of the equation will be the same for every sample because we are using the population variance

 

With t scores the denominator varies because we have to use the sample variance which is different for every sample

 

As df increase, the t distribution begins to look more like a normal distribution or z distribution

Term
2 Assumptions for t statistics
Definition

1) The values in the sample must consist of independent observation

2)The population sample must be normal

Term
t statistic notation
Definition
t(df)=?,p<(>).05
Term
What the notations mean
Definition

x bar is expected to approximate µ

The standard error σ sub x bar measures how well a single sample mean approximates the population mean

We quantify our inferences by using a z score

Term
Shortcomings of using a z score
Definition

the z score formula requires more info than is usually available

specifically

a z score requires that we know the VALUE OF THE POPULATION STANDARD DEVIATION σ or variance σ2

Term
When to use a t statistic
Definition
When the population variance or standard deviation are unknown we can use the sample information (ss2 and ss)
Term
How well does a t score fit the population?
Definition
You need to find out how close the sample deviation/variance is to the actual deviation/variance...so the higher the df the closer they approximate eachother
Term
Independent Measures T Info and Notation
Definition

Use when two sets of data come from two completely separate samples

This type of statistic uses special notation using subscripts to identify each sample

 

H0:  μ12=0

Term
Independent Measure T Formula
Definition

(Xbar1-Xbar2)-(μ12)/sxbar1-xbar2

 

Where μ12 always equals 0

Term
Independent Samples T Standard Error
Definition
The amount of error in a t statistic measures the amount of error expected when you use a sample mean difference to represent a population mean difference (μ1-μ2) and (Xbar1-Xbar2)
Term
The concept underlying independent t sample
Definition

Actual difference between M1 and M2/Standard differene between M1 and M2 is H0 is true

which means that a big t score proves existance of a treatment effect

Term
Estimated standard error for the sample mean
Definition
S(subXbar 1-subXbar2)= the square root of sample variance 1/n + sample variance 2/n
Term
When to use pooled variances
Definition

When the two samples are unequal (n1 does not equal n2)

 

Pooled variance is an UNBIASED statistic because it averages the two variances together, giving the correct amount of influence over the total

 

This is due to the fact that the larger sample has a large df value (this goes in the denominator of the equation) thus making the variance smaller and the calculation more accurate

Term
Independent t df
Definition
df = df1+df2 or (n-1)1+(n-2)2
Term
Independent t cohen's d
Definition

estimated mean difference/standard deviation or

Xbar1-Xbar2/the square root of the pooled variance

Term
Reporting an independent measure t
Definition
t(df)=(t stat),p<>alpha, d =
Term
3 Assumptions Underlying the Independent T Measures Formula
Definition

The observations must be independent

the two populations the samples came from must have normal distributions

the two populations must have normal variances

Also known as homogeneity of variance

Term
Hartey's F Max
Definition

Measures if the Independent Measures T sample variances meet the homogeneity of variance assumption

F Max = s2largest/s2smallest

 

If the F Max is large than the variances are different, if it is close to one than the variances are similar and the assumption is reasonable

 

Find the critical value in teh table by using k and df and alpha in the F-max table

Term
Repeated-Measure Design
Definition

Uses two sets of data obtained from one sample of individuals ex: patients scores before therapy and after therapy

Good type of study design because it removes sigma or variance

Term
Matched-Pair Design
Definition
Subjects are matched according to certain variables that are important to the test such as age gender weight IQ score etc to try to imitate a repeated measures design
Term
Related Samples t Statistic
Definition

Uses differences between scores rather than raw scores (Xbars)

There is only one sample of n individuals, they are simply measured twice

The sign of each D score tells you the direction of the change

μD is what we use to define the population

so H0: μD= 0

Term
Related Samples t Formula
Definition
MsubD-μsubD/S subMsubD
Term
S sub M of D is = s2 for Repeated Measures
Definition
Term
Reporting Repeated Measure t
Definition
t value, df, alpha level
Term
Two Assumptions for Related Sample t
Definition

1) Samples WITHIN each treatment must be independent

2)The population distribution of scores (D Values) must be normal

Term
The basic principle underlying inferential statistics is....
Definition
that samples are representative of statistics
Term
Estimation
Definition
Using statistics to estimate paramaters
Term
Point Estimate
Definition

Advantage: Very Precise

Disadvantage: Little confidence that it is correct

 

Term
Interval Estimate
Definition
Less precise but you have more confidence it is correct
Term
3 situations in which to use estimation
Definition

1) When you reject the null hypothesis..rejecting the null hypothesis says you have an effect, estimation tells you how much effect

2) You already know something has an effect but want to see how much

3) You simply want to find out more information about an unknown population

Term
Point Estimation Formula
Definition
Population mean = Sample Mean +/- 0
Term
Interval Estimate
Definition
Population Mean = Sample Mean +/- standard error
Term
Things that affect the width of the interval
Definition

1)% of confidence: the more confidence, the wider the interval

the less confidence the smaller the interval

2) A larger sample size (n) allows you to make a more precise estimate (narrower interval)

This is because n controls standard error so as n increases standard error decreases and the interval gets smaller

3)

 

Term
ANOVA
Definition

Used to test hypothesis mean differences in situations with 2 or more treatments or populations

The main advantage of ANOVA over t tests is its ability to look at 2 OR MORE

 

ANOVA can be used with both independent and repeated sample designs

Term
2 Reasons There are Differences Between Treatment Groups
Definition

1) Systematic: The treatment does have an effect and thats why they're different

2) Unsystematic, random: Individual differences account for the difference

 

When we compute between treatment we are testing for systematic differences, when we test within we are checking for unsystematic

Term
The Error Term
Definition
The denominator of the F Ratio
Term
k(g)
Definition
the number of treatment conditions
Term
n(N)
Definition

n is the number of scores in each treatment

N is the total number of scores

Term
G
Definition
Sum of all scores in a research study
Term
ANOVA Source Table
Definition

Source   SS  Df  MS    F

Between

Within

Term
ANOVA Sum of Xbar2 table
Definition

Xbar     Xbar-GM   Xbar-GM2

 

 

 

 

GM

Term
ANOVA Notation
Definition
F(df1,df2) = (f stat), p=alpha
Term
Confidence t vs z
Definition

Use the z formula when you have population paramaters

Use t when all you have is sample data

Term
Power
Definition

The power of a hypothesis test is =1-Beta (the probability of failing to reject H0

This means the probability that the test will CORRECTLY reject the null hypothesis or the probability that it will result in a type II error

 

Term
Power (2)
Definition

Power is usually calculted before a study is conducted to see if its worth while

 

Look at the expected treatmet effect and at that to mu to get what your sample mean should be. Calculate both distributions standard error

 

To know the exact power we have to determine what portion of the distribution is shaded and makes up the critical region

To find this simply multiply z(standard error)=some number

Add some number to the original mean then find where the new mean is located using the z score formula

Look up the z score and then find the correspond alpha level there is your power

Term
How Are Power and Affect Size Related
Definition

As treatment effect goes down the power goes down as well,

As effect size increases, the probability of rejected null hypothesis also increases

Term
What affects Power
Definition

1) Sample Size: Increasing sample size increases power

2)Alpha Level: Reducing the alpha level will reduce power

3)One tailed vs Two Tailed: changing from one tailed to two tailed test increases power

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