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Published byΑργυρις Δουρέντης Modified over 5 years ago
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No class on Wednesday 11/1 No class on Friday 11/3
Remember No class on Wednesday 11/1 No class on Friday 11/3
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Practice You recently finished giving 5 Villanova students the MMPI paranoia measure. Determine if Villanova students’ paranoia score is significantly ( = .10) different than the average paranoia of the population ( = 56.1)?
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Scores
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Step 1: Write out Hypotheses
Alternative hypothesis H1: sample = 56.1 Null hypothesis H0: sample = 56.1
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Step 2: Calculate the Critical t
N = 5 df =4 = .10 tcrit = 2.132
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Step 3: Draw Critical Region
tcrit = tcrit = 2.132
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Step 4: Calculate t observed
tobs = (X - ) / Sx
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Step 4: Calculate t observed
tobs = (X - ) / Sx Sx = S / N
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Step 4: Calculate t observed
tobs = (X - ) / Sx S = -1 Sx = S / N
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Step 4: Calculate t observed
tobs = (X - ) / Sx 276 4.21 = 15306 5 5 - 1 Sx = S / N
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Step 4: Calculate t observed
tobs = (X - ) / Sx 1.88 = 4.21/ 5
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Step 4: Calculate t observed
tobs = (X - ) / Sx -.48 = ( ) / 1.88 1.88 = 4.21/ 5
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Step 5: See if tobs falls in the critical region
tcrit = tcrit = 2.132
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Step 5: See if tobs falls in the critical region
tcrit = tcrit = 2.132 tobs = -.48
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Step 6: Decision If tobs falls in the critical region:
Reject H0, and accept H1 If tobs does not fall in the critical region: Fail to reject H0
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Step 7: Put answer into words
We fail to reject H0 The average paranoia of Villanova students not statistically different ( = .10) than the average paranoia of the population.
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One-tailed test In the examples given so far we have only examined if a sample mean is different than some value What if we want to see if the sample mean is higher or lower than some value This is called a one-tailed test
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Remember You recently finished giving 5 Villanova students the MMPI paranoia measure. Determine if Villanova students’ paranoia score is significantly ( = .10) different than the average paranoia of the population ( = 56.1)?
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Hypotheses Alternative hypothesis Null hypothesis H1: sample = 56.1
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What if. . . You recently finished giving 5 Villanova students the MMPI paranoia measure. Determine if Villanova students’ paranoia score is significantly ( = .10) lower than the average paranoia of the population ( = 56.1)?
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Hypotheses Alternative hypothesis Null hypothesis
H1: sample < 56.1 Null hypothesis H0: sample = or > 56.1
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Step 2: Calculate the Critical t
N = 5 df =4 = .10 Since this is a “one-tail” test use the one-tailed column Note: one-tail = directional test tcrit = If H1 is < then tcrit = negative If H1 is > then tcrit = positive
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Step 3: Draw Critical Region
tcrit =
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Step 4: Calculate t observed
tobs = (X - ) / Sx
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Step 4: Calculate t observed
tobs = (X - ) / Sx -.48 = ( ) / 1.88 1.88 = 4.21/ 5
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Step 5: See if tobs falls in the critical region
tcrit =
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Step 5: See if tobs falls in the critical region
tcrit = tobs = -.48
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Step 6: Decision If tobs falls in the critical region:
Reject H0, and accept H1 If tobs does not fall in the critical region: Fail to reject H0
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Step 7: Put answer into words
We fail to reject H0 The average paranoia of Villanova students is not statistically less then ( = .10) the average paranoia of the population.
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