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45-733 PROBABILITY AND STATISTICS I

A SHORT GUIDE TO CONFIDENCE INTERVALS



Confidence        Sample Size           Variance          What Test 
Interval     (Type of Distribution)                         to Use

s2 known IA Z Small Sample (Normal) s2 unknown IIIA t m s2 known IA Z Large Sample (Any) s2 unknown IIA Z
s2 known IB Z Small Sample (Normal) s2 unknown IIIB t m1 - m2 s2 known IB Z Large Sample (Any) s2 unknown IIB Z
p Large Sample NA VA Z
p1 - p2 Large Sample NA VB Z
s2 Small and Large (Normal) NA IV c2


  1. Confidence Intervals for m When s2 is known

    These tests are used when the random sample is drawn from a Normal distribution with a known variance.

    1. Confidence Interval for m

      Confidence Limits

    2. Confidence Interval for the Difference Between Two Means

      In this sampling situation the variances of the two populations are known.

      Confidence Limits


  2. Large Sample Confidence Intervals for m (n ³ 30)

    When the sample size is large, the Central Limit Theorem allows us to calculate confidence intervals for any distribution using these formulas (compare these with the ones for proportions in V).

    1. Confidence Interval for m

      where

      Confidence Limits

    2. Confidence Interval for the Difference Between Two Means

      Confidence Limits

  3. Small Sample Confidence Intervals for m (n £ 29)

    These tests are used when the random sample is drawn from a Normal distribution with unknown variance.

    1. Confidence Interval for m

      where

      Confidence Limits

    2. Confidence Interval for the Difference Between Two Means

      In this sampling situation the variances of the two populations are assumed to be the same.

      where

  4. Confidence Interval For s2

    This test is used when the random sample is drawn from a Normal Distribution.

    where

    Confidence Limits and

  5. Large Sample Confidence Intervals For Proportions

    When the sample size is large, the Central Limit Theorem allows us to calculate confidence intervals for proportions (technically the random sample is drawn from a Bernoulli distribution). Recall that

    Using the Central Limit Theorem we assume that

    ~

    1. Confidence Interval for p

      Confidence Limits

    2. Confidence Interval For the Difference Between Two Proportions

      Let p1 and p2 be the two population proportions and let n and m be the sample sizes from the two populations respectively. Using the Central Limit Theorem we assume that

      ~

       

      where