Inferences concerning one proportion – HP 48gII User Manual

Page 18-41

Inferences concerning one proportion

Suppose that we want to test the null hypothesis, H

0

:

p = p

0

, where p

represents the probability of obtaining a successful outcome in any given
repetition of a Bernoulli trial. To test the hypothesis, we perform n repetitions
of the experiment, and find that k successful outcomes are recorded. Thus, an
estimate of p is given by p’ = k/n.
The variance for the sample will be estimated as s

p

2

= p’(1-p’)/n = k

⋅(n-k)/n

3

.

Assume that the Z score, Z = (p-p

0

)/s

p

, follows the standard normal

distribution, i.e., Z ~ N(0,1). The particular value of the statistic to test is z

0

=

(p’-p

0

)/s

p

.

Instead of using the P-value as a criterion to accept or not accept the
hypothesis, we will use the comparison between the critical value of z0 and
the value of z corresponding to

α or α/2.

Two-tailed test
If using a two-tailed test we will find the value of z

α

/2

, from

Pr[Z> z

α

/2

] = 1-

Φ(z

α

/2

) =

α/2, or Φ(z

α

/2

) = 1-

α/2,

where

Φ(z) is the cumulative distribution function (CDF) of the standard normal

distribution (see Chapter 17).

Reject the null hypothesis, H

0

, if z

0

>z

α

/2

, or if z

0

< - z

α

/2

.

In other words, the rejection region is R = { |z

0

| > z

α

/2

}, while the

acceptance region is A = {|z

0

| < z

α

/2

}.

One-tailed test
If using a one-tailed test we will find the value of S

, from

Pr[Z> z

α

] = 1-

Φ(z

α

) =

α, or Φ(z

α

) = 1-

α,

Reject the null hypothesis, H

0

, if z

0

>z

α

, and H

1

: p>p

0

, or if z

0

< - z

α

, and H

1

:

p<p

0

.