HP 49g+ User Manual

Page 18-29

The result indicates that a 95% confidence interval has been calculated. The
Critical z value shown in the screen above corresponds to the values

±z

α/2

in

the confidence interval formula (

X−z

α

/2

⋅σ/√n , X+z

α

/2

⋅σ/√n ). The values µ

Min and

µ Max are the lower and upper limits of this interval, i.e., µ Min =

X−z

α

/2

⋅σ/√n, and µ Max = X+z

α

/2

⋅σ/√n.

Press

@GRAPH to see a graphical display of the confidence interval information:

The graph shows the standard normal distribution pdf (probability density
function), the location of the critical points

±z

α/2

, the mean value (23.2) and

the corresponding interval limits (21.88424 and 24.51576). Press

@TEXT to

return to the previous results screen, and/or press

@@@OK@@@ to exit the confidence

interval environment. The results will be listed in the calculator’s display.

Example 2 -- Data from two samples (samples 1 and 2) indicate that

x

1

=

57.8 and

x

2

= 60.0. The sample sizes are n

1

= 45 and n

2

= 75. If it is

known that the populations’ standard deviations are

σ

1

= 3.2, and

σ

2

= 4.5,

determine the 90% confidence interval for the difference of the population
means, i.e.,

µ

1

-

µ

2

.

Press

‚Ù—@@@OK@@@to access the confidence interval feature in the

calculator. Press

˜@@@OK@@@ to select option 2. Z-INT: µ 1 – µ2.. Enter the

following values:

When done, press

@@@OK@@@. The results, as text and graph, are shown below: