HP 50g Graphing Calculator User Manual

Page 18-55

1: Covariance: 2.025

These results are interpreted as a = -0.86, b = 3.24, r

xy

= 0.989720229749,

and s

xy

= 2.025. The correlation coefficient is close enough to 1.0 to confirm

the linear trend observed in the graph.

From the

Single-var…

option of the ‚Ù menu we find:

⎯x = 3, s

x

=

0.790569415042,

⎯y = 8.86, s

y

= 2.58804945857.

Next, with n = 5, calculate

Confidence intervals for the slope (

Β) and intercept (A):

Θ First, we obtain t

n-2,

α/2

= t

3

,

0.025

= 3.18244630528 (See chapter 17 for

a program to solve for t

ν,a

):

Θ Next, we calculate the terms

(t

n-2,

α/2

)

⋅s

e

/

√S

xx

= 3.182…

⋅(0.1826…/2.5)

1/2

= 0.8602…

(t

n-2,

α/2

)

⋅s

e

⋅[(1/n)+⎯x

2

/S

xx

]

1/2

=

3.1824…

⋅√0.1826…⋅[(1/5)+3

2

/2.5]

1/2

= 2.65

Θ Finally, for the slope B, the 95% confidence interval is

(-0.86-0.860242, -0.86+0.860242) = (-1.72, -0.00024217)

For the intercept A, the 95% confidence interval is (3.24-2.6514,

3.24+2.6514) = (0.58855,5.8914).

5

.

2

42

7905694150

.

0

)

1

5

(

)

1

(

2

2

=

⋅

−

=

⋅

−

=

x

xx

s

n

S

=

−

⋅

⋅

−

−

=

)

1

(

2

1

2

2

2

xy

y

e

r

s

n

n

s

...

1826

.

0

)

...

9897

.

0

1

(

...

5880

.

2

2

5

1

5

2

2

=

−

⋅

⋅

−

−