HP 48gII User Manual

Page 18-52

Let y

i

= actual data value,

^

y

i

= a + b

⋅x

i

= least-square prediction of the data.

Then, the prediction error is: e

i

= y

i

-

^

y

i

= y

i

- (a + b

⋅x

i

).

An estimate of

σ

2

is the, so-called, standard error of the estimate,

)

1

(

2

1

2

/

)

(

)]

(

[

2

1

2

2

2

2

1

2

xy

y

xx

xy

yy

i

n

i

i

e

r

s

n

n

n

S

S

S

bx

a

y

n

s

−

⋅

⋅

−

−

=

−

−

=

+

−

−

=

∑

=

Confidence intervals and hypothesis testing in linear regression

Here are some concepts and equations related to statistical inference for
linear regression:

• Confidence limits for regression coefficients:

For the slope (

Β): b − (t

n-2,

α

/2

)

⋅s

e

/

√S

xx

<

Β < b + (t

n-2,

α

/2

)

⋅s

e

/

√S

xx

,

For the intercept (

Α):

a

− (t

n-2,

α

/2

)

⋅s

e

⋅[(1/n)+x

2

/S

xx

]

1/2

<

Α < a + (t

n-2,

α

/2

)

⋅s

e

⋅[(1/n)+x

2

/S

xx

]

1/2

,

where t follows the Student’s t distribution with

ν = n – 2, degrees of

freedom, and n represents the number of points in the sample.

• Hypothesis testing on the slope, Β:

Null hypothesis, H

0

:

Β = Β

0

, tested against the alternative hypothesis, H

1

:

Β ≠ Β

0

. The test statistic is t

0

= (b -

Β

0

)/(s

e

/

√S

xx

), where t follows the

Student’s t distribution with

ν = n – 2, degrees of freedom, and n

represents the number of points in the sample. The test is carried out as
that of a mean value hypothesis testing, i.e., given the level of
significance,

α, determine the critical value of t, t

α

/2

, then, reject H

0

if t

0

>

t

α

/2

or if t

0

< - t

α

/2

.

If you test for the value

Β

0

= 0, and it turns out that the test suggests that

you do not reject the null hypothesis, H

0

:

Β = 0, then, the validity of a

linear regression is in doubt. In other words, the sample data does not
support the assertion that

Β ≠ 0. Therefore, this is a test of the

significance of the regression model.