Texas Instruments PLUS TI-89 User Manual

Appendix B: Reference Information 571

8992APPB DOC TI-89/TI-92 Plus:8992appb doc (English) Susan Gullord Revised: 02/23/01 1:54 PM Printed: 02/23/01 2:24 PM Page 571 of 34

Regression

Description

LnReg

Uses the least-squares algorithm and transformed
values ln(x) and y to fit the model equation:

y

=a+b ln(x)

Logistic

Uses the least-squares algorithm to fit the model
equation:

y=a/(1+b*

e

^(c*x))+d

MedMed

Uses the median-median line (resistant line)
technique to calculate summary points x1, y1, x2, y2,
x3, and y3, and fits the model equation:

y

=ax+b

where a is the slope and b is the y-intercept.

PowerReg

Uses the least-squares algorithm and transformed
values ln(x) and ln(y) to fit the model equation:

y=ax

b

QuadReg

Uses the least-squares algorithm to fit the second-
order polynomial:

y

=ax

2

+bx+c

For three data points, the equation is a polynomial fit;
for four or more, it is a polynomial regression. At
least three data points are required.

QuartReg

Uses the least-squares algorithm to fit the fourth-
order polynomial:

y

=ax

4

+bx

3

+cx

2

+dx+e

For five data points, the equation is a polynomial fit;
for six or more, it is a polynomial regression. At least
five data points are required.

SinReg

Uses the least-squares algorithm to fit the model
equation:

y=a sin(bx+c)+d