Theory of behavioral power functions
Data in operant conditioning and psychophysics are often well fitted by functions of the form y = qxs. A simple theory derives these power functions from the simultaneous equations dx/x = a1f(z)dz and dy/y = a2f(z)dz, where z is a comparison variable that is equated for the effects of x and) y, and a1 and a2 are sensitivity parameters. In operant conditioning, x and y are identified with response rates; in psychophysics, with measures of stimulus and response. The theory can explain converging sets of power functions, solves the dimensional problems with the standard power function, and can account for the relation between Type I and Type II psychophysical scales. (64 ref) (PsycINFO Database Record (c) 2006 APA, all rights reserved). © 1978 American Psychological Association.
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- 1702 Cognitive Sciences
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Published In
DOI
ISSN
Publication Date
Volume
Issue
Start / End Page
Related Subject Headings
- Experimental Psychology
- 52 Psychology
- 1702 Cognitive Sciences
- 1701 Psychology