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Rescorla-Wagner Theory (1972). Organisms only learn when events violate their expectations (like Kamin's surprise hypothesis)Expectations are built up when
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1. Rescorla-Wagner (1972) Theory of Classical Conditioning
2. Rescorla-Wagner Theory (1972) Organisms only learn when events violate their expectations (like Kamin’s surprise hypothesis)
Expectations are built up when ‘significant’ events follow a stimulus complex
These expectations are only modified when consequent events disagree with the composite expectation
3. Rescorla-Wagner Theory These concepts were incorporated into a mathematical formula:
Change in the associative strength of a stimulus depends on the existing associative strength of that stimulus and all others present
If existing associative strength is low, then potential change is high; If existing associative strength is high, then very little change occurs
The speed and asymptotic level of learning is determined by the strength of the CS and UCS
4. Rescorla-Wagner Mathematical Formula ?Vcs = c (Vmax – Vall)
V = associative strength
? = change (the amount of change)
c = learning rate parameter
Vmax = the maximum amount of associative strength that the UCS can support
Vall = total amount of associative strength for all stimuli present
Vcs = associative strength to the CS
5. Before conditioning begins: Vmax = 100 (number is arbitrary & based on the strength of the UCS)
Vall = 0 (because no conditioning has occurred)
Vcs = 0 (no conditioning has occurred yet)
c = .5 (c must be a number between 0 and 1.0 and is a result of multiplying the CS intensity by the UCS intensity)
6. First Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 1 .5 * 100 - 0 = 50
7. Second Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 2 .5 * 100 - 50 = 25
8. Third Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 3 .5 * 100 - 75 = 12.5
9. 4th Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 4 .5 * 100 - 87.5 = 6.25
10. 5th Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 5 .5 * 100 - 93.75 = 3.125
11. 6th Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 6 .5 * 100 - 96.88 = 1.56
12. 7th Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 7 .5 * 100 - 98.44 = .78
13. 8th Conditioning Trial Trial c (Vmax - Vall) = ?Vcs 8 .5 * 100 - 99.22 = .39
14. 1st Extinction Trial Trial c (Vmax - Vall) = ?Vcs 1 .5 * 0 - 99.61 = -49.8
15. 2nd Extinction Trial Trial c (Vmax - Vall) = ?Vcs 2 .5 * 0 - 49.8 = -24.9
16. Extinction Trials Trial c (Vmax - Vall) = ?Vcs 3 .5 * 0 - 12.45 = -12.46
Trial c (Vmax - Vall) = ?Vcs 4 .5 * 0 - 6.23 = -6.23
Trial c (Vmax - Vall) = ?Vcs 5 .5 * 0 - 3.11 = -3.11
Trial c (Vmax - Vall) = ?Vcs 6 .5 * 0 - 1.56 = -1.56
17. Hypothetical Acquisition & Extinction Curves with c=.5 and Vmax = 100
18. Acquisition & Extinction Curves with c=.5 vs. c=.2 (Vmax = 100)
19. Theory Handles other Phenomena Overshadowing
Whenever there are multiple stimuli or a compound stimulus, then Vall = Vcs1 + Vcs2
Trial 1:
?Vnoise = .2 (100 – 0) = (.2)(100) = 20
?Vlight = .3 (100 – 0) = (.3)(100) = 30
Total Vall = current Vall + ?Vnoise + ?Vlight = 0 +20 +30 =50
Trial 2:
?Vnoise = .2 (100 – 50) = (.2)(50) = 10
?Vlight = .3 (100 – 50) = (.3)(50) = 15
Total Vall = current Vall + ?Vnoise + ?Vlight = 50+10+15=75
20. Theory Handles other Phenomena Blocking
Clearly, the first 16 trials in Phase 1 will result in most of the Vmax accruing to the first CS, leaving very little Vmax available to the second CS in Phase 2
Overexpectation Effect
When CSs trained separately (where both are close to Vmax) are then presented together you’ll actually get a decrease in associative strength
21. Rescorla-Wagner Model The theory is not perfect:
Can’t handle configural learning without a little tweaking
Can’t handle latent inhibition
But, it has been the “best” theory of Classical Conditioning
