ISSN 0439-755X
CN 11-1911/B
主办:中国心理学会
   中国科学院心理研究所
出版:科学出版社

心理学报 ›› 2008, Vol. 40 ›› Issue (08): 853-861.

• •    下一篇

热手谬误?赌徒谬误?
——随机序列知觉中近因效应的格式塔现象研究

杜秀敏;张庆林;建敏;崔茜;罗俊龙;阮小林   

  1. 西南大学心理学院认知与人格教育部重点实验室,重庆400715
  • 收稿日期:2008-01-21 修回日期:1900-01-01 发布日期:2008-08-30 出版日期:2008-08-30
  • 通讯作者: 张庆林

Hot hand fallacy or Gambler’s Fallacy?
A research on the Gestalt phenomena in random sequence recency effect

DU Xiu-Min;ZHANG Qing-Lin;ZENG Jian-Min;CUI Qian; LUO Jun-Long;RUAN Xiao-Lin   

  1. Key Laboratory of Cognition and Personality (SWU), Ministry of Education, Chongqing 400715,China
  • Received:2008-01-21 Revised:1900-01-01 Online:2008-08-30 Published:2008-08-30
  • Contact: ZHANG Qing-Lin

摘要: 通过两个实验来探讨随机序列中的近因效应。在实验1中,采用传统实验范式,让被试进行一系列的抛掷硬币结果的猜测并给予反馈,结果发现:(1)在最近连续几次硬币呈现的结果不同时,人们通常把各个结果分别作为独立的单元来看待,大部分情况下做出随机性的预期;(2)在最近连续几次硬币呈现的结果相同时,人们通常把连续几次相同的结果作为一个认知单元来看待,在最近猜测对错两种情况下分别出现了截然相反的两种近因效应。当最近1次猜对时,对下一结果的预期出现正近因效应即热手谬误,但是最近几次连续猜对时谬误减少乃至消失;当最近1次猜错时,对下一结果的预期出现负近因效应即赌徒谬误,并且最近几次连续猜错时负近因效应并未受到太大影响。实验2在实验1范式的基础上,把硬币抛掷的结果人为分组,发现被试对每一组的第一个结果做出预期时,实验1中的各种效应均消失,该现象支持关于随机序列知觉的“格式塔理论”。

关键词: 随机序列, 近因效应, 赌徒谬误, 热手谬误

Abstract: The researchers have studied the recency effect in the random sequences perception. It was thought people had two kinds of opposing expectations: the positive recency (the hot hand fallacy ) and the negative recency (the gambler’s fallacy). The existing studies focused on when the two effects would appear and how they would exchange with each other. Kahneman’s “local representativeness heuristic” (1971) was the first cognitive explanation of the recency effect. They identified the “law of small numbers”, which is the erroneous belief that properties of large samples also apply to very small samples, and the “law of small numbers” was the strategy in the predicting process. Moldoveanu and Leager (2002) tried to explain the effect with the casual model. Roney and Trick (2003) gave the Gestalt explanation. They thought that the random sequence recency involved two stages. The first one was about whether to consider the present and former outcomes as a group; when the outcomes were considered as a Gestalt, the perception entered the second stage, in which the subjects would decide the possible relationship between the present and former outcomes. However, Trick didn’t explain the dividing strategy of the random sequences. Our study aims to examine the Gestalt theory and the hypothesis that the dividing is based on the continuation of the same outcomes in the random sequences. That is, in the coin sequences, when the last outcomes are the same (all heads or all tails), the subjects would incline to consider these outcomes as a cognitive group or unit; while the last outcomes are different, they would be divided into different cognitive units. Moreover, the right/wrong sequences of the expectation make up another random binary series. The dividing of the right/wrong sequences is also based on the continuation. The outcomes of the coin and the right/wrong results are divided with the continuation strategy, and then form the different cognitive units depending on three factors--the continuation of the coin, the right/wrongness of the prediction and the continuation of the result series.
Two experiments were conducted with totally 68 sophomores; all were majored in Chinese or culture and society. All subjects had not taken the probability course. Experiment 1 used the traditional paradigm. The subjects were asked to predict the outcomes of the random binary series in a coin tosses game on computer, and were informed the results of the expectations. After each expectation they were asked to value their confident beliefs of the prediction on a 5-point Linkert scale. Experiment 2 was based on the Experiment 1, in which the outcomes were still random but manipulated by the experimenter such that the participants were told that every five trials were a group.
The results indicated: The subjects demonstrated a two-stage process involved in the recency effect. The first stage involved determining whether the present outcome was to be grouped with previous outcomes or considered as a part of a separate unit. The grouping was based on the continuation of the outcomes. If the present outcome was grouped with past ones, then a second stage occurred, one involving a decision about how the past outcomes were related to the present. When the last two outcomes were not the same, they mostly would predict the outcomes rationally; while the same outcomes continued and the last expectation was correct, the positive recency effect would appear; moreover, after several correct predictions, the fallacy diminished and even disappeared. While same outcomes continued but the last expectation was wrong, the negative recency effect would appear. But the negative recency effect was not affected remarkably by the growing wrong expectations.
Overall, this study supports the Gestalt explanation of the random sequences bias and further elaborates the dividing strategy. People first divide the trials according to the continuation of the trials, and then have different expectations. The possible strategy used in the second procedure supports the casual model and the dual-processing theory

Key words: words the random sequences, the recency effect, Gambler’s Fallacy, the hot hand fallacy

中图分类号: