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Numerate decision makers don’t use more effortful strategies unless it pays: A process tracing investigation of skilled and adaptive strategy selection in risky decision making

Published online by Cambridge University Press:  01 January 2023

Jakub Traczyk*
Affiliation:
Wroclaw Faculty of Psychology, SWPS University of Social Sciences and Humanities, Wroclaw, Poland
Agata Sobkow
Affiliation:
Wroclaw Faculty of Psychology, SWPS University of Social Sciences and Humanities, Wroclaw, Poland
Kamil Fulawka
Affiliation:
Wroclaw Faculty of Psychology, SWPS University of Social Sciences and Humanities, Wroclaw, Poland
Jakub Kus
Affiliation:
Wroclaw Faculty of Psychology, SWPS University of Social Sciences and Humanities, Wroclaw, Poland
Dafina Petrova
Affiliation:
Andalusian School of Public Health (EASP), Granada, Spain. Medical Research Institute ibs.GRANADA, University Hospitals of Granada/University of Granada, Granada, Spain
Rocio Garcia-Retamero
Affiliation:
Mind, Brain, and Behavior Research Center, University of Granada, Spain; Harding Center for Risk Literacy, Max Planck Institute for Human Development, Berlin, Germany
*
*Corresponding author Email: [email protected].
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Abstract

The present study investigated skilled and adaptive strategy selection in risky decision making. We proposed that people with high objective numeracy, a strong predictor of general decision making skill, would have a broad repertoire of choice strategies andadaptively select these strategies depending on the importance of the decision. Thus more objectively numerate people would maximize their effort (e.g., invest more time) in important, high-payoff decisions and switch to a simple, fast heuristic strategy in trivial decisions. Subjective numeracy would, by contrast, be more closely related to interest in problem solving for its own sake and would not yield such an effect of importance. Participants made twelve high-payoff choices and twelve low-payoff choices in binary two-outcome gambles framed as gains. We measured objective and subjective numeracy using standard measures. Results showed that people with high subjective numeracy generally maximized the expected value (EV) in all decisions. In contrast, participants with high objective numeracy maximized EV only when choice problems were meaningful (i.e., they could result in high payoffs). When choice problems were trivial (i.e., choosing the normatively better option would not result in a large payoff), more objectively numerate participants made choices consistent with faster, more frugal heuristic strategies.

Type
Research Article
Creative Commons
Creative Common License - CCCreative Common License - 3.0
The authors license this article under the terms of the Creative Commons Attribution 3.0 License
Copyright
Copyright © The Authors [2018] This is an Open Access article, distributed under the terms of the Creative Commons Attribution license (http://creativecommons.org/licenses/by/3.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.

1 Introduction

In real-life financial situations, people use various choice strategies and decision rules to deal with problems that involve processing of outcomes and probabilities. For instance, if we use the expected value (EV) maximization principle as a model of rational behavior under risk, the decision regarding whether or not to buy a lottery ticket for 3 EUR with a probability of winning a one-million main prize at 0.0000072%, should be preceded by optimization analyses that include calculations comparing EV of the bet (i.e., +0.072 EUR) with the certain loss of −3 EUR. However, comprehensive optimization is almost impossible in the majority of everyday decision problems, as they are usually very complex, dynamic and uncertain (people do not know every possible alternative, precise values of probabilities, etc.). Furthermore, apart from material and accountable consequences (e.g., money), people also attach value to other resources such as their effort and time spent on making a decision.

Many studies have reported that people with greater numerical abilities are more likely to make better choices in similar problems, that is, decisions more consistent with EV maximization (Reference Cokely, Feltz, Ghazal, Allan, Petrova, Garcia-Retamero, Ericsson, Hoffman, Kozbelt and WilliamsCokely et al., 2018; Reference Pachur and GalesicPachur & Galesic, 2013; Reference Jasper, Bhattacharya, Levin, Jones and BossardJasper, Bhattacharya, Levin, Jones & Bossard, 2013; Reference Peters and BjalkebringPeters & Bjalkebring, 2015). Nonetheless, there is compelling evidence that superior decisions in more numerate people do not simply result from complex computations of EVs but rather they are driven by exhaustive considerations of multiple aspects of the problem (i.e., elaborate heuristic processing, Reference Cokely and KelleyCokely & Kelley, 2009; Reference Ghazal, Cokely and Garcia-RetameroGhazal, Cokely & Garcia-Retamero, 2014; Reference Jasper, Bhattacharya and CorserJasper, Bhattacharya & Corser, 2017). The ability to understand and use statistical and probability information) is also related to superior decision making in both health and financial domains (Reference Galesic and Garcia-RetameroGalesic & Garcia-Retamero, 2011; Reference Garcia-Retamero, Andrade, Sharit and RuizGarcia-Retamero, Andrade, Sharit & Ruiz, 2015; Reference Ghazal, Cokely and Garcia-RetameroGhazal et al., 2014, 2014; Reference Reyna, Brnst-Renck, Anderson and SchulkinReyna & Brnst-Renck, 2014) and is associated with greater personal wealth in general (Reference Estrada-Mejia, de Vries and ZeelenbergEstrada-Mejia, de Vries & Zeelenberg, 2016). However, the question of how people with high numeracy arrive at better decisions seems to be complex.

Researchers argue that more (objectively) numerate individuals have better understanding of the gist of decisions (Reference Reyna, Nelson, Han and DieckmannReyna, Nelson, Han & Dieckmann, 2009), deliberatively employ metacognitive heuristics (Reference Garcia-Retamero, Cokely and HoffrageGarcia-Retamero, Cokely & Hoffrage, 2015; Reference Ghazal, Cokely and Garcia-RetameroGhazal et al., 2014), draw precise affective meaning from numbers (Reference PetersPeters, 2012; Reference Peters, Vastfjall, Slovic, Mertz, Mazzocco and DickertPeters et al., 2006), and are more likely to conduct explicit number operations (Reference Peters and BjalkebringPeters & Bjalkebring, 2015). Higher numeracy is also related to more exact mental number-line mapping (Reference Schley and PetersSchley & Peters, 2014) and more linear transformations of objective numbers (Reference Millroth and JuslinMillroth & Juslin, 2015), resulting in less pronounced distortions in processing outcomes and probabilities (Reference Patalano, Saltiel, Machlin and BarthPatalano, Saltiel, Machlin & Barth, 2015), although other results raise questions about this conclusion (Reference Peters, Vastfjall, Slovic, Mertz, Mazzocco and DickertPeters et al., 2006). Furthermore, people with higher objective numeracy seem to be less prone to affective influences during decision making (e.g., Reference Petrova, van der Pligt and Garcia-RetameroPetrova, van der Pligt & Garcia-Retamero, 2014; Reference Traczyk and FulawkaTraczyk & Fulawka, 2016; Reference Traczyk, Lenda, Serek, Fulawka, Tomczak, Strizyk, Polec, Zjawiony and SobkowTraczyk et al., 2018).

A question posed here is whether those with higher objective numeracy are more inclined to adaptively change choice strategy depending on the task requirements. Do they allocate their time and effort in proportion to the importance of decisions? In particular, we investigated how the structure of the environment (operationalized as the difference in the magnitudes of expected payoffs) influences strategy selection under risk and what is the role of numeracy in this process. The present study thus investigated whether highly numerate individuals always engage more time and effort to compute EV, or rather adaptively select their choice strategy depending on the task and environment (Reference Jasper, Bhattacharya, Levin, Jones and BossardJasper et al., 2013).

Additionally, we examined the relative contribution of objective (i.e., inferred from the numerical task performance) and subjective (i.e., declared preference for numbers and number-related operations) numeracy in predicting choices. Although a measure of subjective numeracy has been shown to be a good proxy for objective numeracy (e.g., it predicts performance in numerical tasks; Reference Fagerlin, Zikmund-Fisher, Ubel, Jankovic, Derry and SmithFagerlin et al., 2007) and some researchers use objective and subjective numeracy scales interchangeably (Reference Zikmund-Fisher, Smith, Ubel and FagerlinZikmund-Fisher, Smith, Ubel & Fagerlin, 2007), other studies have demonstrated that these tests measure different traits (Reference Anderson, Obrecht, Chapman, Driscoll and SchulkinAnderson, Obrecht, Chapman, Driscoll & Schulkin, 2011; Reference Miron-Shatz, Hanoch, Doniger, Omer and OzanneMiron-Shatz, Hanoch, Doniger, Omer & Ozanne, 2014; Reference Peters and BjalkebringPeters & Bjalkebring, 2015; Reference Petrova, Garcia-Retamero, Catena, Cokely, Heredia Carrasco, Arrebola Moreno and Ramírez HernándezPetrova et al., 2017). For instance, subjective numeracy predicts perceptions of health, whereas objective numeracy predicts actual health in patients (Reference Garcia-Retamero, Cokely and HoffrageGarcia-Retamero et al. 2015). Taking this into account, in the present study we measured both subjective and objective numeracy to examine their relative contribution to choice.

1.1 Research problem and hypothesis

In this study, we ask whether people with high objective numeracy adapt their effort to the importance of the decision, or whether they simply make better decisions regardless of the importance of the decision. On the one hand, more numerate subjects are likely to make more normatively superior choices in financial problems as a result of greater deliberation during decision making (Reference Ghazal, Cokely and Garcia-RetameroGhazal et al., 2014). This effect can be presumably attributed to the elaborative heuristic search posited by Reference Cokely and KelleyCokely and Kelley (2009) — a larger number of simple considerations as well as better understanding of formal operations with numbers. On the other hand, more numerate subjects could also strategically allocate deliberation time and use different choice strategies depending on the importance of a decision, quantified here by the EV ratio between gambles. That is, people high in numeracy would maximize their effort (e.g., invest more time and deliberation) when the decision really matters (i.e., when differences between expected payoffs are large), but when the decision is trivial (i.e., when differences between expected payoffs are small) they would switch to a simple and fast heuristic strategy.

Prior research suggests two potential outcomes. Firstly, in the case of trivial choice problems, more numerate individuals would behave similarly as in meaningful problems. That is, they will deliberate more on the problem, leading to more of their choices being consistent with EV (Reference Ghazal, Cokely and Garcia-RetameroGhazal et al., 2014; Reference Jasper, Bhattacharya and CorserJasper et al., 2017). Secondly, because of the adaptive sensitivity to changes in EV that is exhibited by more numerate people (Reference Jasper, Bhattacharya, Levin, Jones and BossardJasper et al., 2013), their ability to get the gist of numbers (Reference Reyna, Nelson, Han and DieckmannReyna et al., 2009) and to employ heuristic processing (Reference Cokely and KelleyCokely & Kelley, 2009), they are expected to switch to a faster heuristic-based strategy as it provides comparable performance in case of decisions that seem trivial (i.e., low-payoff gambles with similar EVs).

2 Method

2.1 Subjects

One hundred and thirty-nine volunteers from the general population (age range: 18–58 years; M age = 29.21; SD = 8.57; 52% female) participated in an online study for a 30 PLN (Polish Zloty) compensation (equivalent to approximately 8 EUR).Footnote 1 Subjects were recruited via an advertisement published on a local webpage. Subjects received explicit information stating that the study examined cognitive abilities and were assured that payment was not related to their performance. Volunteers gave informed consent before the study.

2.2 Design and materials

The study was designed to investigate the relationship between numeracy and choices under risk. We measured both subjective and objective numeracy as main predictors in this study as well as fluid intelligence and need for cognition. We also introduced a within-subjects manipulation of choice payoff (i.e., 12 low-payoff vs. 12 high-payoff binary two-outcome choice problems). The dependent variable was subjects’ choices in these problems. Response latencies in each problem were used to operationalize deliberation time and enhance our understanding of the cognitive processes underlying decision making.

Subjects completed the following measures:

2.2.1 The Berlin Numeracy Test

The Berlin Numeracy Test (BNT; Reference Cokely, Galesic, Schulz, Ghazal and Garcia-RetameroCokely, Galesic, Schulz, Ghazal & Garcia-Retamero, 2012) is a psychometric instrument that measures statistical numeracy, risk literacy and comprehension of the concept of probability. The BNT is widely used as an efficient research tool to measure objective numerical abilities (Reference Cokely, Galesic, Schulz, Ghazal and Garcia-RetameroCokely et al., 2012). In the current study, we used a computerized version of the BNT consisting of four items presented to subjects in a fixed order. Subjects were not forced to provide any response to complete the items.

2.2.2 The Subjective Numeracy Scale

Subjects completed the Subjective Numeracy Scale (SNS; Reference Fagerlin, Zikmund-Fisher, Ubel, Jankovic, Derry and SmithFagerlin et al., 2007), an 8-item self-assessment scale that measures subjective numeracy and includes two subscales referring to perceived numerical abilities (e.g., “How good are you at working with percentages?”) and preference for numerical and statistical information (e.g., “How often do you find numerical information to be useful?”). Subjects completed the SNS by answering each question using a 6-point scale.

2.2.3 The Need for Cognition Scale

Individual differences in epistemic motivation were assessed using the Need for Cognition Scale (NCS; Reference Cacioppo and PettyCacioppo & Petty, 1982). The Polish adaptation of the scale (Reference Matusz, Traczyk and GasiorowskaMatusz, Traczyk & Gąsiorowska, 2011) includes 36 items and measures “the tendency for an individual to engage in and enjoy thinking” (Reference Cacioppo and PettyCacioppo & Petty, 1982, p. 116). The main goal of the NCS is to assess the individual’s level of joy and satisfaction emerging from the processes of thinking, resolving problems, learning new things, etc. Subjects used a 5-point scale to indicate the extent they agree with each statement (e.g., “Thinking is not my idea of fun”).

2.2.4 The Raven’s Advanced Progressive Matrices

To measure individual differences in fluid intelligence we used the Raven’s Advanced Progressive Matrices test (RAPM; Reference RavenRaven, 2000). The RAPM is a nonverbal test that is typically employed to assess basic cognitive functioning such as abstract reasoning. Problems included in this test are presented in the form of matrices (e.g., 3 x 3 elements) with one missing piece. The task is to figure out the rule underlying the uncovered elements and select the missing element that satisfies the appropriate rule. In the present study, we used a short form of the RAPM consisting of two training and six test matrices displayed with ascending difficulty.

2.2.5 Choice problems

We used twenty-four binary choice problems consisting of two-outcome gambles from a study by Reference Pachur, Hertwig, Gigerenzer and tterPachur, Hertwig, Gigerenzer and Brandstätter (2013, Experiment 2). The outcomes of the choice problems were framed as gains. Choice problems differed in their EV ratios (Table 1), which we used to define high- and low-payoff problems. If the EVs of two gambles were similar (dividing their EVs led to outcomes around 1), then we classified them as low-payoff problems in comparison to high-payoff problems in which the EVs of the two gambles differed substantially (dividing their EVs led to outcomes between 5 and 6). In other words, low-payoff problems (with EVs ratios around 1) can be regarded as trivial, because playing them repeatedly would lead to relatively small differences in payoffs irrespective of the chosen gamble (i.e., it does not really matter which option you should select, because in the long-run a decision maker would get a similar payoff). In contrast, high-payoff problems (with EVs ratios between 5 and 6) are more meaningful, because their EVs differ and choosing the gamble with the higher EV will lead to much higher payoffs (i.e., it pays to choose the gamble with higher EV because differences in payoffs are large in the long run).

Table 1: Twelve low-payoff (with EV ratios around 1) and twelve high-payoff (with EV ratios between 5 and 6) binary choice problems consisting of two-outcome gambles in the gain domain. The priority heuristic (PH) and cumulative prospect theory (CPT) predicted opposite choices. Each problem met criteria of nondominance.

CPT and EV were always consistent in their choice predictions in these problems.

The problems were generated in such a way that two competing models of choice under risk — the priority heuristic (PH; Reference Brandstätter, Gigerenzer and HertwigBrandstätter, Gigerenzer & Hertwig, 2006) and cumulative prospect theory (CPT; Reference Tversky and KahnemanTversky & Kahneman, 1992) — always led to different predictions on choice. According to CPT, a decision-maker multiplicatively combines the subjectively transformed outcomes and their weighed probabilities to arrive at an overall value of a gamble. Next, a gamble with a higher value is chosen. In contrast, the PH posits that a decision maker relies on a series of sequential steps aimed at comparing gambles according to their minimum gains, the probabilities of these minimum gains, and the maximum gains (in fixed order). The sequence of comparative operations is stopped resulting in a choice when the difference between minimum (maximum) gains is larger than 10% of the minimum (maximum) gain, or if the difference in probabilities of minimum gains is larger than 10% of the probability scale (Table 2).

Table 2: An example of cognitive operations and choice predictions according to cumulative prospect theory (CPT) and priority heuristic (PH).

CPT and EV were always consistent in their choice predictions in these problems.

Let us illustrate the difference between CPT and PH in the following two gambles presented in the first row of Table 1, (Gamble A: 5.40, 0.29; 0, 0.71 and Gamble B: 9.70, 0.17; 0, 0.83). PH predicts that a decision maker will choose Gamble A because the difference in minimum gain probabilities is larger than 10% of the probability scale (i.e., 0.71 vs. 0.83). In contrast, CPT with standard parameters from Reference Tversky and KahnemanTversky and Kahneman (1992) predicts that a decision maker will choose Gamble B because of its greater CPT value (i.e., 1.38 vs. 1.78).

The choice of CPT and PH for assessing the gambles is not meant to imply that subjects conform to either theory. Rather it was intended to reflect the difference between simple heuristics and more compensatory approaches to decision making. In general, we expect CPT predictions to be the same as EV predictions.

2.3 Procedure

Subjects were instructed that they should complete the procedure individually during one session. Subjects also confirmed that they would focus on the task at hand and turn off other applications/music that could distract their attention. In reference to the BNT they were informed that they were not allowed to use calculators, but they could take notes on paper.

Tasks were administered with the InquisitWeb (2016) software and ran in pseudorandom order. Text was displayed in a black font on a light gray background. All subjects started by reading instructions and completing a demographic survey. They then completed a block of tasks including the BNT, RAPM, and choice problems (presented in random order), followed by another block which included the self-report measures of SNS and NCS (also presented in random order). Additionally, twelve low- and twelve high-payoff choice problems were mixed and presented to each subject in a different random order. At the end of the study, subjects declared whether we could include their data in the analyses. The entire procedure took approximately 40 minutes (although there were no time constraints). There was no immediate feedback regarding performance. However, after the study, subjects received information on their results in comparison to average scores calculated from the study sample.

3 Results

Descriptive statistics for the measures used in the study and the correlations between them are presented in Table 3 and Table 4 respectively. Higher scores in the BNT, SNS, and RAPM as well as longer deliberation time were correlated with more choices consistent with CPT/EV in high-payoff problems. In low-payoff problems, only SNS and NCS, but not BNT or RAPM were positively correlated with CPT/EV-consistent choices. Of interest is the large difference between objective and subjective numeracy in predicting choices in low-payoff problems. In high-payoff problems, both objective and subjective numeracy strongly predicted CPT/EV choices, explaining almost twice as much variance as RAPM or NCS.

Table 3: Descriptive statistics for measures used in the study. BNT – the Berlin Numeracy Test, NCS – the Need for Cognition Scale, RAPM – the Raven’s Advanced Progressive Matrices, SNS – the Subjective Numeracy Scale. CPT/EV-consistent choices in low- and high-payoff problems refer to the number of expected value choices in these problems.

Table 4: Pearson zero-order correlation coefficients for the relationships between measures used in the study. CPT/EV-consistent choices in low- and high-payoff problems refer to the number of expected value choices in these problems. BNT – the Berlin Numeracy Test, NCS – the Need for Cognition Scale, RAPM – the Raven’s Advanced Progressive Matrices, SNS – the Subjective Numeracy Scale. Deliberation time is log-transformed median choice latency.

* p < .05,

** p < .01,

*** p < .001.

Figure 1 shows the different roles of subjective and objective numeracy by plotting a proportion of CPT/EV choices as a function of numeracy for high- and low-payoff conditions, for both subjective and objective numeracy. Note that the CPT/EV choice proportion increases with subjective numeracy for both payoff conditions, but the choice proportion increases with objective numeracy only for the high-payoff condition. Thus, higher objective numeracy (BNT) appears to lead to greater sensitivity to payoffs (greater difference between top and bottom lines in Figure 1).

Figure 1: Proportion of choices consistent with expected value (CPT/EV) as a function of payoff (high/low, dashed lines are high) and numeracy (subjective in dark blue, objective in orange). Subjective numeracy (SNS) scores are displayed in quintiles (as equal as possible), so that the number of subjects in each point — represented by the area of each point — are roughly comparable to those for objective numeracy.

To ask whether subjective and objective numeracy predict different aspects of performance, we calculated the mean proportion of CPT/EV-consistent choices for each subject and the difference between high- and low-payoff conditions in CPT/EV-consistent choices, to assess sensitivity to payoff.

Next, we asked whether these two components, CPT/EV choices and payoff sensitivity, were differentially affected by measures of individual differences used in the study. To do this, we used canonical correlation (fit by the R package yacca: Butts, 2012). The idea is to find a linear combination of the “X” variables (BNT, SNS, RAPM, NCS) that correlate with a linear combination of the “Y” variables (CPT/EV choices and payoff sensitivity), optimizing the weights for the two combinations so as to get the highest correlation. Then (in essence) repeat the process on the residuals, to see if a different pattern of weights can account for additional variance (here we can have only two of these canonical variates because we have only two Y variables). Table 5 shows the loadings (analogous to factor loadings) on the two canonical variates.

Table 5: Loadings on canonical variates (pairs of linear combinations of X and Y variables), CV1 and CV2.

The top half of Table 5 shows the weights for all four X variables. The two objective X variables (BNT and RAPM) load mostly on CV1, which is most strongly related to Payoff-sensitivity, while the two subjective X variables (SNS and NCS) load on CV2, which is related to CPT/EV choices. The bottom half shows similar results using only the two numeracy measures as X variables. For both of these analyses (with four and two X variables), the second canonical variate was significant (p = .0024 and p = .0004, respectively, by Bartlett’s χ2 test), indicating that the second canonical variate accounted for significant variance. Thus, the results cannot be explained in terms of a single underlying factor affecting all X and Y variables.

Finally, we investigated the relationships among payoff, choices and response times. Log response times were slower for the low-payoff condition, presumably because the decision was more difficult, and slower for the choice of the better option (CPT/EV-consistent choice), presumably because the choice was made after more thought. The latter effect was greater in the low-payoff condition.Footnote 2 Means (in msec, derived from the mean logs) were: 3631 for high payoff, CPT/EV choice; 3280 for high payoff, PH choice; 6542 for low payoff, CPT/EV choice; and 3364 for low payoff, PH choice. Mean log response times increased with both BNT (r=.32, p<.001) and SNS (r=.25, p=.003), but the two measures of numeracy did not differ significantly in any analysis, and, if anything, show effects opposite to those that might be expected given other results. Likewise, the two correlations did not differ for just the low-payoff condition (r=.33, p<.001 for BNT, r=.30, p=.001 for SNS; calculated with logs taken before averaging).

4 Discussion

In the present study, we demonstrated that more statistically numerate decision makers are able to strategically invest sufficient deliberation to make adaptive choices. When decisions really mattered and could result in high payoffs, people with high objective numeracy made normatively better choices predicted by CPT and EV. However, when decisions were trivial and did not matter because the payoffs of the available options were similar, those with high objective numeracy made choices predicted by a heuristic strategy (i.e., PH). These PH-consistent choices were also “better”, because they resulted in getting an equally good payoff without wasting additional time and effort that could be of more value than the negligible difference in payoff earned by selecting the CPT/EV-consistent option.

At first glance, it may seem counterintuitive that those with high objective numeracy did not always maximize EV. However, after deeper consideration, we can conclude that decision makers with high objective numeracy exhibited adaptive rationality as they tried to maximize payoffs when choice problems were meaningful and, at the same time, minimized effort when choice problems were trivial. What is a potential cognitive mechanism underlying these effects?

Accordingly, our findings are a straightforward demonstration that more numerate subjects adaptively selected their choice strategy on more important choices. Nevertheless, it is not clear whether they performed EV-like computations (i.e., multiplying outcomes and probabilities) or rather used sophisticated heuristic processing (i.e., transforming and comparing probabilities and outcomes, reframing the problem, and so forth). Although the choice problems we used in our study clearly distinguish between two choice models, the lack of more sophisticated process-tracing measures (e.g., eye tracking) does not allow us to conclude that subjects processed gambles accordingly. For instance, Reference Cokely and KelleyCokely and Kelley (2009) demonstrated that choices consistent with EV rarely resulted from EV computations but they were driven by elaborative heuristic processing instead. Moreover, Reference Pachur and GalesicPachur et al. (2013) also demonstrated that using simple heuristics (e.g., the equiprobable heuristic, the equal-weight heuristic, or the better-than-average heuristic, Brandstätter et al., 2006) can lead to the same choices as those predicted by CPT or EV models. Indeed, Reference Pachur and GalesicPachur et al. (2013) documented that these trade-off heuristics reveled the same performance as CPT in problems with both similar and different EV ratios, but at the same time lead to the opposite predictions to PH. Therefore, different cognitive processes from those posited by CPT/EV can be responsible for CPT/EV-consistent choices. This research problem can be addressed in future studies using process-tracing measures like think-aloud protocols or Mouselab-type methods in order to reveal the underlying cognitive process.

4.1 The role of subjective and objective numeracy

Apart from a measure of objective numeracy, we also used scales measuring subjective numeracy as well as need for cognition and fluid intelligence. These measures were related to choices. In particular, SNS was associated with more CPT/EV choices in both low and high payoff problems. NCS correlated with choices in low-payoff problems, and RAPM was positively related to more choices that maximized EV in high-payoff problems. While objective numeracy was a marker of adaptive strategy selection, SNS was a persistent marker of CPT/EV choices. These results are in line with recent advances in numeracy theory and they show that objective and subjective numeracy (although often used interchangeably) map different numerical competencies, consequently eliciting different implications for decisions (Reference Peters and BjalkebringPeters & Bjalkebring, 2015). Objective numeracy has been more strongly linked to number comparisons, operations, and calculations. Subjective numeracy, on the other hand, has been primarily linked to emotional reactions to numbers, preference for them as well as motivation and confidence in numeric tasks (Reference Peters and BjalkebringPeters & Bjalkebring, 2015). This differentiation allows for qualitatively different predictions for subjective and objective numeracy that can help understand the role of these constructs in risky choices.

In light of our findings, it seems that objective numeracy is a marker of adaptive and meta-cognitive strategy selection related to numerical processing. Consistent with previous research (Reference Ghazal, Cokely and Garcia-RetameroGhazal et al., 2014; Reference Petrova, Garcia-Retamero, Catena and van der PligtPetrova, Garcia-Retamero, Catena & van der Pligt, 2016), subjects with higher objective numeracy spent more time deliberating on problems, but they were also able to switch to a faster strategy when choice problems became more trivial (i.e., the differences in payoffs were small).

Higher subjective numeracy was related to EV maximization processes irrespectively of the problem payoff. Subjective numeracy may, in a sense, indicate additional utility from trying to solve a problem. If so, subjects with high subjective numeracy would be less sensitive to the lack of extrinsic reward. They may have simply found the task interesting enough so that they tried to find the best option even when it was clear that the two options did not differ much in their expected outcomes.

4.2 Conclusions

To summarize, we demonstrated that subjective and objective numeracy play different roles in choices under risk. While people with high subjective numeracy tried to maximize every decision irrespectively of its payoff, objectively numerate, skilled decision makers did not waste extra time thinking harder and longer about trivial problems. Importantly, these people were able to assess which problem is meaningful and adapt their choice strategy to maximize payoff.

Footnotes

The research in this article was supported by the National Science Centre, Poland under grant 2015/17/D/HS6/00703 and the Foundation for Polish Science (FNP) under grant START (111.2016). The current research was also partially funded by the Ministerio de Economía y Competitividad (Spain) (PSI2014-51842-R). Dafina Petrova is supported by a Juan de la Cierva Fellowship (FJCI-2016-28279) from the Spanish Ministry of Economy, Industry, and Competitiveness.

1 One hundred and thirty-three subjects completed all tasks.

2 These effects were tested with a multi-level model with subjects and choices as crossed random effects. All effects, including the interaction, had 95% confidence intervals that excluded zero. The use of such a model was necessary because subjects differed in the number of choices of the better option in the two payoff conditions, so that choice and payoff were not orthogonal.

References

Anderson, B. L., Obrecht, N. A., Chapman, G. B., Driscoll, D. A., & Schulkin, J. (2011). Physicians communication of Down syndrome screening test results: The influence of physician numeracy. Genetics in Medicine, 13(8), 744749. http://doi.org/10.1097/GIM.0b013e31821a370f.CrossRefGoogle ScholarPubMed
Brandstätter, E., Gigerenzer, G., & Hertwig, R. (2006). The priority heuristic: making choices without trade-offs. Psychological Review, 113 (2), 409432. http://doi.org/10.1037/0033-295X.113.2.409CrossRefGoogle ScholarPubMed
Butts, C. T. (2012). yacca: Yet another canonical correlation analysis package. R package version 1.1. https://CRAN.R-project.org/package=yacca.Google Scholar
Cacioppo, J. T., & Petty, R. E. (1982). The need for cognition. Journal of Personality and Social Psychology, 42(1), 116131.CrossRefGoogle Scholar
Cokely, E. T., Feltz, A., Ghazal, S., Allan, J. N., Petrova, D., & Garcia-Retamero, R. (2018). Skilled decision theory: From intelligence to numeracy and expertise. In Ericsson, K. A., Hoffman, R. R., Kozbelt, A., & Williams, A. M. (Eds.), The Cambridge Handbook of Expertise and Expert Performance (2nd ed.), pp. 476505. New York, NY: Cambridge University Press.CrossRefGoogle Scholar
Cokely, E. T., Galesic, M., Schulz, E., Ghazal, S., & Garcia-Retamero, R. (2012). Measuring risk literacy: The Berlin numeracy test. Judgment and Decision Making, 7(1), 2547. http://journal.sjdm.org/11/11808/jdm11808.pdf.CrossRefGoogle Scholar
Cokely, E. T., & Kelley, C. M. (2009). Cognitive abilities and superior decision making under risk A protocol analysis and process model evaluation. Judgment and Decision Making, 4(1), 2033. http://journal.sjdm.org/81125/jdm81125.pdf.CrossRefGoogle Scholar
Estrada-Mejia, C., de Vries, M., & Zeelenberg, M. (2016). Numeracy and wealth. Journal of Economic Psychology, 54, 5363. http://doi.org/10.1016/j.joep.2016.02.011.CrossRefGoogle Scholar
Fagerlin, A., Zikmund-Fisher, B. J., Ubel, P. A, Jankovic, A., Derry, H. A, & Smith, D. M. (2007). Measuring numeracy without a math test: development of the Subjective Numeracy Scale. Medical Decision Making, 27(5), 672680. http://doi.org/10.1177/0272989X07304449.CrossRefGoogle ScholarPubMed
Galesic, M., & Garcia-Retamero, R. (2011). Communicating consequences of risky behaviors: Life expectancy versus risk of disease. Patient Education and Counseling, 82(1), 30-35. https://doi.org/10.1016/j.pec.2010.02.008.CrossRefGoogle ScholarPubMed
Garcia-Retamero, R., Andrade, A., Sharit, J., & Ruiz, J. G. (2015). Is patients’ numeracy related to physical and mental health? Medical Decision Making, 35(4), 501511. http://doi.org/10.1177/0272989X15578126.CrossRefGoogle ScholarPubMed
Garcia-Retamero, R., Cokely, E. T., & Hoffrage, U. (2015). Visual aids improve diagnostic inferences and metacognitive judgment calibration. Frontiers in Psychology, 6, 112. http://doi.org/10.3389/fpsyg.2015.00932.Google ScholarPubMed
Ghazal, S., Cokely, E. T., & Garcia-Retamero, R. (2014). Predicting biases in very highly educated samples: Numeracy and metacognition. Judgment and Decision Making, 9(1), 1534.CrossRefGoogle Scholar
Jasper, J. D., Bhattacharya, C., & Corser, R. (2017). Numeracy predicts more effortful and elaborative search strategies in a complex risky choice context: A process-tracing approach. Journal of Behavioral Decision Making, 30(2), 224235. http://doi.org/10.1002/bdm.1934.CrossRefGoogle Scholar
Jasper, J. D., Bhattacharya, C., Levin, I. P., Jones, L., & Bossard, E. (2013). Numeracy as a predictor of adaptive risky decision making. Journal of Behavioral Decision Making, 26(2), 164173. http://doi.org/10.1002/bdm.1748CrossRefGoogle Scholar
Matusz, P. J., Traczyk, J., & Gasiorowska, A. (2011). Kwestionariusz Potrzeby Poznania – konstrukcja i weryfikacja empiryczna narzędzia mierzącego motywację poznawczą. Psychologia Społeczna [Social Psychology], 6(2), 113128.Google Scholar
Millisecond Software. (2016). Inquisit 4. Seatle. http://www.millisecond.com.Google Scholar
Millroth, P., & Juslin, P. (2015). Prospect evaluation as a function of numeracy and probability denominator. Cognition, 138, 19. http://doi.org/10.1016/j.cognition.2015.01.014.CrossRefGoogle ScholarPubMed
Miron-Shatz, T., Hanoch, Y., Doniger, G. M., Omer, Z. B., & Ozanne, E. M. (2014). Subjective but not objective numeracy influences willingness to pay for BRCA1/2 genetic testing. Judgment and Decision Making, 9(2), 152158.CrossRefGoogle Scholar
Pachur, T., & Galesic, M. (2013). Strategy selection in risky choice: The impact of numeracy, affect, and cross-cultural differences. Journal of Behavioral Decision Making, 26(3), 260271. http://doi.org/10.1002/bdm.1757.CrossRefGoogle Scholar
Pachur, T., Hertwig, R., Gigerenzer, G., & Brandstätter, E. (2013). Testing process predictions of models of risky choice: A quantitative model comparison approach. Frontiers in Psychology, 4, 122. http://doi.org/10.3389/fpsyg.2013.00646.Google Scholar
Patalano, A. L., Saltiel, J. R., Machlin, L., & Barth, H. (2015). The role of numeracy and approximate number system acuity in predicting value and probability distortion. Psychonomic Bulletin & Review, 22(6), 18201829. http://doi.org/10.3758/s13423-015-0849-9.CrossRefGoogle ScholarPubMed
Peters, E. (2012). Beyond Comprehension: The role of numeracy in judgments and decisions. Current Directions in Psychological Science, 21(1), 3135. http://doi.org/10.1177/0963721411429960.CrossRefGoogle Scholar
Peters, E., & Bjalkebring, P. (2015). Multiple numeric competencies: When a number is not just a number. Journal of Personality and Social Psychology, 108(5), 802822. http://doi.org/10.1037/pspp0000019.CrossRefGoogle Scholar
Peters, E., Vastfjall, D., Slovic, P., Mertz, C. K., Mazzocco, K., & Dickert, S. (2006). Numeracy and decision making. Psychological Science, 17(5), 407413. http://doi.org/10.1111/j.1467-9280.2006.01720.x.CrossRefGoogle ScholarPubMed
Petrova, D., Garcia-Retamero, R., Catena, A., Cokely, E., Heredia Carrasco, A., Arrebola Moreno, A., & Ramírez Hernández, J. A. (2017). Numeracy predicts risk of pre-hospital decision delay: A retrospective study of acute coronary syndrome survival. Annals of Behavioral Medicine, 51(2), 292306. http://doi.org/10.1007/s12160-016-9853-1.CrossRefGoogle Scholar
Petrova, D., Garcia-Retamero, R., Catena, A., & van der Pligt, J. (2016). To screen or not to screen: What factors influence complex screening decisions? Journal of Experimental Psychology: Applied, 22(2), 247260. http://doi.org/10.1037/xap0000086.Google ScholarPubMed
Petrova, D., van der Pligt, J., & Garcia-Retamero, R. (2014). Feeling the numbers: On the interplay between risk, affect, and numeracy. Journal of Behavioral Decision Making, 27(3), 191199. http://doi.org/10.1002/bdm.1803.CrossRefGoogle Scholar
Raven, J. (2000). The Raven’s Progressive Matrices: change and stability over culture and time. Cognitive Psychology, 41(1), 148. http://doi.org/10.1006/cogp.1999.0735CrossRefGoogle ScholarPubMed
Reyna, V. F., & Brnst-Renck, P. G. (2014). A review of theories of numeracy: psychological mechanisms and implications for medical decision making. In Anderson, B. L. & Schulkin, J. (Eds.), Numerical reasoning in judgments and decision making about health (pp. 215251). Cambridge, UK: Cambridge University Press.CrossRefGoogle Scholar
Reyna, V. F., Nelson, W. L., Han, P. K., & Dieckmann, N. F. (2009). How numeracy influences risk comprehension and medical decision making. Psychological Bulletin, 135(6), 943973. http://doi.org/10.1037/a0017327.CrossRefGoogle ScholarPubMed
Schley, D. R., & Peters, E. (2014). Assessing “economic value” symbolic-number mappings predict risky and riskless valuations. Psychological Science, 25(3), 753761. http://doi.org/10.1177/0956797613515485.CrossRefGoogle ScholarPubMed
Traczyk, J., & Fulawka, K. (2016). Numeracy moderates the influence of task-irrelevant affect on probability weighting. Cognition, 151, 3741. http://doi.org/10.1016/j.cognition.2016.03.002.CrossRefGoogle ScholarPubMed
Traczyk, J., Lenda, D., Serek, J., Fulawka, K., Tomczak, P., Strizyk, K., Polec, A., Zjawiony, P, & Sobkow, A. (2018). Does Fear Increase Search Effort in More Numerate People? An Experimental Study Investigating Information Acquisition in a Decision From Experience Task. Frontiers in Psychology, 9(1203). https://doi.org/10.3389/fpsyg.2018.01203.CrossRefGoogle Scholar
Tversky, A., & Kahneman, D. (1992). Advances in prospect theory: Cumulative representation of uncertainty. Journal of Risk and Uncertainty, 5(4), 297323. http://doi.org/10.1007/BF00122574.CrossRefGoogle Scholar
Zikmund-Fisher, B. J., Smith, D. M., Ubel, P. A., & Fagerlin, A. (2007). Validation of the Subjective Numeracy Scale: Effects of low numeracy on comprehension of risk communications and utility elicitations. Medical Decision Making, 27(5), 663671. http://doi.org/10.1177/0272989X07303824.CrossRefGoogle ScholarPubMed
Figure 0

Table 1: Twelve low-payoff (with EV ratios around 1) and twelve high-payoff (with EV ratios between 5 and 6) binary choice problems consisting of two-outcome gambles in the gain domain. The priority heuristic (PH) and cumulative prospect theory (CPT) predicted opposite choices. Each problem met criteria of nondominance.

Figure 1

Table 2: An example of cognitive operations and choice predictions according to cumulative prospect theory (CPT) and priority heuristic (PH).

Figure 2

Table 3: Descriptive statistics for measures used in the study. BNT – the Berlin Numeracy Test, NCS – the Need for Cognition Scale, RAPM – the Raven’s Advanced Progressive Matrices, SNS – the Subjective Numeracy Scale. CPT/EV-consistent choices in low- and high-payoff problems refer to the number of expected value choices in these problems.

Figure 3

Table 4: Pearson zero-order correlation coefficients for the relationships between measures used in the study. CPT/EV-consistent choices in low- and high-payoff problems refer to the number of expected value choices in these problems. BNT – the Berlin Numeracy Test, NCS – the Need for Cognition Scale, RAPM – the Raven’s Advanced Progressive Matrices, SNS – the Subjective Numeracy Scale. Deliberation time is log-transformed median choice latency.

Figure 4

Figure 1: Proportion of choices consistent with expected value (CPT/EV) as a function of payoff (high/low, dashed lines are high) and numeracy (subjective in dark blue, objective in orange). Subjective numeracy (SNS) scores are displayed in quintiles (as equal as possible), so that the number of subjects in each point — represented by the area of each point — are roughly comparable to those for objective numeracy.

Figure 5

Table 5: Loadings on canonical variates (pairs of linear combinations of X and Y variables), CV1 and CV2.

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