I. Introduction

It is widely accepted that self-regulation strategies impact academic achievement (^{Cleary & Kitsantas, 2017}). Therefore, an important challenge for the field of Self-Regulated Learning (SRL) regards its implementation in natural educational settings through tangible and effective interventions. The fact that acquiring mathematical skills is a common problem identified in education systems throughout the world poses an opportunity for investigating the effectiveness of SRL interventions. A significant number of Uruguayan students fail to achieve basic mathematical competencies throughout their education. For example, 52% of Uruguayan 15-year-olds participating in PISA 2015 were unable to meet the baseline proficiency level (level 2) as defined by the Organization for Economic Cooperation and Development (^{OECD, 2016}). Learning mathematics is at the heart of several education systems and instructional practices could take advantage of the growing body of evidence regarding SRL and its positive impact on problem solving and achievement (^{Dignath & Büttner, 2008}; ^{Taylor et al., 2017}).

SRL implies a series of processes by which learners personally activate and sustain cognition, emotions and behavior in a systematic way, allowing them to attain their goals (^{Greene, 2018}). Studies on SRL of mathematics have focused on cognitive and metacognitive processes, as summarized in Zimmerman’s cyclical phases model (^{de Corte et al., 2011}; ^{Panadero, 2017}). As such, the ability to self-regulate manifests as the use of strategies to plan, supervise and control task execution, and the evaluation of these processes and their results (^{Zimmerman, 2000}). The imbalance between these elements is particularly salient among students who experience difficulty learning mathematics (^{Schoenfeld, 1992}).

Despite the traditional emphasis in the field on cognitive and metacognitive SRL strategies, the emotional dynamics of learning are also considered paramount for educational studies and practice, as expressed in several theoretical models of self-regulation (^{Baars et al., 2017}; ^{Ben-Eliyahu, 2019}; ^{Panadero, 2017}). Nonetheless, the specific use of these strategies has not received sufficient consideration in studies on self-regulation, and even less so in teaching interventions to promote SRL (^{Donker et al., 2014}; ^{Heirweg et al., 2019}; ^{Schukajlow et al., 2017}; ^{Tzohar-Rozen & Kramarski, 2018}).

The regulation of motivation, emotion and behavior lies at the core of volitional strategies for learning (^{Corno, 2001}). It is not quite clear how exactly volitional processes influence effort regulation and academic performance (^{Kim & Bennekin, 2013}). However, there is no doubt that emotions play a part in learning, as is shown in frequent observations of frustration and anger during the process (^{Op’tEynde et al., 2006}). Changes in emotions could result in systematic changes in SRL and performance (^{Schukajlow & Racoczy, 2016}). Interventions aiming to promote SRL have progressively included cognitive, metacognitive, and volitional strategies, leading to questions regarding their particular role in the acquisition of mathematical problem solving skills.

II. Method

The current study employs a quasi-experimental pre-post design with a control group (^{Montero & León, 2007}). The independent variable under consideration is SRL teaching in three randomly assigned conditions - cognitive, metacognitive or volitional - and the dependent variable is the participants’ score on a mathematical problem-solving test.

Participants. The sample was drawn from a pool of 305 sixth-grade students from six elementary schools in Montevideo, Uruguay, who participated in a Mathematical Problem-Solving Test (MPST), obtaining a mean of 17.52 (SD = 9.03). Students scoring below the 40th percentile were initially considered to be low-achieving. Students diagnosed with mathematical learning difficulties, severe sensory problems or behavioral problems, or who were receiving psychopedagogical, psychological and/or psychiatric treatment were excluded from the sample. The resulting list of 69 students was validated by their teachers who further identified them as low-achievers. Two participants withdrew from the sample, bringing the sample size down to n = 67, all of whom attended at least 70% of all sessions. These students were randomly assigned to one of three experimental conditions: instruction of cognitive (n = 15), metacognitive (n= 16) or volitional (n = 16) strategies for SRL. Each condition was executed in smaller working groups consisting of three or four students or a control group (n = 21). No significant differences were found between the experimental conditions with respect to attendance, as verified by ANOVA (F(2) = .72, p = .49).

Participants’ ages varied from 11 years 2 months to 12 years 4 months and 56.7% (38) were male. The mean average grade obtained for mathematics during the fifth grade was 7.15 (SD = 1.44), on a scale from 0 to 12 (5 being the minimum for grade promotion). The sample mean for MPS at baseline was 14.21 (SD = 7.16).

Instruments. The MPST evaluates competence in correctly solving mathematical problems aligned with the school curriculum, implying the adequate mobilization of knowledge, procedures, algorithms and strategies involved in MPS. The test was designed for the purpose of this study, based on tasks with a multiplicative structure (see Table I), as addressed by the national curriculum (^{Pena, 2005}) and in consultation with expert teachers regarding its adequacy for evaluating their courses. Consequently, the items included in the test concerned mathematical problems similar to those addressed in the intervention. A team of two experts prepared and corroborated four comparable versions of the test consisting of 14 similarly-structured items or tasks that evaluated the mathematical problem-solving competencies required to tackle them.

The test required students to read each task, show the necessary working and give the final answer within a total of 40 minutes. Each task was scored from 0 to 3, depending on the proposed working and the final result, the sum of which provided the total test result (from 0 to 42). Based on our original sample pool (n = 305), the test’s internal consistency reached α = .82. Confirmatory factor analysis based on these same data established a model consisting of a single dimension with acceptable goodness of fit (GFI = 0.911) and root mean square error of approximation (RMSEA = 0.068) (^{Hu & Bentler, 1999}).

MPS test results in our study sample correlated positively and significantly with teacher-assigned grades in mathematics (r = .31, p < .05), supporting the test’s criterion validity.

Procedure. Following institutional authorization from the participating schools, the MPST was collectively administered at baseline (MPS₁) to all sixth-grade students enrolled in the schools. The teachers informed the researchers which students they considered low-achieving in mathematics and provided their students’ fifth-grade average mathematics grade points to the researchers. Based on these sources of information, participants for the intervention were selected and an informed consent form was sent out to their families.

Once all consent forms had been received, the 16 intervention sessions were conducted three times a week over two months, in the second semester of the school year. In all conditions the same mathematical problems were addressed using an identical sequence yet varying the content of the feedback delivered by implementers, based on the script assigned to them. Each intervention implementer worked in subgroups of four students, following one of the three scripts, outside the classroom. All group sessions were audio-recorded, which allowed the main researchers to evaluate the reliability of the implementation. Meanwhile, the students from the control group maintained regular classwork with their teachers.

The MPST was administered immediately after terminating the intervention (MPS₂) and two months later (MPS₃). The scoring of the MPST occurred blinded from intervention conditions.

Intervention. Throughout 16 sessions, each lasting approximately 40 minutes, SRL strategies were taught through direct instruction, modeling and feedback to the participants, following a fixed sequence that involved solving four increasingly difficult mathematical problems. In each session, the first task was solved by the intervention implementer using direct instruction and modeling, the second by working in pairs, the third autonomously, and the fourth by one of the participants thinking aloud. All tasks entailed multiplicative structures, comparable to those addressed by the curriculum as implemented in Uruguayan schools (^{Pena, 2005}; ^{Picaroni & Loureiro, 2010}).

Each intervention group followed one of three scripts, each one corresponding to a particular “layer” as proposed in ^{Boekaerts’ (1999)} model. Each script contained explicit strategies to be used and modeled by the intervention implementer and considered during feedback (Table II).

The Cognitive Script (CS) promoted cognitive strategies closely related to MPS, with a focus on task organization (^{de Boer et al., 2018}). The metacognitive script (MCS) expanded the CS by including metacognitive strategies regarding the planning, supervision and evaluation of the task, as contemplated in ^{Zimmerman’s cyclical phases model (2000)}. The Volitional Script (VS) added volitional strategies (addressing motivation regulation, emotion regulation, and impulse control) to the CS (^{Baez-Estradas & Alonso-Tapia, 2017}).

Intervention fidelity. Prior to the study, a pilot intervention was performed with 12 low-achieving students, allowing experts to test and approve the adequacy of each script. Subsequently, eight advanced psychopedagogy students were randomly assigned a script and trained as intervention implementers. Training involved analyzing situations recorded during the pilot study and practicing applying the script by proposing concrete approaches. Implementers were supervised and monitored through meetings with the first author after the first and third session and they completed a self-assessment form after each session.

All 16 sessions took place as planned in all groups, both in terms of frequency and duration. Compliance with the assigned scripts was evaluated for all intervention subgroups after completion of all 16 sessions (^{Greene, 2015}). Verbalizations of each implementer were categorized by two independent referees as either cognitive, metacognitive or volitional control messages in a sample of two sessions. Interrater reliability reached a Cohen’s kappa value of .88. Based on these analyses, at least 50% of all recorded verbal interactions corresponded with the intended script, confirming intervention fidelity.

Hypothesis. It is expected that those who were taught metacognitive and volitional strategies will exhibit improved MPS ability compared to control and cognitive intervention group students, as they hypothetically develop strategies to adequately address mathematical problems in a flexible and autonomous manner, allowing students to solve problems with less need for scaffolding and producing deeper and transferable learning. Moreover, we anticipate that these effects will remain two months after the intervention is complete.

Data analysis. Initial MPS₁ results of all groups were compared using ANOVA. The effect of experimental conditions was analyzed with ANCOVA, including MPS₂ and MPS₃ as independent variables and MPS₁ as a covariable (^{Huck & Melean, 1975}). The authors established p < .05 as the level of significance for the interpretation of tested comparisons. Cohen’s d was used as an indicator of effect size of group differences. SPSS version 18 was used for all analyses.

III. Results

As shown in Table III, all experimental and control groups have comparable MPS values at baseline, as no statistically significant differences are found at MPS₁ across groups (F (3, 63) = 1.12, p = .35, η2 = .05).

At the end of the intervention, MPS₁ was found to be significant as a covariable, F (1,62) = 75.61, p < .01, η2 = .55. Group condition had a significant main effect on MPS₂, F (3, 62) = 17.84, p < .01. Effect sizes (Cohen’s d) for all comparisons are presented in Table IV. Effects are significant for MPS₂ in all intervention groups. The group working from the volitional script obtained the largest effect sizes, followed by the MCS, and finally the CS group, yet all had a significantly higher mean MPS₂ score than the control group.

At two months post-intervention, similar comparisons were run, again showing a significant effect of MPS₁ on outcomes (MPS₃), F (1, 49) = 44.66, p < .01, η2 = .48. Group condition significantly affected MPS₃ results, F (3, 49) = 6.32, p < .01. The MCS and VS groups maintained improved MPS scores at MPS₃, differing significantly from control group scores, with the VC group obtaining the highest scores (Table IV). On the other hand, the CS group mean did not differ significantly from the control group mean MPS₃.

IV. Discussion

Using an experimental design, this study aimed to evaluate the impact that teaching particular strategies for SRL has on mathematical problem solving in low-achieving sixth-grade elementary school students. Although tested in a small sample, all three intervention strategies were associated with improvements in MPS, yet the strongest effects were found for the instruction of volitional strategies - in combination with cognitive strategies - followed by the instruction of combined metacognitive and cognitive strategies, both immediately after the intervention and at two months post-intervention. The intervention that only taught cognitive strategies produced the smallest, yet still positive, effects on MPS immediately after the intervention, and ceased to be effective two months later. These findings confirm our initial hypotheses, based on the premise that transfer of knowledge is encouraged when metacognitive or volitional strategies are involved, on top of cognitive strategies, supporting the need to combine strategies in order to promote SRL (^{Dignath et al., 2008}).

Our observations are consistent with studies that show the positive impact of SRL strategies on academic outcomes, particularly in mathematics and at elementary school level (^{Dignath & Büttner, 2008}; ^{Dignath et al., 2008}), providing further evidence of the influence of self-regulation on academic achievement and the malleability of SRL. Our findings extend the evidence base, confirming these effects in a Latin American sample, a population that has seen relatively little representation in the international literature on SRL.

Moreover, in focusing particularly on low-achieving students at the end of their elementary school trajectory, implying repeated exposure to failure, the positive intervention effects obtained in our study are particularly promising. As observed by ^{Schoenfeld (1992)}, and as we experienced throughout our intervention, in this particular population, tasks are addressed with little prior analysis or planning, using random solution strategies that do not respond to task requirements. Adding to this is the role played by previously acquired knowledge and skills, as confirmed by the significant effect of MPS skills at baseline on later MPS outcomes.

While the instruction of self-regulation strategies may contribute overall to the improvement of MPS, based on our data, efficiency or transfer beyond the intervention context appears to be variable.

Intervention based exclusively on Cognitive Strategy (CS) instruction contributed to improving MPS, yet its effects appeared limited to the context of the intervention, as they weakened at two months post-intervention as MPS scores dropped down to control group levels. Cognitive strategies are considered to be more closely related to the task and allow students with limited previous knowledge to obtain better results in contexts that require minimal transfer (^{Butler et al., 2005}; ^{Kramarski et al., 2013}). As in previous studies, exclusive cognitive-based instruction exhibited the smallest effect sizes (^{Dignath et al., 2008}).

Addressing cognitive strategies seems necessary, yet provides insufficient flexibility in responding to different situations (^{Boekaerts, 1999}). These strategies were included in metacognitive and volitional intervention conditions, likely contributing to a clearer task structure. Such clarity may generate positive emotions (^{Schukajlow et al., 2017}), better equipping students to face the task.

Instruction based on Metacognitive Self-Regulation (MCS) combined cognitive strategies with metacognitive planning, supervision and evaluation, following the typical outline of socio-cognitive models (^{Zimmerman, 2000}). The incorporation of metacognitive regulation strategies has been directly related to mathematical competence (^{de Corte et al., 2011}). This intervention strategy appears effective for low-achieving students in our sample, as it enhanced their MPS skills even with the passing of time. The effect size established in our study (d = 1.14) is similar to that reported for interventions in mathematics in primary education (^{Dignath et al., 2008}).

The Volitional Script (VS) group combined cognitive and volitional strategies, predominantly including the strengthening of effort and concentration, disconnection of negative emotions, and impulse control (^{Corno, 2001}). Those participating in the VS group obtained the best results in MPS, both immediately after the intervention and at two months post-intervention. The effects appear to be maintained as time passes and more transfer is required. Comparisons with the control group reach effect sizes close to d = 2.00, showing the significant contribution of this intervention to improving MPS results in low-achieving students.

There is reason to believe that the instruction of volitional strategies may better suit students who have repeatedly experienced failure. Low academic achievement may elevate anxiety (^{Weidman et a, 2015}), hinder initiative for action, and limit positive affect (^{Kazén et al., 2008}). Volitional control strategies address motivation and emotions related to these situations. The instruction of volitional control contributes to generating a more controlled setting and a climate of security and confidence, promoting conditions that allow low-achieving students to perform (^{Baumann & Kuhl, 2005}). Interventions focused on student motivation are most effective when they are included in primary education interventions and promote the use of cognitive strategies (^{Dignath & Büttner, 2008}).

Regarding study limitations, as practical issues limited our intervention design, we were unable to involve teachers as intervention implementers, which would have been preferable. However, the interventions were designed in such a way - by modeling strategies and orienting feedback - that they could be implemented by teachers in the classroom. Nonetheless, involving teachers could raise particular implementation challenges, as explicit instruction of self-regulation in the classroom is generally scarce and not perceived as part of a teacher's role (^{Dignath & Büttner, 2018}).

On the other hand, this study could have been enriched by involving all students in the classroom, rather than focusing on low-achieving students. Nonetheless, as a point of departure for further research, the particular aim of this study to research the intervention impact for low-achieving students was grounded in the pressing need to address the problem of struggling students, as they hardly benefit from regular participation in the classroom. Future studies should look into the differential effects of teaching self-regulation in the classroom, accounting for students with diverse achievement levels and abilities. Furthermore, the small sample size should be taken into account when interpreting our results and retrieved effect sizes. Likewise, it should be pointed out that the criterion applied for establishing intervention fidelity (50% of all verbal interactions based on the script) may be considered unsuitable, particularly in applying general criteria for laboratory-like conditions. However, considering the limited evidence base on SRL produced in Latin American countries, and the embedded nature of the intervention, we do believe this study, its methodological limitations notwithstanding, constitutes a contribution to the field.

The mathematical problems used in this study were consistent with those commonly employed in the Uruguayan education system, known to rely more on repetitive rather than constructive practices (^{Picaroni & Loureiro, 2010}). Nonetheless, as the latter allow for more flexible solutions and operational complexity, they could be considered more suitable for the purposes of this study, as they require increased self-regulation.

In conclusion, the instruction of metacognitive and volitional strategies, combined with cognitive strategies, contributes to mathematical competence. The inclusion of volitional strategies appears to benefit low-achieving students in particular, when they address their affective and motivational dynamics but also cognitive strategies and the specific content of tasks.