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The Effect of REACT Model Assisted Fable-Math Book Media on Mathematical 

Problem Solving Of Elementary School Students 

 

Destiana Dian Arfiani1, Himmatul Ulya2, Savitri Wanabuliandari3 

1
Pendidikan Guru Sekolah Dasar, 

2,3
Pendidikan Matematika 

Fakultas Keguruan dan Ilmu Pendidikan 

Universitas Muria Kudus  
destiana.arfi@gmail.com, himmatul.ulya@umk.ac.id, savitri.wanabuliandari@umk.ac.id 

Abstract  

This study aims to analyze (1) the average mathematical problem solving ability of 

students who can achieve the KKM, (2) the proportion of students who can complete 
classical completeness of 75%, (3) differences in students' mathematical problem 

solving abilities before and after the REACT model assisted by fable-math book 

media is applied, (4) increasing mathematical problem solving abilities. The research 
method used is quantitative research with a pre-experimental design trial design in 

the form of one group pretest posttest. Sampling was done by means of purposive 

sample. The sample in this study were IV grade students in academic year 

2019/2020. Collecting data using interview techniques, documentation, and tests. 
The data that has been collected is then analyzed using statistical analysis in the form 

of one sample t-test, z-proportion test, paired sample t-test, and n-gain test. After 

applying the REACT model assisted by the fable-math book media the results of the 
study showed that the average score of the student's problem-solving ability test got 

more than 70, the proportion of students who completed the test could achieve 

classical completeness above 75%, there were significant differences in the pretest 
and posttest results, and there is an increase in students' mathematical problem 

solving abilities with the medium category. 

Keywords: Mathematical Problem Solving Ability, Fable-Math Book Media, 

REACT Models. 

 

INTRODUCTIONS 

 

 Learning mathematics have important effects in improving the quality of 

education because mathematics as a source of various sciences. Mathematics as an 

important part of everyday life in all human activities and social matters. Agree with 

Kusmanto and Marliyana (2014), which states that mathematics is a fundamental science 

in the development of science and technology that can advance thinking skills and human 

disciplinary attitudes, mathematics also has an important role in solving all problems in 

life, therefore basic knowledge needs to be given to students as an understanding of 

mathematics. The purpose of learning mathematics in schools according to Permendiknas 

(2006) is that students have the ability to understand mathematical concepts, solve 

problems, using reasons, communicate ideas, and respect the usefulness of mathematics. 

In addition, with regard to the importance of solving mathematical problems, the research 

of the National Council of Teachers of Mathematics (NCTM) explains that in mathematics 

learning activities in schools, there are five mathematical abilities, namely: reasoning, 

problem solving, connection, communication, and representation (Sumartini, 2016: 149 ). 

The explanation of the importance of learning mathematics shows one of the important 

components to improve the quality of education is the ability solving the problems in 

mathematic. Problem solving is a process of finding a solution to a problem. According to 



 

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Siregar and Syafari (2017) solving mathematical problems is a strategy to solve problems 

or questions on mathematical problems that involve students' abilities and in solving 

problems are not obtained directly. Therefore, the role of the teacher is an important thing 

that supports the improvement of student problem solving starting from increasing the 

ability of the students themselves and the choice of learning methods as well as various 

mathematical problem solving exercises. According to NCTM cited by Ulya (2016: 92) 

Mathematical problem solving has several indicators of solving, including (1) 

understanding new mathematical problems, (2) planning appropriate problem solving 

strategies, (3) doing problems solving, (4) monitoring and reflecting. 

 The fact occurs shows that in mathematics learning, activities related to problem 

solving have not been used as activities that must be carried out. The results of research 

from the Program for International Students Assessment (PISA) in 2018 showed the low 

problem-solving ability of Indonesian students in mathematics learning, this can be seen 

from the acquisition of an average test score for Indonesian students of 379 in the 74th 

rank of 79 countries that have researched. Regarding non-routine problems such as 

problem solving and proof in mathematics that require reasoning, students still need 

various guidance from the teacher in solving them (Fauziah, 2010). The main cause of the 

low ability of mathematical problems is the unenthusiastic attitude of students towards 

mathematics and the learning process which too often uses in learning methods directly, 

so that as a result, in solving math problems students only refer to the method given by the 

teacher (Siregar and Syafari, 2017). In general, learning mathematics in school, the teacher 

gives material and non-problem solving exercise. 

 The results of interviews conducted with IV grade students of SDN Gembong 

01 Pati showed that most of students were not enthusiastic about taking mathematics 

lessons. Students feel mathematics is not a fun learning because it deals with numbers and 

calculations. If students are faced with problems related to problem solving, students are 

unable to understand these problems. Students need to be explained the meaning of each 

sentence in problem solving so that students understand the meaning of the problem so 

that they can present it in mathematical sentences. Students' lack of readiness in solving 

mathematical problems can be seen in the results of the problem solving ability test which 

was attended by 21 fourth grade students of SDN Gembong 01, it is known that there are 

17 students who did not complete the KKM or the equivalent of 80.95% and there were 4 

students who were declared complete or equal to 19, 05% in doing questions. The average 

value obtained by students in the problem-solving test was 44.71. The description of the 

test results shows that students have not been able to solve mathematical problem solving 

problems in accordance with the correct solving steps. 

 The low ability of students' problem solving is due to their unenthusiastic and 

lack of motivation towards learning mathematics in the classroom. It makes the students 

are not serious in learning mathematics caused in less meaningful learning. Less 

meaningful learning makes it difficult for students to remember what the teacher teaches. 

If students do not master the previous material, it is possible that students will have 

difficulty with the next material, because the first students' abilities are the basic of the 

next material. Efforts that can be applied to these problems are applying a learning model 

that provides direct experience to students so that learning can be easily remembered. One 

model that can be applied is the contextual model of Relating, Experiencing, Applying, 

Cooperating, and Transferring or more easily called the REACT model. 

 REACT learning model is a learning strategy that is contextual or real. The 

development of a contextual model proposed by Crawford (2003: iii) The REACT 



 

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learning model has five main related stages, that are Relating, Experiencing, Applying, 

Cooperating, and Transferring. Relating is a pre-learning activity by linking concepts in 

everyday life experiences. Experiencing is the activity of finding new concepts to be 

learned. Applying is the activity of applying concepts in the question in form of problems. 

Cooperating is an activity to collaborate students with each other to solve problems. 

Transferring is using a concept into a new situation such as a class discussion. This 

REACT learning model has a gradual model step, from basic understanding to deep 

understanding that can help students' thinking skills (Anas and Fitriani, 2018: 160). 

Contextual learning invites students to be present in real life and encourages them to apply 

their knowledge. Contextual learning with the REACT model will make students more 

active in constructing their knowledge, not only accepting concepts from the teacher 

(Novri, et al, 2018). 

 In accordance with the REACT model, learning will be a meaningful experience 

for students when they imagine the context presented through the media. The media that 

is used as a complement in this learning is the fable-math book media. According to Haidar 

(2018) learning by presenting pictures in stories in the form of a math fable book is in 

accordance with the early stage group in the high class which is easy to understand and 

meets the needs of children. Fable books can develop reading interest in students and 

motivate students in learning (Oktaviani and Prihatin, 2019). The combination of the 

REACT model and fable-math book media will attract students' interest in learning 

mathematics by providing meaningful experiences. The REACT model which is 

contextual is suitable for the fable book media which contains realistic problems so that 

students are able to solve problems in life. In line with Fatmala, et al. (2016) suggest that 

the REACT contextual model directs students to learn to relate material concepts to their 

surrounding life, making it easier for students to find solutions to various problems. 

 According to Kristianti, et al. (2013) in their research, they stated that the use of 

the REACT model as contextual learning of students' mathematical problem-solving 

abilities has increased significantly. The use of fable-math book media is an effort to make 

learning more optimal than before. Therefore, the researcher wishes to conduct research 

on the effect of the REACT model assisted by fable-math book media on problem solving 

of elementary school students. This research has problem formulations including, (1) 

whether the average mathematical problem solving ability of students through learning 

with the REACT model assisted by fable-math book media can achieve KKM? (2) is the 

proportion of students completing the REACT model assisted by the fable-math book 

media can achieve 75% classical completeness? (3) is there a difference in the average 

ability of students' mathematical problem solving before and after the application of the 

REACT model assisted by fable-math book media? and (4) is there an increase in students' 

mathematical problem solving abilities through REACT model learning assisted by fable-

math book media? 

 

  

RESEARCH METHOD 

The method used in this research is quantitative research. The research design used 

pre-experimental design in the form of one group pretest posttest. This research uses two 

variables, that are the independent variable and the dependent variable. The independent 

variable in this research is the REACT model assisted by the fabel-math book media, while 

the dependent variable is the students' mathematical problem solving ability. The sample 



 

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selection technique is through purposive sampling technique. The sample used for this 

research were IV grade students of SDN Gembong 01 Pati in the 2019/2020 even semester 

learning. The number of class IV are 21 students, 10 male students and 11 female students. 

The design in this research is shown in table 1 as follows. 

Table 1 Research Design 

Group  Pretest Treatment Posttest 

Experimen O1 X 
O2 

(Source: Sugiyono, 2016) 

Information: 
O1 = pretest (before treatment) 

O2 = posttest (after treatment) 

X = given treatment (independent variable) 

Based on table 1, the research design was initially given a pretest test to determine 

first ability, then the sample was given treatment using the REACT model with the help 

of the fable-math book media, and after that the sample was given the final test, is posttest 

to determine its effect on mathematical problem solving abilities. The techniques used in 

collecting research data are interview techniques, documentation techniques, and tests. 

The research instruments used were test and non-test, the test instrument used was in the 

form of pretest and posttest questions and the non-test instrument in the form of an 

interview sheet. The data that has been known in the test results are then analyzed using 

statistical calculations in the form of a one-sample t-tets test to determine the average 

individual completeness of the student's test results, the proportion z test is used to 

determine the level of the proportion of students who completed the test on the classical 

student learning completeness, the paired sample t-test was conducted to determine the 

difference between the average ability of students before and after being treated, and n-

gain was used to determine the increase in students' mathematical problem solving 

abilities. 

 

RESULTS  

Before testing the hypothesis with the statistical test, the data is analyzed first using 

the data normality test. The data normality test in this research used the Kolmogorov-

Smirnov test with the help of the SPSS 25 application. Based on the data normality test, it 

was concluded that the experimental group had normal distribution data. Achievement of 

students' completeness in mathematics test results refers to the minimum completeness 

criteria (KKM) that have been determined by the education unit, which is more than equal 

to 70. 

Individual learning completeness 

The results pretest of the problem-solving abilities of IV grade students showed 

that 19.05% of the students had completed the KKM, and 80.95% of the students did not 

complete the KKM. While the results of the posttest or final test after treatment obtained 

different mastery results. Grade IV students who passed the KKM in the posttest were 

76.19% of students, for students who did not complete the KKM were 23.81%. This shows 

that the difference in student learning completeness has increased. After knowing the 



 

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results of the students' initial and final tests, then the average individual learning 

completeness test was carried out on the student's test scores to determine the KKM 

completeness achievement. The results of the calculation of completeness with the one 

sample t-test are clarified in the following table. 

Table 2 The Results of the One Sample T-test 

Test Value = 70 

T df Sig. (2-tailed) 

2.900   20 .009 

Based on table 2, it shows that the results of the one sample test show that the sig 

(2-tailed) result is 0,009 with a test value of 70. Testing on this data uses one-part test, so 

to determine the sig value, namely yaitu 
1

2
 x 0,009 = 0,0045. So that the results obtained 

sig <0,05 namely 0,0045 <0,05, which means that H0 is rejected and Ha is accepted. So it 

can be concluded that the average result of the test results of students' mathematical 

problem solving abilities with the REACT model assisted by the fable-math book media 

gets more than 70. 

The REACT learning model invites students to find material concepts, collaborate, 

apply the knowledge gained in students' lives, and share in new situations, so that not only 

teach concepts but students are directed to find meaning in learning. According to Jelatu, 

et al. (2018) innovative learning with the REACT strategy can strengthen students' 

memory because they have experience concrete concept discovery. In addition, the fable-

math book media used in this learning contains material on the circumference and wide of 

a flat shape which is packaged in the form of a pictorial story and used as a contextual 

tool. This fable-math book media is associated with the local excellence of the Pati area, 

making it easier for students to understand what material is being studied and obtained. 

This is in accordance with the opinion of Ulya (2016) that ethno-mathematics learning 

makes it easier for students to understand the concept of material because it provides direct 

experience related to local culture. In line with Wanabuliandari and Purwaningrum (2018), 

stated the use of the environment in the form of a surrounding culture that is associated 

with student knowledge can make learning more enjoyable and meaningful. 

Classical learning completeness 

Classical learning completeness in this research to determine the number of 

students who completed the test could reach 75% of the total number of students who 

received the REACT learning model assisted by the fable-math book media. This test uses 

the Z test of proportions assisted by Microsoft Excel 2010. Data from the students' pretest 

and posttest results are used to analyze classical learning completeness. The calculation of 

the z test proportion at the pretest value is clarified in the following table. 

Table 3 Z-Test Results for Pretest 

Zhitung -Ztabel Conclusion 

-5,921 -1,645 H0 rejected 

Based on table 3 shows the results of the pretest value data test shows Zhitung <-

Ztabel that is -5,921 <-1,645. So that H0 is rejected and Ha is accepted. So it can be 

concluded that the proportion of students who completed the test of students' mathematical 



 

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problem solving abilities classically was less than 75% of the total number of students 

who took the pretest. There is also a proportional z test on the posttest tilapia in the 

following table. 

Table 4 Z-Test Results for Posttest 

Zhitung -Ztabel Conclusion  

0,126 -1,645 H0 accepted 

Based on table 4, the z test results are obtained on the posttest value data, namely 

Zhitung> -Ztabel with a value of 0.126> -1.645. So that H0 can be accepted. Then the 

conclusion is drawn that the proportion of students who complete the test of students' 

mathematical problem solving abilities classically is more than equal to 75% of the total 

number of students who take the posttest. For this reason, the use of the REACT learning 

model assisted by the fable-math book media has an effect on the mathematical problem 

solving abilities of IV grade students of SDN Gembong 01 Pati. Judging from the z test of 

classical student learning completeness on the final test results it can be concluded that the 

final score (posttest) of students can reach the predetermined minimum completeness 

criteria (KKM). In accordance with the research of Fatmala, et al (2016) that students' 

problem-solving abilities in mathematics after applying the REACT contextual learning 

model can increase with a classical average in cycle 1 of 58%, while in cycle II the 

classical average is 74%.  

Learning activities with the REACT model students are formed in heterogeneous 

groups to improve the development of students' abilities and skills. Herlina, et al (2012) 

stated that learning with the REACT strategy can develop problem-solving skills, present 

ideas and concepts from all perspectives through group learning as an effort to share-

responding-communicating with other students effectively. At the stage of cooperating 

activities or in groups, students' social care attitudes in learning were also seen. Students 

who have high understanding are more concerned with their group mates who do not 

understand the meaning of the material concept and problem solving problems, so that 

students can develop their abilities. This is reinforced by the statement of Asmahasanah, 

et al. (2018: 58) that REACT learning is good for elementary school social education 

because it is able to form an attitude of togetherness between students, form caring around, 

and deepen student understanding. 

Difference in average 

The effect on the application of the REACT model assisted by the fabel-math book 

media on students' mathematical problem solving abilities can be seen through the analysis 

of the mean difference. This average difference test is through the t test (Paired Sample T-

Test) with the help of the SPSS 25 application. The t test (Paired Sample T-test) is clarified 

in the following table. 

Table 5 Paired Sample T-test Results 

t Df Sig. (2-tailed) 

-15.338 20 .000 

Based on table 5, it shows that the results of this data test are sig (2-tailed) <0.05, 

namely 0.000 <0.05, then H0 is rejected and Ha is accepted. So it can be concluded that 

the use of the REACT learning model assisted by the fable-math book media has an effect 



 

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on the mathematical problem solving abilities of the fourth grade students of SDN 

Gembong 01 Pati. The application of the REACT model assisted by the fable-math book 

media shows that after being treated with the REACT model and the fable book media, 

the results of the students' mathematical problem solving abilities test are better than 

before being given the treatment. When learning with this model students have enthusiasm 

and enthusiasm which can be seen in the seriousness of students in paying attention to and 

following the learning steps that have just been received. This can make students' 

confident attitude to solve problems. In accordance with the opinion of Putri and Santosa 

(2015), courage and self-confidence in students can have an influence in solving problems 

related to life around them.  

The fable-math book media presented in the form of pictorial stories is used as a 

concrete form in learning, because grade IV students find it easier to digest something 

real. In line with Meylana, et al. (2019) stated that elementary school students have a way 

of thinking on the basis of concrete things, they need something real in the form of stories 

and pictures that can be found in their daily lives. In addition, the use of fable-math book 

media has an effect by making learning more fun and meaningful so that it can make it 

easier for students to understand and solve problems. For this reason students are able to 

solve problems starting from the stage of understanding the problem, planning solutions, 

and solving the problem. In Gunzel and Binterova's research (2016), it explains that media 

in the form of images can make it easier for students to understand mathematics learning 

and at the same time foster students' interest in learning. 

 

 

Improving Problem Solving Ability 

The analysis used to determine the increase in student ability is the N-gain test 

carried out in the Microsoft Excel 2010 application. The use of the N-gain test is to see 

the comparison of the results of the pretest and posttest scores of fourth grade students 

with the predetermined ideal maximal score (SMI). In detail, the results of the calculation 

of the N-gain test on the students' mathematical problem-solving ability test are described 

in the following table. 

Table 6 N-Gain Test Results 

Pretest Posttest N-gain Criteria 

55,83 77,34 0,512 Moderate 

In table 6, it is found that the results of the calculation of the N-gain test of students 

have increased the students' mathematical problem solving abilities by 0.512. This means 

that the increase in students' mathematical problem solving abilities is in the medium 

category. The analysis of improvement is in accordance with the criteria for improvement 

in the following table. 

Table 7 Student Improvement Analysis 

Criteria Banyak Siswa Presentase 

High 2 9,52% 



 

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Criteria Banyak Siswa Presentase 

Moderate 16 76,19% 

Low 3 14,23% 

There was no improvement 0 0% 

There was a decline 0 0% 

Table 7 explains that the increase in problem-solving abilities most often occurs in 

moderate criteria, namely 76.19% of 16 students. The increase in the low category was 3 

students with a percentage rate of 14.23%. The increase in the high category was obtained 

by 2 students or the equivalent of 9.52%. In addition, there are no student gains who are 

in the category where there is no decline and there is a decrease.   

The increase in students' mathematical abilities in the circumference and wide flat shapes 

was due to the use of the REACT contextual model assisted by the media of a fable-math 

book containing pictures with stories of local excellence. The learning model and new 

learning media they receive make enthusiasm and high motivation. According to Ardianti, 

et al. (2019: 8) learning media associated with local culture can make it easier for students 

to understand the concept of the material then make the learning they receive more 

meaningful, as well as teacher teaching skills related to classroom management can be 

improved. In addition, it is reinforced by the results of Haidar's research (2018) that the 

media in learning mathematics in the form of fable story books can improve mathematics 

learning outcomes in grade IV students of SDN 2 Tulungagung. At the time of 

implementing the REACT Model, which is accompanied by the fable-math book media, 

students seem to find it easier to catch and follow the steps to solve the problem, because 

in the mathematics fable book there are stages for problem solving. Agree with Pardimin 

and Widodo (2016) suggesting that learning will be more effective by providing guidance 

to students differently, one of which is the development of additional books such as story 

books that are equipped with stages in problem solving. 

 

 

 

CONCLUSION 

Based on the results of the research above, the following conclusions were 

obtained: (1) the use of the REACT model assisted by the fable-math book media on the 

average mathematical problem solving ability of the fourth grade students of SDN 

Gembong 01 to reach the KKM, (2) the proportion of students completness with the 

REACT model assisted by the the fable-math book media can achieve 75% classical 

completeness, (3) the mathematical problem solving abilities of the fourth grade students 

before and after the implementation of the REACT learning model assisted by the fable-

math book media experience significant differences, (4) through the REACT model 

assisted by the fable-math book media in Class IV learning can improve students' 

mathematical problem solving abilities. Some things that can be suggested are that the 

teacher should be more optimal in class management so that learning can fulfill what is 

wanted to be achieved, teachers who use this model must pay more attention to the syntax 

so that students can easily find the meaning of learning, and teachers should remind and 



 

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provide directions to students to do it. questions carefully and carefully read the commands 

in the questions. 

 

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