Commognitive Analysis Of Students' Errors In Solving High Order Thinking Skills Problems

This study aims to describe the commognitive analysis of students' errors in solving High order thinking skills problems. The problem of this study is that students have difficulty of solving mathematical problems because students do not build their own knowledge of mathematical concepts but tend to memorize concepts so that when students solve math problems students often make mistakes and do not find solutions to solve these problems. Students also taught themselves that math is difficult. This type of research is a qualitative description. The research subjects were three grade X students of Senior High school 1 Pamekasan. The instruments used in this study were mathematical problem seets and semi-structured interviews. The results showed that students experienced faults in 1) word use (mistake writting mathematical symbol and not consisstent in writting naming. the factors are hasty, inaccurate, not understanding the questions, incomplete writing is known, and asked, not understanding the material.); 2) Visual mediator (mistakes in drawing or illustrating the problem. Student is not using visual mediators, some students use visual mediators but are still wrong and use it,); 3) Narrative (not writing the formula but writing the results directly. Student mistakes also occur because students do not know the strategy that will be used to solve them, while the students' mistakes made at this stage are: students are wrong in writing the formula definition sine and wrong for not writing the formula.); 4) Routine (inaccurate in arithmetic operations so that the final answer is wrong. The mistakes of some students in general in doing routine are the students doing wrong calculations, wrong in substituting values or numbers that are known in the formula.). With this research, teachers can find out where the difficulties and misconceptions of students are in doing it so that it becomes new learning for students to improve learning outcomes and minimize errors.


Introduction
Mathematics is a basic science that is widely used in all fields of human life, even mathematics has been taught since elementary school students to college, this is important to do so that early on, students are required to recognize the basic concepts of mathematics. Sullivan (2011) states that Mathematics is not only a numeracy skill but mathematics also covers concepts and structures. In mathematics, all material previously studied has a relationship with each other as stated by Li & Schoenfeld (2019) that mathematics is a structured science, with initial abilities being a prerequisite for subsequent abilities. So that the basic concepts of mathematics must be taught since elementary school because these basic concepts are used as a reference or guide for students in solving mathematical problems. Mathematical problem solving becomes a very important thing to be instilled in students because problemsolving is able to develop students' thinking abilities (Saragih & Habeahan, 2014). This is in agreement with Subanji (2015) that the field of mathematics is one of the fields of study that can encourage students to think. The ability to solve problems is the focus of schools at all levels (Hossain, 2015). Solving mathematical problems derived from mathematical problems in the form of a mathematical problem in which there needs to be a solution. There are two types of mathematical problem solving namely routine problem solving and nonroutine problem-solving (Sipayung & Anzelina, 2019). Routine problem solving uses standard procedures known in mathematics (Kurniati and Zayyadi, 2018). Whereas the non-routine problem solving problem provided is an unusual problem situation and there is no definite standard to solve it. Not all students are able to solve mathematical problems with correct problem solving, students sometimes have difficulty in solving mathematical problems. The difficulty of students in learning mathematics is because students do not build their own knowledge of mathematical concepts but tend to memorize mathematical concepts without knowing the meaning contained in these concepts so that when students solve mathematical problems students often make mistakes and do not find the solution to solve the problem (Acharya, 2017). The difficulty of learning mathematical students is not only caused by ineffective learning but may also be caused by differences in personality types possessed by each individual (Karimah, et al., 2018). Even though the basic concept of mathematics used to solve every mathematical problem has been learned since elementary school. As an example in trigonometry material, trigonometry is material found in high school but the basic concepts in working on trigonometry have existed since junior high schools such as the Pythagorean theorem, the concept of triangles and the basic concepts of rank and root shapes. There are five standards of mathematical material that must be studied from prekindergarten to Class XII, namely number and operation, algebra, geometry, measurement, data analysis, and probability (NCTM, 2000). Of the five mathematical standards geometry (the concept of Pythagoras) and measurement are the provisions of students in solving trigonometric problems so that if students do not master these basic concepts students will have difficulty in solving problems. With indications of difficulties in solving problems experienced by students, it is necessary to have an analysis of errors made by students in the process of solving the most common mathematical problems on high order thinking skills trigonometry problems. High Order Thinking Skills (HOTS) is divided into four groups, namely problem solving, making decisions, critical thinking and creative thinking (Arif, 2019). While the process of solving the high order thinking skills problem is a process of thinking someone. Sfard (2018) assumes that thinking can be conceptualized as someone's communication with himself. Commognitive is a combination of the words communication and cognitive. This means that communication and thinking are two sides of one activity called commognition. Commognitive methodology analyzes students solving mathematical problems (Presmeg, 2016). Commognitive components consist of word use, visual mediator, narrative, and routine (Sfard, 2008(Sfard, , 2010Zayyadi, et al, 2020). Word uses refers to ordinary words used in daily communication, but with unique and specific meanings in mathematics, such as differentiation, boundaries, and points (Sfard, 2007). Visual mediators are objects that look like symbols, graphs, and diagrams that participants use in mathematical discourse to identify objects into focus (Nardi, Ryve , Stadler, & Viirman, 2014; Berger, 2013). The narrative is the sequence of text, oral or written, which is used as a description of objects that are labeled true or false. In mathematical discourse, the approved narrative is known as mathematical theory (Sfard, 2007;Zayyadi, et al, 2019). Routine is a combination of metarules that describe discursive actions (Sfard, 2008). Error analysis of students in solving high order thinking skills trigonometry problems with commognitive is important to do because this can see the difficulty of students in solving problems not only with the final results obtained but also in word uses, visual mediators, narrative, and routines used. In this study, word use is words, symbols, mathematical symbols, naming information in pictures, which are used by students in the process of solving problems. Visual mediator is a sketch that is used by students in illustrating problems into pictures. Narrative is the formula used in solving problems and theorems used to solve problems. routine is the stage where students substitute the known into the formula or theorem that has been written. After that, the results of the error description are used to determine the location of students' difficulties in the process of solving problems so that in the future students are able to minimize errors.

Method
In accordance with the problems studied, this research is qualitative descriptive research because this study intends to describe the error analysis of students in solving high order thinking skills trigonometry. Descriptive research is a research method that seeks to describe and interpret objects according to what they are. This research was conducted online (via WhatsApp) with 3 subjects of class X students of SHS 1 Pamekasan, three subjects made mistakes in solving problems with the initials subject 1, subject 2, and subject 3. The research instruments used to obtain research data were 1 ). Written test in the form of a math problem sheet 2) Semistructured interview guide. The problem sheet and the interview results are used as a guideline for researchers in bringing up the 4 framework commissions of students namely word use, visual mediators, narratives, and routines. The problem sheets given to students are as follows:

Figure 1. High Order Thinking Skills Questions Given to Students
Data collection techniques are the most strategic step in research because the main purpose of the research is to get data. Data collection techniques used in this study are (1) Collection of library data, which is looking for references related to cognitive; (2) field data collection, namely answers to questions belonging to the subject and the results of semi-structured interviews. Activities in qualitative data analysis are carried out interactively and continue continuously until completion so that the data is already saturated. Activities in data analysis, namely data reduction, data display, and conclusion drawing/verification (Sugiyono, 2012). Data analysis in this study was conducted by 1) the process of data reduction, namely activities that refer to the process of compiling, selecting and simplifying the written test results and interviews, 2) presenting data where the researcher will show the data in the form of a description to give a picture of a neatly arranged set of information, and organized so that it is possible to draw conclusions from the data. 3) Draw conclusions, namely the activity of summarizing data and checking the truth of the data.

Results
This study uses cognitive recognition in which each subject error in solving problems is adjusted to the four cognitive frameworks according to Sfard (2018), namely word use, visual mediator, narrative, and routine. 3.1 Problem 1 3.1.1 Subject 1 (S1) Figure 2. Word use that used by S1 Word use Subject 1 uses word use but writes what is known to be incomplete and inaccurate and S1 does not write what is asked. The mistake made by S1 is writing with large angles , so S1 is also wrong in writing and as an explanation in the picture, subject 1 writes and also the AB line = 2 km. Visiual mediator Error by S1 in word use continues until the visual mediator, S1 describes the visual mediator by illustrating the problem with a triangle. In figure 3 S1 draws a triangle ABC but does not explain the line drawn from point C is a high line or bisector because S1 does not provide a perpendicular or a sign for the image. Narratives In solving problems, S1 begins by using the sine rule formula to determine the length of the BC side, namely . after that S1 determines the length of the side of the CD by using the sine definition namely but S1 made a mistake in determining the length of the side of the CD by writing it down so that clarification was made to S1 in its mistake to write the formula for the definition of sine, subject 1 made the mistake because S1 was inaccurate but after being clarified it turned out that S1 understood very well about the definition of sine Routine S1 uses a routine with a completion strategy that was chosen in the previous step, subject 1 substitutes the length of AB, the angle of A and the angle of B in the sine formula and performs a computational operation but in the process of determining the BC side length subject 1 makes a mistake in determining the angle sin 30 and cos 45 so that the calculation operation error occurs. so as to produce the BC side length namely After that subject 1 substitutes the length of the BC side = in the sine definition formula and subject 1 made a mistake that continued from the Narratives stage by incorrectly substituting large 3.1.2. Subject 2 (S2)  Subject 3 uses visual mediator well, which illustrates the problem so that it appears in the picture above, the sketch made by subject 3 is two triangles that have their respective angles Narratives Word use In this second problem, subject 1 writes the known but not the question asked. The first subject 1 writes the speed symbol with the symbol V = 50 miles / hour but in naming the speed in B subject 1 no longer uses the symbol V but writes as usual "speed in B", the second subject 1 made a mistake to write the symbol angle, symbol written by subject 1 is a symbol of the sign "less than" and the third subject 1 is also wrong in writing and the last as a description in the subject 1 picture also write down side length AB = 150 miles. b. Visual mediator Figure 11. Visual mediator use by S1 The subject 1 error in word use continues on the visual mediator, Subject 1 writes the visual mediator by illustrating the problem with a picture that is a triangle but subject 1 does not give a perpendicular sign to the illustration of the picture because it made a mistake in the previous stage Narratives Figure 12. Narratives and routine use by S1 First, in solving problem 1, subject 1 uses the speed formula to determine AB distance, but subject 1 does not write the formula. after that subject 1 uses the sine definition to determine the BC distance and again subject 1 does not write the sine definition formula used, subject 1 immediately writes after clarification, it turns out that subject 1 understood very well about the two formulas but forgot to write them down and the second after finding the distance BC subject 1 searched for the time taken from B to C to write the speed formula but at this stage subject 1 wrote the formula Routine Subject 1 uses routines by implementing the chosen strategy, namely substituting known numbers to find the BC distance, subject 1 substitution however subject 1 writes using the degree symbol instead of miles after BC it is known that subject 1 searches for travel time B to C by substituting in the speed formula and finally subject 1 changes from units of hour To units of minutes by multiplying . Figure 13. Word use and visual mediator use by subject 2 Word use Subject 2 uses word use well, namely by specifying x = distance from B to C and writing the formula distance A to B, as well as captions in the picture Subject 2 writes large dan and AB =150 miles. Visual mediator Subject 2 uses the visual mediator well, that is, subject 2 illustrates the problem in the picture that is a right angle even though subject 2 did not draw it using a ruler Narratives Figure 14. Narrative and Routine use by S2 Subject 2 uses the sine definition formula that is sake (oblique front) to find the value of x where x is the distance B to C after that Subject 2 uses x to find the required travel time from B to C using the formula speed x = v. t then subject 2 changes the unit from hour to minute by multiplying it by 60. Routine Subject 2 substitutes the numbers known in the sine formula to find x, which is to write sin 30 by and replace the front edge of angle 30 by x and the hypotenuse by 150 so that subject 2 finds x = 75 miles after that subject 2 searches for travel time by substituting x = 75 and v = 100 so it produces t = hours but because the question asked is minutes, subject 2 converts it into units of minutes so that the resulting time takes 45 minutes. 3.2.3 Subject 3 Figure 15. Word use and visual mediator use by S3 Word use Subject 3 uses word use well that is writing known and asked, subject 3 writes miles as explanation on

Subject 2
Gambar subjek 3 menuliskan and write down the angle at each point of the triangle, respectively and also subject 3 write what is asked with symbols (time) Visual mediator Subject 3 uses visual mediator well to make it easier to work on the problem by illustrating the problem with the picture and sketching it according to the provisions in the problem, but at this stage subject 3 sketches the image without using a ruler Narrative such that miles after that subject 3 substitutes values miles and to formula so the final value is found hours and finally subject 3 changes the unit of hours to minutes by multiplying t hours by 60 such that minutes.

Discussion
The results of this study describe the mistakes of class X students in solving high order thinking skills trigonometry material. This student error was obtained from the results of a math problem sheet and an interview. The following will be discussed based on the cognitive frameworks namely Word use, Visual Mediator, Narrative, and Routine: Word use Student mistakes in solving problems occur because students are using word use properly and completely. There are habits of students in solving problems without writing down what is known and asked but students can solve the problems given (Carson, 2007). As for the mistakes of some students in using word use, which is wrong in writing mathematical symbols, inconsistent in writing naming, wrong in writing a value, this is consistent with the claims of Hoch and Dreyfus (2004) that there is no correlation between student structure and manipulation skills. this agrees with this case because students are not careful in reading the questions. The factors that cause students to mistake in working on story problems are hasty, inaccurate, not understanding the questions, incomplete writing is known, and asked, not understanding the material (Nurussafa'at,et al., 2016). Visual mediator Student mistakes in solving problems occur because one of them is not using visual mediators, visual mediators will make it easier for students to solve problems with the help of illustrating problems in the form of images so that will minimize the occurrence of errors, but some students use visual mediators but are still wrong and use it, the first is some students' mistakes occur because students do not write perpendicular marks on the triangle that has so that the triangles drawn by students will be confused between random triangles and right angles elbows, and students also misrepresent triangles because they draw triangles incorrectly, students draw triangles without estimating the magnitude of each angle on the triangle. Widdiharto (2008: 41) states that careless work done by students when solving mathematical problems causes errors in the work process. Narrative Student mistakes in solving problems also occur because students do not know the strategy that will be used to solve them, while the students' mistakes made at this stage are: students are wrong in writing the formula definition sine and wrong for not writing the formula. This is following the opinion namely procedural errors are errors in compiling systematic hierarchical steps to answer a problem (Mulyana, et al., 2019) Routine After determining the strategy chosen by students in completing the questions students carry out the chosen strategy, this shows the Routine that students do. The mistakes of some students in general in doing routine are the students doing wrong calculations, wrong in substituting values or numbers that are known in the formula. Strengthened by Reid's research results in (Jamaris, M., 2013: 186) said that the characteristics of children who have difficulty learning mathematics are characterized by the inability to solve problems related to aspects of understanding in the process of grouping, adding and subtracting, visual perception, perception auditory, calculate, and transfer knowledge. Students are less careful in counting and students are wrong in counting due to haste (Powell & Fuchs. 2012).

Conclusion
Based on the results of the analysis and discussion, students' mistakes in solving trigonometric problems based on 4 frameworks are as follows 1). Word use in the form of student errors in writing mathematical symbols, inconsistent in writing the naming of symbols, writing the known but not those asked. 2) visual mediator in the form of student error in drawing random origin confusing 3). Narrative in the form of an error does not write the formula first but goes directly to the counting phase 4) Routine in the form of a student error in performing a count operation. By analyzing students' mistakes the teacher can find out the location of difficulties and misconceptions of students in doing so that it becomes new learning for students to improve learning outcomes and minimize errors. with mistakes analysis with a commognitive point of view provides an overview of thinking and communication of some error analysis in solving mathematical problems.