VISUAL-SPATIAL SKILLS AND MATHEMATICS CONTENT CONCEPTUALISATION FOR PRE-SERVICE TEACHERS

Received: September 09, 2021 Accepted: October 11, 2021 Published: November 20, 2021 Empirical evidence in literature identified significant association between spatial ability and educational performance particularly in science, technology, engineering and mathematics (STEM). The purpose of this study was to explore pre-service teachers’ spatial skills in solving mathematics problems, in the context of coordinate geometry. It is envisaged that spatial skills allow for the perception of visual information and, therefore, spatial cognition has been considered as a key skill in teaching mathematics. However, literature asserts that teachers are ill prepared to teach mathematics, hence there is limited use and misuse of spatial skills in teaching the subject. This study, therefore, examines the spatial orientation of pre-service teachers in teaching coordinate geometry. This is a mixed methods study in which pre-service teachers answered a coordinate geometry test to explore their content knowledge and their ability to interpret, analyse and apply visual spatial models to solve mathematical problems in coordinate geometry. The study established that the spatial orientation skills of pre-service teachers determine their performance in mathematics, especially coordinate geometry.

generate, transform and rotate a visual image and this includes the ability to recognise shapes through mental rotation. The integration of these mentally generated images gives rise to visual-spatial thinking [33][34]. The ability to represent a mathematical situation that way may therefore enable learners to organise their thinking in solving a mathematical problem, hence, facilitating conception of ideas [33]. In the same vein, [2,35] aver that spatial skills enable students to mentally manipulate, organise, reason about and make sense of spatial relationships. With spatial skills, a lot of information is mentally represented in spatial format [11,26]. To assist enhancement of spatial skills, most interventions focus on helping students to translate mathematical symbols or problem statements into spatial representations that include number lines, diagrams, concrete models, etc [36]. In another study, [37] reveals that there are two types of thinking processes in mathematics that include the verbal processes and the spatial processes. [37] emphasises that it is the non-verbal visuo-spatial apprehension that supports the deductive processes that is involved in solving geometric problems.
Previous studies have demonstrated a strong correlation between spatial skills and mathematics learning and achievement across all educational levels [2][3] [27] [38] [39]. In particular, [26] established a strong relationship between spatial skills and success in the many varied strands of mathematics such as geometry, mental arithmetic, calculus, algebra, word problems and more advanced mathematics. [40][41][42][43] concur that the spatial ability of a person can affect mathematical ability, and that the spatial ability has a positive relationship with students' ability to solve problems. It is envisaged that spatial skills allow for the perception of visual information, presenting the information internally, then integrate the information with past experiences in order to derive meaning and understanding of mathematical concepts. [37] thus advises that spatial training assists learners to organize situations with mental pictures during problem-solving in mathematics. The frequent use of diagrams, charts and images in showing relationships of mathematical components of a mathematical problem could therefore be a demonstration of spatial skills among learners [37]. This implies that, with spatial ability, individuals learn more easily when presented with visual, diagrammatic or symbolic information in contrast to verbal, auditory or language-based modality [44]. [44] argue that spatial ability involves the capacity to visualise and to graphically represent concepts. Learners with visual-spatial skills hence possess vivid imaginations that enable them to solve mathematical problems. [44]'s view also influences the idea that the ability to represent ideas graphically, the ability to interpret graphs and the ability to manipulate relationships visually indicates visual-spatial skills of learners in mathematics. [44] hence assert that spatial ability is necessary for problem-solving, reasoning and making connections, especially in mathematics.

Statement of the problem
Despite the fact that strong spatial skills are normally associated with success in STEM subjects and that there is convincing evidence that spatial skills are a reliable predictor of mathematics achievement in both high school and university [45][46], questions remain regarding achievement in spatial areas associated with mathematics. Crollen et al. [47] and [16] warn that scaffolding given by teachers sometimes lacks the spatial aspect, and students with low spatial skills tend to grapple with understanding the materials provided. Despite substantial attempts to enhance mathematics achievement among learners, poor performance in mathematics has been consistent the world over. In addition, the majority of studies to date, for example, Wai et al. [48] have however reported correlations between visual spatial skills and mathematics achievement based on primary

Indonesian Journal of Science and Mathematics Education
Visual-Spatial Skills and Mathematics …. and secondary schools but not university students. To date, no known studies have investigated the association between spatial skills and mathematics in university and the impact of spatial skills on mathematics content knowledge among pre-service teachers. Scant attention has been paid to the mathematics practitioner development regarding preservice teachers' visual-spatial skills to appropriately guide learners in solving mathematical problems. Since literature, for example, [49][50] assert that teachers normally share the same problems as those experienced by their students, it is likely that the teachers' challenges can be inherited by learners. The current study therefore explored pre-service teachers' spatial skills in solving coordinate geometry problems and also examined whether there is a connection between spatial skills and coordinate geometry performance among pre-service teachers.

Theoretical Considerations
Visual-spatial ability is a mental activity [37], hence, this study is informed by [44][51] theory of figural concepts. Fischbein's theory asserts that geometry in general deals with mental entities. The theory describes geometrical figures as having intrinsically conceptual properties. However, the figures are not just mere concepts but visual as well. A geometric figure, according to [51][52][53] therefore represent mental constructs which concurrently involve both conceptual and figural properties. According to [51], figural concepts reflect spatial properties such as shape, position and quantity/magnitude and at the same time possess conceptual qualities such as ideality, abstractness, generality and perfection. The figural concept is therefore a mental entity that contains figural and conceptual components and is handled by mathematical reasoning in the domain of geometry [51].
According to [53] generating and processing mental images take place within the process of acquisition and use of visual-spatial abilities. Spatial reasoning involves 4 classes of image processing, namely generating an image, inspecting an image to answer questions about it, transforming and operating on an image and maintaining an image in the service of other mental operations, which are all aspects that propel the development of figural concepts [53]. Based on this theory, this study explores the impact of spatial skills in solving coordinate geometry tasks among pre-service teachers.

METHOD
The entire research procedure is given below in Figure 1. This is a mixed methods study where a test was used to collect data from pre-service teacher participants. However, the data was analysed both quantitatively and qualitatively. The participants were secondary school pre-service teachers who had already taken geometry course as part of their training. The forty (40) purposively selected pre-service teachers answered questions on mathematics content, coordinate geometry in particular, that were both non-visual (with written words) and visual using graphical representations with information for the solutions. The non-visual tasks tested the content knowledge whilst the visual tasks tested the spatial knowledge of PSTs. The pre-service teachers answered the questions to ascertain their understanding of the topic and to explore their ability to interpret and analyse visual spatial models to solve mathematical problems in coordinate geometry. The performance of the pre-service teachers in the two sets of data (visual and non-visual) were then compared quantitatively to identify some specific trends in the two performances, in order to establish the relationship between spatial skills and content knowledge. The means and standard deviations for the two sets of data were calculated to facilitate the comparison of the two constructs. The means of the two sets of data were calculated and compared using the paired two tailed t-test to find out whether there was a significant difference between them. The means were compared at 5% level of significance. The result of the t-test was followed by a verbal analysis of the outcome [See Qualitative data that allowed pre-service teachers to describe their understanding of visual-spatial models was categorised and coded as it is given in Table 1. Some categories that manifested the use of spatial skills were determined from the behaviours observed in the solution of the problems. For ethical reasons, all the names displayed in the presentation and analysis of data are pseudonyms. [44] Posit that the ability to represent ideas graphically (drawing), ability to interpret graphs (showing relations) and the ability to manipulate relationships (correct answers and breaking set) visually indicates visualspatial skills of learners in mathematics [44]. Some categories that manifested the use of spatial skills were therefore identified from overt behaviours observed in the pre-service teacher solutions. The Categories manifesting the use of spatial skills (Adapted from [37]) are shown below. Categories Description 1 Drawing Relation Indicated a marking or drawing with which the pre-service teacher was attempting to show a mathematical relationship visually rather than just to keep track of a counting process 2 Correct Answers Indicated whether or not the pre-service teachers found the correct answer to the problem. The ability to interpret the visual spatial models would be evidence of the existence of spatial skills in the PSTs 3 Failure/ability to Break Set Indicated whether or not the pre-service teachers could demonstrate an ability to break the problem apart, did not change a mind-set that would provide an incomplete or inaccurate solution. Since spatial skills require re-seeing or looking at something in a new way, inflexibility in breaking a mental set could indicate a lack of spatial skill use 4 Draw Picture Indicated the drawing of a diagram, graph, chart etc to provide visual or spatial relationships. Drawing reflects the skill to plan (spatial-visual skill) before solving a problem, [54] 3.

RESULTS AND DISCUSSION
This study explored pre-service teachers' spatial skills level and how the skills impacted on their performance in mathematics content, coordinate geometry in particular. Quantitative and qualitative analyses were carried out to determine the findings described in the subsequent sections.

Indonesian Journal of Science and Mathematics Education
Visual-Spatial Skills and Mathematics ….

Quantitative Analysis of Spatial and Content Knowledge
Below is a quantitative presentation and analysis of the results for PSTs' performance in the non-visual content of CG and spatial tasks in CG. The quantitative data comprised questions that required PSTs to determine if the given mathematical tasks were true or false. Table 1 presents a t-test analysis of the relationship between the two sets of data in the survey meant to test the PSTs' content and spatial knowledge. The means (µ1, µ2 ) and standard deviations (s.d) for content data and spatial data are respectively shown in table 1. The p-value for the two sets of data was calculated at 5% significant level using Excel. The results are shown in Table 1 below. H0: µ1 = µ2 (CK and spatial skills are closely related) H1: µ1 ≠ µ2 (There is a significant difference between the two constructs) P -value = 0.2427 > 0.05.
The results show that we do not reject H0 but rather conclude that there is sufficient evidence at 95% confidence interval to claim that PSTs content performance is equal to performance in spatial tasks of CG. This means the two constructs (content and spatial knowledge) are closely related. This close relationship could be ascribed to the fact that PSTs were able to interpret and analyse spatial models with ease, which impacted on and propelled their performance in the content that was non-visual. The result also resonates with those of [12][25] that showed that the ability to apply spatial skills in mathematics teaching is interwoven with the understanding of mathematics content and could be necessary for mathematical reasoning skills. In addition, [13] assert that performance in spatial reasoning tasks was found to correlate with performance in mathematical tasks. To confirm this assertion, the raw marks scored by some PSTs indicated that those with lower marks (below average) in spatial tasks (mean 85%) scored below average in content (mean 81%), for example, R10 had 29% (below average) in spatial tasks and scored 71% (below average) in content. R32 had 57% in spatial tasks and scored 63% in non-visual-content, all below average. The same applied to R46 who was below average in both spatial tasks and non-visual content.
Generally, the study revealed that the PSTs who scored above average in spatial tasks were also above the average performance in non-visual content except for 3 PSTs only, viz, R20, R35 and R42 which the researchers considered as insignificant. The general performance is a reflection of the interdependence that exists between spatial skills and content knowledge. An analysis of correct and incorrect responses for each question item was also done to ascertain the pre-service teachers' areas of difficulty. In Figure 2, questions such as 1, 6 and 17 received the highest score (over 95% of the PST got them correct) whilst questions 12, 13, 15, and 16 received the lowest scores. Analysing the questions revealed that PSTs were more successful in tasks that required substitution into a formula or definitions of concepts, than the ones that needed the use of graphs/sketches to solve. For example, for question 1 (98%), PSTs were required to find the length of the line joining 2 points, in which they used the distance formula √( 2 − 1 ) 2 + ( 2 − 1 ) 2 to find the answer. Although [32] allude that processes of spatial thinking may include low levels of thinking, such as recognizing, defining, and listing, [29] foregrounded that spatial thinking should enshrine advanced thinking of a spatial nature, based on expert knowledge. It is possible that pre-service teachers could just use the formula that they internalised before, without clear conception of the formula, and this conflicts [44]'s definition of spatial ability. On the other hand, question 12 required PSTs to determine whether y = mx + md is the equation of a line with gradient m and intercept d on the x axis. The PSTs performance was quite low on this task (53%), implying that 47% of the PSTs could not get the answer correct. According to [33] the ability to represent a mathematical situation in the mind's eye enables learners to organize their thinking in solving a mathematical problem, hence facilitating conception of ideas. The fact that most students struggled to answer this question was a signal of a deficit in spatial awareness because they could not make sense of spatial relationships [2,35]. The authors believe that the PSTs could have re-written the question in form of a Cartesian graph in order to demonstrate their conceptual understanding of the gradient of a line. The inability to demonstrate the relationship between the graph and the equation was enough evidence of thin spatial ability among students. According to [36], spatial skills should enable students to translate mathematical symbols/equations into spatial representations that include graphs. Some PSTs, for example, R3 and R26, sketched the line graph as part of their working and got the answer correct. This result indicates that the graphs drawn had considerable impact on R3 and R26's successful identification of the gradient of the line. Failure to answer this question was further indicative of the fact that PSTs' visual-spatial abilities were generally low as concurred by [44] who argued that spatial ability involves the capacity to visualise and to graphically represent concepts in mathematics. Drawing upon the theory of figural concept, [53] explain that generating and processing mental images take place within the process of using visual-spatial abilities.

Indonesian Journal of Science and Mathematics Education
Visual-Spatial Skills and Mathematics …. believe that the graph therefore played an important role in some of the PSTs reasoning on this question.

Qualitative Analysis of Spatial and Content Knowledge
Below are example questions adapted from the survey to give information about the PST's spatial orientation skills. Linda and Charles walk into the class and after observing for a few minutes Linda asks Charles, "Don't you think ABCD is a square?" Charles disagrees. Find which of them is correct and why? 35 3 Study the graph below and find out whether the two lines y = x -1 and 3x + 4y = 24 are perpendicular.  Figure below shows the supply and demand of labour for a particular industry in relation to the wage paid per hour. Supply is the number of people willing to work for a particular wage, and this increases as the wage paid increases. Demand is the number of workers that employers are prepared to employ at a particular wage: this is greatest for low wages.
• In figure above, show all the necessary steps to find the equations representing the two lines. • In figure above, giving reasons, find the coordinates of the turning points of the two curves • In figure above, state whether the turning points in Figure 7 are minimum or maximum points on each of the curves. Justify your answer.

and 33
In this study, some categories that manifested the use of spatial skills were identified from the conspicuous trends observed in the PSTs solutions as it is explained in Table 1.

Draw Relation
It was a tall order for most PSTs to form relations between concepts. For example, on item 27, figures 5a and 5b show two different visual representations of the same equation + = 1. PSTs were expected to use visualisation skills and knowledge of symbolic language to explain the concept represented by the 2 graphs. The question tested PSTs understanding of graphical representation, that is, the ability to recognise that a line can be represented in different forms, thus, externally expressing mental visual model (line graph) in a different format (equation). A significant number of PSTs (62,1%) had challenges demonstrating the relationship that bound the two-line graphs [ Figure 5]. This was an illustration of a lack of the skill to process what one could see in order to understand

Indonesian Journal of Science and Mathematics Education
Visual-Spatial Skills and Mathematics …. and visualise the spatial relationship between the 2 graphs. Taking heed of [20]'s idea, spatial skills should assist students to understand spatial relationships between images and help them to visualise various scenarios. [31] concurred that spatial skills afford learners the ability to transform visual images. So, failure to establish the relationship between the two graphs and the line + = 1 resembled a lack of spatial skills in the PSTs.
In addition, not all participants could visualise that the 4 points on the plane formed a square on item 25. Although a bigger number were agreeable that the objects formed a square, the reasons provided were not quite satisfactory. The PSTs concluded that the figure was a square by just looking at the 4 equal sides displayed on the plane. For example, R4's response was as follows. Participants tended to imagine of a square with 4 equal sides and not the ideal perfect mathematical square which is the object of mathematical reasoning and includes the representation of spatial properties [51]. The figure was not just a quadrilateral with 4 equal sides but also had equal angles which were right angles and had equal diagonals. Their responses suggested a lack of concept definition of a square. The results showed that 82.1% against 17.9% of the PSTs had challenges proving that the image was a square. According to [51], the properties of a geometric figure are derived from definitions in certain axiomatic systems. This implies that the square in the question had a conceptual nature controlled by its definition, which the participants failed to realise. In observing the image, the participants failed to show a thorough understanding of the concept of a square. Unless participants understand that the image has intrinsically conceptual properties, they would solve the problem based on what they see only (visual component) yet images and concepts interact intimately [51]. [51] affirms that most people act as if no other quality counts while operating with a geometrical figure and this exhibits lack of real conceptual understanding of the figure. The participants' inability to prove the square could therefore be an indication that the figural and conceptual systems have not yet blended in germane figural concepts, and this reflects visuo-spatial skills deficiency [51]. [52] also stressed the interaction between a geometrical figure and a geometrical concept, but asserts that, from the students' perspectives, there can be a tension between the two.

Correct Answer
Visuo-spatial skills have been found to predict mathematical achievement [26][45] [48] and getting the correct answer without a hint or assistance is a manifestation of spatial skills in a learner [37]. A significant number of PSTs had correct answers that they obtained without a hint from most of the tasks in the test. However, the answers were presented in various forms. Some were verbally described while some were solved with the aid of images. As for the questions that had images, the interpretation differed. For example, in item 24, spatial orientation skill appeared to be indicated in several ways where geometric content was involved. After being asked to find out whether the 3 objects given on a │ Visual-Spatial Skills and Mathematics …. Cartesian plane were in a straight line, several PSTs exhibited the skill of ascertaining ideas through observation of images and ability to determine their position in relation to each other. This was an exhibition of spatial skills in the PSTs according to [30] who contends that visual-spatial skills provide learners with the ability to perceive two or more objects in relation to each other. On the same item 24, a quarter of PSTs (25%) used a ruler to join the 3 objects, which was however a lower level spatial skill of finding the answer. [32] contends that processes of spatial thinking may include low levels of thinking, such as recognizing, defining, and listing. R1 is an example of the PSTs who responded this way: Other PSTs (35%) used algebraic principles of finding the gradients of AB, BC, and AC which were all equal to 1. A few PSTs (10%) made use of distances of segments where they showed that distances AB + BC = AC. For example R18 wrote: A slightly fewer (7.5%) calculated the equation of AB and substituted point C to ascertain whether C satisfied the equation for line AB. A total of 77.5% PSTs therefore got the correct answers on item 24 with the aid of the image. They were able to interpret the image, and solved the problem in various ways and this portrayed some level of visual spatial skills according to [21] who concurs that spatial ability is the capacity to see, inspect and reflect on spatial objects, images, relationships and transformations. However, 22.5% of the PSTs tried to answer the same question by verbally describing the solution and got the wrong answers. For example, R7 explained that the 3 objects were in a straight line "because A, B, C form a straight line when joined together." R46 also wrote, "Yes, because they are collinear and they are all on the same quadrant." The different ways with which the PSTs responded to item 24 confirm the results of the study by [37] that there are two groups of PSTs mathematics students, namely the low and high spatial orientation groups. The current study revealed that the low spatial group, that is, those that attempted to solve the problem by verbally describing the solutions got the answers wrong. The PSTs R7 and R46 hence portrayed a deficiency of spatial skills on this question. Their performance

Indonesian Journal of Science and Mathematics Education
Visual-Spatial Skills and Mathematics …. concurs with [37] who explains that any attempt to verbalise the process involved in spatial thinking ceases to be spatial thinking. [37] emphasised that it is the non-verbal visuospatial apprehension that supports the deductive processes that is involved in solving geometric problems. The participants (R7 & R46)'s interpretation of the images was incorrect and they did not have adequate figural concept for the line. With reference to item 26, some PSTs, by a mere look at the graph, they concluded that the two lines were perpendicular to each other, which was not correct. For example, R17 wrote: "They are perpendicular because the two lines slopes are negative reciprocals of each other, they also form right angles." Though the graph was an image and a spatial representation, its properties were imposed by an abstract definition where the product of the two gradients, after calculating algebraically, should be a negative one for the two lines to be perpendicular. [51] advises that PSTs ought to be trained to follow carefully the requirements of the definition, sometimes in apparent contradiction to the suggestions of the figure, which is a reflection of visual-spatial skills.

Failure to break set
This study showed that the PSTs who attempted to answer some questions using verbal descriptions (low spatial orientation group) had challenges in solving some tasks and the same participants also dominantly failed to break set for geometric problems. In items 32 and 33 (Figure 7), participants had various ways of interpreting the models (graphs). In these tasks, PSTs were required to find the coordinates of the turning points and to determine whether the points were maximum or minimum respectively. The participants used various approaches to interpret the sketches to find the coordinates of the turning points and determine their status (max/min). Slightly less than a quarter (22.5%) used the principle of calculus (differentiation in relation to gradient, e.g. ( 2 − 4 + 1 = 0)) to determine the turning points. Very few (5 %) used the method of completing the square to find the turning points, for example, if: y = 2 − 4 + 1 ⇒ y = (x-2) 2 -3. Therefore, y can be only minimum when (x -2) = 0. ⇒ x = 2 for y = -3. Hence the minimum point is (2,-3).
A quarter 25% used the concept that a quadratic graph turns at a point where x = − 2 from the general quadratic equation ax 2 + bx + c = 0. R24 presented her answer as follows: of [21]'s study which pointed out that geometry learning today is characterised by memorising the vocabulary and application of formulae in routine calculations. Slightly more than half of the PST (52.5%, that is, 22.5 + 5 + 25 %) demonstrated the ability to describe the 3 models. This ability to interpret visual models and determine algebraically the concept of the turning point in relation to the given sketches is a reflection of the presence of spatial skills in the learners [44]. [44]'s view shows that the ability to represent ideas graphically, the ability to interpret graphs and the ability to manipulate relationships visually indicates visual-spatial skills of learners in mathematics. However, 47.5% were not flexible enough to use any one of the models alluded to above to come up with the corrects answer. Failure to re-visualise the graph in a different format and use the format to develop the concept x = − 2 was a reflection of a lack of spatial skills to solve the problem in the PSTs because students with low spatial skills tend to have problems understanding material provided [16][17 [18].
In addition, although a significant number of participants got correct answers, PSTs like R22 and R29 showed that their estimate level was low as reflected by the way they responded to item 32. Taking heed of [47] study which found that learners with poor visuospatial skills have less accurate estimation performance than those with good visuo-spatial skills, the low estimate level of the PSTs resonates with low visual spatial skills. In this question, the visual apprehension of the appropriate points of the figures were tested. R22 and R29 could not even estimate to link their answers to the positions of the graphs on the plane. For example, on the graph, the turning point of y = 7-x 2 is on the positive side of the y-axis but R22 is showing this as negative (1;-2): However, the position of the turning point is on the negative y-axis. The PSTs could not therefore change their mental set that provided an incorrect/inappropriate solution. According to [37], this is indicative of a lack of spatial skills in the PSTs, because individuals with spatial skills should be able to interpret visual spatial models/graphs.

Draw picture
Drawing is considered as a means of planning and assembling ideas together [54] in the process of solving mathematical problems. Furthermore, drawing and spatial abilities share common conceptual ground and are dependent upon spatial abilities [55]. The ability to make sketches/graphs/charts before answering a problem was considered as a spatial skill among the PSTs in this study. However, only a few PSTs could draw some lines to provide visual spatial relationships to solve some tasks in the test. Although there were few questions in the test that needed drawing, for example item 29, most PSTs had challenges solving the problems. Item 29 required the PSTs to estimate the values of supply (L) and demand (W) at which the market clears. The graph was given but most PSTs calculated and equated the equations of L and W in order to find the point of intersection. Whilst this was an acceptable method to find the values of L and W at which the market clears, there were very few PSTs who got the correct answer because, in the process, they committed several computational errors. The algebraic principles they tried to apply failed them. Instead of using the graph to draw horizontal and vertical lines from the point of intersection to the axes to estimate the solution, most of them were not flexible enough to use this method which the authors thought was going to be an indication of spatial orientation skills in the PSTs. This decision was influenced by [37] who posits that the ability to add marks (to a graph) to show mathematical relationships portrays the spatial orientation skills in a learner. Among the 40 participants who answered this question, not even a single participant drew the lines to obtain the solution. [37] contends that high spatial orientation individuals are therefore better able to estimate the approximate magnitude of the answer than the verbal orientation ones. Failure to draw the lines was therefore indicative of low spatial orientation skills. Spatial orientation skills assist individuals to find their orientation in space through making use of available information and organising that visual information to create an understanding of meaningful patterns [20].

CONCLUSION
This study explored the relationship between PSTs visual-spatial orientation skills and their content knowledge in coordinate geometry. The results of the study demonstrated that the PSTs' spatial skills were related to their content knowledge in coordinate geometry as reflected by the quantitative analysis of the study in Table 2. The study also established that there were some PSTs who employed more verbal descriptions of the relevant information in a problem than others (See section 3.2.2). Generally, the PSTs who displayed high spatial visualisation skills are the ones who scored most of the answers correctly. This is evidence that the PSTs operated at different levels of spatial ability. In light of this, [37] talks about low and high spatial visualisation skills as well as low and high verbal skills in solving mathematics problems.
The findings also indicate that only a few PSTs demonstrated adequate figural concept knowledge relating to coordinate geometry. Some PSTs could hardly identify or find the turning points appertaining to the prototypical image of the graph in Figure 7 because they focused more on algebraic calculations excluding the figural component of the image/model, for example, R22 and R29. [53] aver that spatial reasoning involves generating an image and inspecting the image to answer questions about it. [37] explains that spatial skills enable the subject to make sense out of visual information. Based on these results, the authors concluded that the conceptual and figural aspects were not harmonised in most of the questions, which could be a visual-spatial reasoning deficiency among PSTs.
The study recommends that it is necessary for PSTs to focus on the figural concept aspect of a task in coordinate geometry to demonstrate spatial skills in solving mathematical problems appertaining to geometry. It is also essential that PSTs are acquainted with such skills (figural concepts) because teaching for spatial reasoning requires teachers to have conceptual understanding of properties of figures, their position in the space, their connectedness between them in the formation of theorems and the learning of other mathematical concepts [21].