Graphing Misinterpretations and Microcomputer-Based Laboratory Instruction, with Emphasis on Kinematics

by Lisa Denise Murphy

Introduction

Two Common Misinterpretations of Graphs

Graph Interpretation and Kinematics Knowledge

Graph-as-Picture in Kinematics

Slope/Height Confusion in Kinematics

Is Slope/Height Confusion a Problem of Graph Interpretation?

Microcomputer-Based Laboratory Instruction

Explaining the Success of the MBL

Graphing and Cognitive Development: Which Comes First?

Conclusions

References

Back to Lisa's Papers page.

Back to Lisa's Academic Activities page.

Back to Lisa's personal home page, Over the Rainbow.

Send Lisa email.

Introduction

Line graphs showing the value of a variable over a period of time are used extensively in mathematics and the sciences. Students often misinterpret these graphs, which impedes their learning. Two common misinterpretations that have been identified in the literature are examined here. Instruction using microcomputer-based laboratories (MBLs) has been shown to improve students' understanding of line graphs and to reduce the frequency of misinterpretations. Several explanations have been offered for the beneficial effects of MBL instruction. Research shows that the real-time display of the graphs is important. However, other videotape-based instruction providing real-time display of graphs has not been as successful as MBL instruction, showing that other factors also are at work.

The relationship between cognitive level and graphing abilities is complex. Research has shown that cognitive level and the presence of specific mental structures affect students' abilities to correctly interpret graphs. There is disagreement about whether instruction that dramatically improves students' graphing abilities may also help build the corresponding mental structures and facilitate a transition from concrete to formal operational reasoning.

Back to the table of contents of this paper.

Two Common Misinterpretations of Graphs

Researchers have identified two ways in which students commonly misinterpret(Footnote 1) graphs. The first is the graph-as-picture (GAP) interpretation, in which students expect the graph to be a picture of the phenomenon described. In kinematics, this can result in the student interpreting a graph of distance vs. time as if it were a road map, with the horizontal axis representing one direction of the motion rather than representing the passage of time. In problems dealing with balls rolling in tracks or people riding bicycles over hills, students using GAP will often draw velocity-time graphs resembling the shapes of the tracks or hills, rather than showing the velocity of the ball or bicycle. The second common misinterpretation is slope/height confusion (SHC), in which students use the height of the graph at a point when they should use the slope of the line tangent to the graph at a point, and vice versa.

Both of these misinterpretations have been reported in a variety of populations, including middle school students (Barclay, 1985; Clement, Mokros, & Schultz, 1985; Mokros & Tinker, 1987), and college and university undergraduates enrolled in physics courses (McDermott, Rosenquist, & van Zee, 1987). Barclay (1985) noted that these misinterpretations were also common in middle school teachers. Berg & Phillips (1994) observed GAP in middle school and high school students. Other studies have found indications of SHC in high school (Brasell, 1987a) and college (Thornton & Sokoloff, 1990; Svec, 1995) students enrolled in physics courses.

Back to the table of contents of this paper.

Graph Interpretation and Kinematics Knowledge

Graph-as-Picture in Kinematics
It appears that there is a strong connection or interaction between students' conceptual difficulties in kinematics and their difficulties in interpreting the graphs that are so often used to represent kinematic phenomena and concepts. McDermott, Rosenquist, & van Zee (1987) reported several difficulties that college physics students experienced in connecting graphs to physical concepts. They alluded to GAP, saying that the students had trouble "separating the shape of the graph from the path of the motion" (p. 509). This problem was evident whether the students were being asked to sketch graphs representing motion of balls on given tracks, or to set up tracks on which balls would roll as represented in given graphs.

Mokros & Tinker (1987) reported that middle school students could easily interpret graphs that resembled pictures of the phenomena,but had more trouble when the graph did not resemble a picture. They write: "Students scored the lowest--and subsequently made the greatest gains--on items where the mental image of the phenomenon and the graph of the phenomenon were discrepant. Interestingly, all of these items involved distance and velocity graphs" (p. 377); and "Unfortunately, all of the items where graph-as-picture rules did not work involved distance and velocity" (p. 378).

Mokros & Tinker appear to consider the absence of GAP misinterpretations in areas other than kinematics to be an artifact of their test, which used kinematics in many questions. In fact, all of the references to GAP that I have been able to find have involved kinematics (Barclay, 1985; Clement, Mokros, & Schultz, 1985; McDermott, Rosenquist, & van Zee, 1987; Mokros & Tinker, 1987). Three of these studies involved other types of graphs as well, but GAP was reported only in relation to graphs of motion. This may be caused by the popularity of kinematics items on graphing tests, or it may be due to a link between the way students think of motion and the tendency to use a graph-as-picture misinterpretation. Perhaps this misinterpretation should be more precisely named graph-as-trajectory, or graph-as-map-of-path.

Prior to reading literature describing GAP, I had identified the same misinterpretation in my own calculus students. In addition, I observed this misunderstanding in my interview with "Ann."(Footnote 2) I asked Ann to "draw a graph, representing my distance away from home as it relates to time" during a trip when "I walked from my house to the cash machine, stood for a while at the machine getting out money, and then walked back home." Early in the interview, Ann drew a graph similar to the one in figure 1. From her comments as she drew the graph, it was clear that she was representing the physical act of returning to the starting place by drawing the graph returning to the origin, which was its starting place. Later, I drew her attention to the fact that she had labeled the horizontal axis "time," and asked her what that meant. After some thought, she revised her graph to resemble figure 2. At this point she became much more confident of her work, and repeatedly told me that the graph couldn't go back to the origin, as she had originally drawn it, "because time doesn't go back, time only goes forward."

Until encountering the term in the literature, I did not think of this as graph-as-picture. I referred to "the road-map misinterpretation," since that was how I understood what I had seen with Ann and other students. Students seemed to think of a line graph representing motion as a road map, with the vertical axis representing the north/south component of motion and the horizontal axis representing the east/west component. Students generally have far more experience reading maps than interpreting line graphs, which may cause them to interpret the relatively unfamiliar graph as a more familiar map. If so, this is not a misconception so much as a misapplication of an otherwise correct schema. The students can correctly interpret maps, but then incorrectly apply this interpretation to other, more abstract, representations of motion. If this is the source of the misinterpretation, then one would not expect to find it in areas other than kinematics. I concur with Mokros and Tinker's recommendation that further research should be done to determine whether the GAP misinterpretation is used in areas other than kinematics.(Footnote 3)

Back to the table of contents of this paper.

Slope/Height Confusion in Kinematics
McDermott, Rosenquist, & van Zee (1987) considered straight-line graphs separately from curved graphs. Even in the simple case of straight lines, the college physics students in their study confused distance, represented by the height of the graph, with velocity, represented by the slope of the graph. Although McDermott, Rosenquist, & van Zee appear to have interpreted this as SHC, calling it a difficulty in "discriminating between the slope and height of a graph" (p. 504), it is not clear to me how much of this confusion is due to problems with graph interpretation and how much is due to lack of understanding of distance and velocity. The situation becomes even more complicated when the graphs are curved, making confusion of slope and height (or of distance and velocity) more common. McDermott, Rosenquist, & van Zee term this a difficulty in "interpreting changes in height and changes in slope" (p. 504), but it could also be a difficulty in interpreting changes in distance and changes in velocity. Since slope on the distance-time graph gives the same information as height on the velocity-time graph, it appears that, in kinematics, confusion between distance and velocity is closely related to SHC.

Thornton & Sokoloff (1990) report that university students in introductory physics courses commonly draw or select graphs for velocity vs. time that resemble the correct graphs of distance vs. time. Svec (1995) observed that prior to instruction, 25% of the undergraduate physics students in his study "used the height of curve as the criteria for determining the magnitude of the velocity from a distance-graph" (p. 14), where slope would be the appropriate criterion. Many of Svec's subjects interpreted both distance-time and velocity-time graphs as if they were all distance-time graphs. Although neither Thornton & Sokoloff nor Svec call this slope/height confusion, it appears to be closely related to what McDermott, Rosenquist, and van Zee (1987) found. In all three cases, it is clear that these students had problems relating graphs of distance and velocity to one another and distinguishing them from one another.

Similarly, the high school physics students studied by Brasell (1987a) often drew erroneous velocity graphs that resembled the correct distance graphs. This could mean that these students were confused about the difference between distance and velocity, or that they were confusing slope and height. Brasell writes: "In kinematics, it is difficult to separate the slope/height confusion in interpreting graphs from the confusion between distance and velocity which appears to be prevalent among students from middle school through college" (p. 386). She seems to attribute these errors to confusion about kinematics, rather than graphing, as indicated by her attempts to use the nature of students incorrect responses to separate "graphing" errors from "conceptual" errors. She describes this difference:

The alternative answers students select on the posttest provide information about conceptual difficulties. Most of the items dealing with velocity included options that represent errors predominantly with either conventions of graphing (graph errors) or concepts of distance and velocity. Graph errors occur when students do not fully understand how to represent the direction of movement, and they select the alternative answer for an event with positive velocity instead of negative velocity or vice versa. Conceptual errors occur when students confuse graphs of distance and velocity, and select either a flat distance graph or a sloping velocity graph for an event of constant velocity. (p. 391)
The higher proportion of concept errors with velocity graphs than with distance graphs indicates that velocity is conceptually more difficult than distance. The lack of improvement in concept of velocity was anticipated because of the very brief treatment period and the prevalence and stability of confusions between distance and velocity. (p. 393)

Whether the researcher considers these errors to indicate SHC in graph interpretation, as opposed to confusion among distance, velocity, and acceleration, may depend in part on whether the researcher is studying primarily graphing or kinematics. In the introduction to their paper, McDermott, Rosenquist, & van Zee (1987) write that they examined "some of the graphing errors made by students" (p. 503, italics added), as part of ongoing research in student understanding in physics. They later identified confusion between distance, represented by the height of the graph, and velocity, represented by the slope of the graph, as a difficulty in "discriminating between the slope and height of a graph" (p. 504), without giving any reason why it might not as easily be difficulty in discriminating between distance and velocity. In a parenthetical addition to a description of student responses to a particular item, they write: "(It is also possible that some students correctly interpret the crossing of the graphs . . . as a time when the objects have the same position, but then incorrectly infer that the objects have the same speed as well.)" (p. 504). Despite recognizing this possibility, they clearly prefer the explanation related to confusion between slope and height.

McDermott, Rosenquist, & van Zee later discuss difficulties students have in "relating one type of graph to another" and write: "Many [students] are unable to translate back and forth from a position versus time (x vs. t) graph to a velocity versus time (v vs. t) graph" (p. 505). They discuss this entirely in terms of graphs, without suggesting that the students may actually be confusing the concepts of position and velocity, rather than the graphs. In a similar vein, they write of difficulties students have "distinguishing among different types of motion graphs" (p. 510):

When students are asked to sketch x vs. t, v vs. t, and a vs. t graphs for a motion demonstrated in the laboratory, they often draw three graphs that have basically the same shape. Even when they make measurements of a motion and obtain data to plot, we have found that students often try to make the shapes of the graphs match one another. . . . Some students seem to find it very difficult to accept the idea that the same motion can be represented by graphs of very different shape. (p. 510)

In contrast to McDermott, Rosenquist, & van Zee's graph-centered interpretation of student errors, Thornton & Sokoloff (1990) focus on problems with kinematics. In their paper titled "Learning Motion Concepts using Microcomputer-Based Laboratory Tools," Thornton & Sokoloff deal with kinematics instruction and the impact of MBL tools, but say very little about graphing skills. They interpret students' initial errors and subsequent improvement as indicating a lack of understanding of kinematics, and subsequent learning about kinematics. Thornton & Sokoloff administered a pre-test asking their subjects to select velocity-time graphs showing objects moving toward and away from the origin "at a steady (constant) velocity" (p. 862). Although the correct graphs were horizontal lines, the most popular choices were diagonal lines. They write:

The most common error is the choice of the "distance analogs" . . . This is consistent with previous studies, in which students confused position and velocity graphs. . . . It should be noted that the students did not miss the questions because they were simply unable to read graphs. More than 90% could answer questions involving distance graphs correctly. (pp. 862-863)

Although it is difficult to estimate what proportion of students' misunderstandings are due to confusion among distance, velocity, and acceleration, it is clear that this confusion does exist. Both Svec (1995) and Thornton & Sokoloff (1990) found that students are more likely to confuse acceleration-time graphs with velocity-time graphs than to confuse velocity-time graphs with distance-time graphs. It seems that this must stem from problems understanding kinematics, rather than graphing, since the graphs were of similar complexity. This is in agreement with Trowbridge & McDermott's (1981) study of college physics students, which revealed that students have more trouble with the concept of acceleration than with the concept of velocity, even when graphs are not used. From this it seems clear that at least part of the problem lies in students' understanding of kinematics concepts, rather than graph interpretation.

Back to the table of contents of this paper.

Is Slope/Height Confusion a Problem of Graph Interpretation?

Berg & Phillips (1994) found examples of what appeared to be SHC in student responses to questions about graphs depicting the motion of cars and the filling of water tanks. They concluded that the students were responding to keywords in the question. Questions asking the students to indicate where a quantity was "more" generally elicited responses about the height of the graph, while questions about when something was happening "faster" elicited responses involving the slope of the graph. Often, of course, this strategy works. For example, a student looking at a distance-time graph can draw correct conclusions by associating more distance with higher points, and faster movement with steeper slope. On the other hand, if the student is asked when the velocity is greatest, this may be categorized as a "more" question, leading the student to incorrectly select the highest point on the distance-time curve, rather than the point with steepest slope.

This type of error may not have any connection to confusion between height and slope; it appears to be simply over-use of a rote strategy. The student mechanically applies the strategy of "more means higher; faster means steeper" to all questions of that form, without attempting to distinguish whether or not the quantity in the question is the same as the quantity associated with the vertical axis of the graph. On a velocity-time graph, more velocity does indeed mean higher, but more acceleration does not. Faster change in velocity does mean steeper slope, but faster motion does not. The strategy "more means higher; faster means steeper" is not incorrect, it is simply over-used. It applies perfectly well to questions about the quantity associated with the vertical axis, but not necessarily to other related quantities.

This leaves at least three possible interpretations of errors that appear to involve confusion between slope and height: (a) The student may be confused about the concepts represented by the slope and the height, especially in the area of kinematics, where confusion among distance, velocity, and acceleration is known to exist; (b) the student may be responding to a keyword in the question, especially if the error fits the "more means higher; faster means steeper" pattern found by Berg & Phillips; (c) the student may be confusing slope and height as shown on the graph.

I have been able to find only one description of SHC that occurred outside the context of kinematics, and did not involve the "more means higher; faster means steeper" strategy. Clement, Mokros, & Schultz (1985) showed fourteen middle school students a graph of temperature vs. time of day, and asked them at what time the temperature was rising most rapidly. Five subjects selected the highest point on the graph; only three correctly selected the point with steepest slope. If these students had been using "more means higher; faster means steeper," they probably would have classified "rising most rapidly" as "faster," and thus selected the point with steepest slope. This example has nothing to do with kinematics, and does not appear to be a misapplication of a rote or keyword strategy.

Still, I am not convinced that the problem is essentially one of graph interpretation. I think that the common thread running through all of these examples of apparent slope/height confusion is a difficulty in distinguishing between the value of a quantity and a change in that value, whether the change is represented graphically or in some other way. If a student is unable to distinguish between a value and a change in that value, then problems in kinematics and graph interpretation would naturally result, perhaps leading the student to settle on rote application of a keyword strategy as a way of dealing with the inexplicable preference of teachers for slope in answer to some questions and height in answer to others.

Trowbridge & McDermott (1981) describe a student who thought that two balls rolling in tracks must have the same acceleration at the moment when they had the same velocity. During the interview, Trowbridge & McDermott discovered that the student "was unable to make the necessary distinction between the concepts of velocity and change of velocity" (p. 243). It is interesting to note that this interview involved demonstrations of balls rolling in tracks, but did not involve graphs. In the context of graph interpretation, this student's inability to distinguish between velocity and change of velocity could easily appear to be slope/height confusion, even though the source of the problem is independent of graphical representations. It may be that true SHC does exist, but the evidence I have found does not convince me. I think it is most likely to be a manifestation of a deeper problem of confusion between a value and a change in that value.

Even if slope/height confusion does not exist as a misinterpretation specific to graphical representations, it is clear that many students do have difficulty correctly interpreting graphs, and that some forms of instruction are more helpful than others in fostering improved graph interpretation skills. There is also some evidence that graph-related skills developed in one context may transfer to another context. Linn, Layman, & Nachmias (1987) gave 240 eighth-grade students eighteen weeks of microcomputer-based laboratory instruction in chemistry and temperature, with emphasis on improving graphing skills. From their pre-test and post-test, they found that students' ability to interpret graphs representing motion had improved significantly, although motion was not included in the instruction. This indicates that at least part of the trouble these students had in trying to understand graphs of motion lay in graph interpretation, rather than in kinematics. However, the improvement was not as great in motion, which was not taught, as it was in temperature and chemistry, which were taught. This may indicate that some component of the students' misunderstanding was directly related to kinematics, rather than graph interpretation. On the other hand, it may simply be due to the difference between the familiar context of the lessons and the unfamiliar context of the new topic.

Back to the table of contents of this paper.

Microcomputer-Based Laboratory Instruction

Several studies have used microcomputer-based laboratory (MBL) instruction in an effort to improve students' graph interpretation skills. Microcomputer-based laboratories (MBLs) involve some sort of probe which detects a physical quantity. The probe most often used in the literature is the motion sensor, which detects the distance between the sensor and the nearest object, usually a student. The sensor is attached to a computer, which creates a graph of the student's distance from the sensor over a period of time, often about ten seconds. The graph is displayed in real time, as the motion progresses. The student can walk back and forth in front of the sensor and watch the graph appear at the same time, which is expected to help the student understand the abstraction of the graph by connecting it to the physical reality of the motion. This arrangement has been used in several descriptive (e.g. Barclay, 1985; Mokros, 1985; Mokros &Tinker, 1987; Thornton, 1985) and comparative (e.g. Brasell, 1987a, 1987b, 1987c; Svec, 1995; Thornton & Sokoloff, 1990) studies. Other sensors, measuring temperature, force, current, voltage, light intensity, and sound pressure, are also available, and have been used in studies examining the effects of MBL instruction in contexts other than kinematics (e.g. Adams & Shrum, 1990; Linn, Layman, & Nachmias, 1987). MBL equipment is described in more detail by Thornton & Sokoloff (1990).

Svec (1995) writes: "Because the use of graphs to learn content has important classroom implications, it is important to document what the students are learning when using MBL labs and how they are learning those topics" (p. 3). Svec studied university students enrolled in two physics courses. One class used MBL equipment with motion sensors, while the other used more traditional motion laboratories. Two instruments, the Motion Concept Test and the Graphing Interpretation Skills Test, were administered at the beginning and end of the semester. Svec broke his research questions down into fifteen testable hypotheses about specific graph-interpretation abilities and motion concepts that he predicted MBL instruction would help students develop. Scores on the pre- and post-tests were used to test these hypotheses. Tests of two of those hypotheses revealed no noticeable difference. In one area, there was a small difference favoring the control group, which had received traditional instruction. In the twelve remaining areas, there was a difference in favor of the treatment group, which had received MBL instruction throughout the semester. Four of these differences were characterized as significant: determining the direction of motion from a motion graph and qualitatively interpreting distance-time, velocity-time, and acceleration-time graphs. Svec concludes that: "The study showed that the [MBL treatment group] students learned more about graphing interpretation skill, more about motion graphs and more about conceptual understanding of motion that did the [traditionally instructed control group] students. That learning was made possible by effective use of MBL activities" (p. 22).

Thornton & Sokoloff (1990) used MBL instruction with motion sensors to teach kinematics to 1500 students in several college and university physics courses. Through pre- and post-tests, they compared the kinematics knowledge of students who received traditional lecture instruction in kinematics to those who also participated in MBL instruction. Their post-tests included testing soon after the kinematics instruction was completed and again at the end of the semester, seven weeks after the completion of the kinematics instruction. On velocity questions,(Footnote 4) post-test error rates for students who did not have the MBL instruction were similar to pre-test error rates for all students. For students who did have MBL instruction, post-test error rates were substantially lower. Thornton & Sokoloff write: "There is strong evidence for significantly improved learning and retention by students who used the MBL materials, compared to those taught in lecture"(Footnote 5) (p. 862).

Brasell (1987a, 1987b, 1987c) used pre- and post-tests to study the effects of one hour of instruction on the graph interpretation skills of eighth-grade students. The group receiving the standard MBL instruction significantly outperformed the control and other groups. Brasell's study is examined in greater detail in the next section.

Back to the table of contents of this paper.

Explaining the Success of the MBL

Several researchers have attempted to explain the success of MBL instruction in improving students' abilities to interpret (and in some studies to produce) graphs. Barclay (1985) suggests:

Attributes of the MBL science units that seem important in contributing to [learning graphing skills] include:
a) The grounding of the graphical representation in the concrete actions of the students.
b) The inclusion of different ways of experiencing the material: visual, kinesthetic, and analytic.
c) The fast feedback that allows students to immediately relate the graph to the event. (p. 8)

Linn. Layman, & Nachmias (1987) state:

MBL offers one major advantage. The graphs in MBL are formed as the experiment is carried out and are immediately related to an experience that the students may have designed or set up themselves. Thus they are less likely to be seen as static pictures and more likely to be seen as dynamic relationships. (p. 245)

Mokros & Tinker (1987) suggest:

Four features of MBL seem to contribute to its success in facilitating graphical communication: MBL uses multiple modalities; it pairs, in real time, events with their symbolic graphical representations; it provides genuine scientific experiences; and it eliminates the drudgery of graph production. (p. 369)

Thornton & Sokoloff (1990) write:

The following characteristics of these [MBL] tools [including several types of data collection probes] are important to student learning:
1) The tools allow student-directed exploration but free students from most of the time-consuming drudgery associated with data collection and display.
2) The data are plotted in graphical form in real time, so that students get immediate feedback and see the data in an understandable form.
3) Because data are quickly taken and displayed, students can easily examine the consequences of a large number of changes in experimental conditions during a single laboratory period. The students spend a large portion of their laboratory time observing physical phenomena and interpreting, discussing, and analyzing data.
4) The hardware and software tools are general--independent of the experiments. the variety of probes use the same interface box and the same software format. Students are able to focus on the investigation of many different physical phenomena without spending a large amount of time learning to use complicated tools.
5) The tools dictate neither the phenomena to be investigated, the steps of the investigation, nor the level or sophistication of the curriculum. Thus a wide range of students from elementary school to the university level are able to use this same set of tools to investigate the physical world. (p. 859)

A common thread in these suggestions is an emphasis on the immediacy of the graph production as a key point in the MBL experience. The MBL equipment allows the student to watch the graph appear in real time, as the experiment progresses. The student's own physical movement is very concrete, and appeals to the kinesthetic sense. The graph, on the other hand, is abstract, and appeals to logical thought. Several researchers (e.g. Adams & Shrum, 1990; Beichner, 1990; Brasell, 1987a; Mokros, 1985; Mokros & Tinker, 1987) have speculated that experiencing the movement while watching the graph appear helps the student to form a link between the two, and thus "transfer the event-graph unit (already linked together) into long-term memory as a single entity" (Beichner, 1990, p. 804).

Following this idea, Brasell (1987a, 1987b) hypothesized that the real-time nature of the graphs produced by the MBL equipment was critical to the success of this instruction. She used pre- and post-tests to study the effects of one hour of instruction on four groups of high school students: Test Only, Control, Standard MBL, and Delayed MBL. The Test Only group received no instruction. The Control group received pencil-and-paper instruction. The Standard MBL group used the MBL with motion sensor as it is normally used, with the graph of the student's motion produced in real time as the motion progresses. The Delayed MBL group used a modified version of the MBL software, in which the graph was not produced until after the motion was complete. The delay was about 20 to 30 seconds. Brasell found that the Standard MBL treatment group significantly outperformed all other groups, including the Delayed MBL group. Most of the difference was found in the items related to distance. This effect was more pronounced for the female students than for the males (Brasell, 1987c). There was a smaller difference in favor of the Standard MBL group on the velocity items, but it was not significant. Brasell estimates that the real-time feature accounted for about 90% of the improvement that MBL offered over pencil-and-paper instruction. She writes (1987b): "The appearance of these differences after such a brief treatment, one class period, suggests that there is a fundamental difference in information processing generated by the immediate display" (p. 4).

Following on Brasell's work, Beichner (1990) hypothesized that it was not necessary for the student to actually produce the graph by using a motion sensor to measure his or her own motion. Since Brasell had shown that the key point was the real-time nature of the graphing, Beichner hypothesized that the students could learn as well from prerecorded videotapes of motion not produced by the students, so long as the graphs were displayed in real time along with the display of the motion on the videotape. Beichner developed a system, called VideoGraph, which produces the graphs of the motion shown in the videotape. Like Brasell, Beichner used a single class period for instruction, preceded and followed by diagnostic tests. Beichner's study used a simple two-by-two design. One factor was the type of instruction, either VideoGraph or traditional methodology. The other was whether the students viewed an actual motion event or not. (In any case, the students did not view the event that had been videotaped, but two of the groups viewed a similar event.) A fifth group took the diagnostic tests, but received no instruction. A total of 165 high school and 72 college students participated in the study.

Contrary to his expectations, Beichner found no significant differences among the groups in his study. He speculates that differences might be found with interventions lasting longer than one class period, but has no evidence for that. Since significant differences were found after an intervention of only one class period in Brasell's study, length of intervention is not responsible for the differences between the two studies. Beichner writes:

The VideoGraph technique can present replications of motion events while generating graphs, but other than determining the rate of animation, students cannot control the motion. This ability to make changes--and then instantly see the effect--is vital to the efficacy of microcomputer-based kinematics labs. The feedback appeals to the visual and kinesthetic senses. A simple visual juxtaposition of event images and graphs is not as good as seeing (and "feeling") the actual event while the graph is being made. (pp. 811-812)

He goes on to suggest that technology resembling VideoGraph might be useful in other areas, such as titrations and heating, and adds: "The kinesthetic sense is a strong one and appears to make a difference in kinematics MBL's" (p. 813).

Brungardt & Zollman (1995) pursued Beichner's suggestion that a longer period of instruction might reveal advantages of the videotape method that were not apparent after only one class period of instruction. The thirty high school physics students in Brungardt & Zollman's study were given four class periods of instruction. Brungardt & Zollman used videotaped interviews, as well as written tests, in an effort to gain both quantitative and qualitative information about the effects of the instruction. They also interviewed eight of the students three weeks after the instruction was completed, to gauge the long-term retention effects.

The students in Brungardt & Zollman's study worked with a computer program to generate graphs from videotapes of motion events. The videotapes all showed motion involved in sports, presumably a familiar context for the students.(Footnote 6) The students used acetate sheets placed on the video screen to record the position of the object or person at various times during the motion. They then measured the position of the object at each time, and entered the information into a spreadsheet, which was used to produce the graphs.(Footnote 7) Half of the students then saw the graph displayed as the videotape of the motion was replayed, so that the two were synchronized. The other half watched the motion replayed, and then saw the graph displayed several minutes later.

Brungardt & Zollman found no significant effects of real-time versus delayed display of the graphs. This seems to contradict Brasell's results, which showed a great effect from a delay of only 20 to 30 seconds. The key difference appears to lie in Brasell's use of motion detectors, so that the students were studying their own motion, as opposed to Brungardt & Zollman's use of videotaped motion, which the students did not produce. From these three studies, one can infer that the real-time effect can be substantial when the students are actively producing the motion under study, but that delay is less important, perhaps even completely unimportant, when the work involves prerecorded motion.

Brasell found that microcomputer-based instruction using student-generated motion was dramatically more effective than traditional instruction, although this effect was largely lost if the graphing display was delayed. In contrast, Beichner found that microcomputer-based instruction using prerecorded videotapes of motion was not significantly more effective than traditional instruction. (Brungardt & Zollman did not use a control group with traditional instruction.) Considering both Brasell's study and Beichner's, it appears that Mokros (1985) and Barclay (1985) were correct in suggesting that both the student-controlled kinesthetic experience and the real-time graph production are important aspects of the MBL experience.

Back to the table of contents of this paper.

Graphing and Cognitive Development: Which Comes First?

Both McKenzie & Padilla (1984) and Adams & Shrum (1990) found graphing ability, as measured by the Test of Graphing in Science (TOGS)(Footnote 8) , to be significantly correlated with cognitive level, as measured by the Group Assessment of Logical Thinking (GALT). Similarly, Berg & Phillips (1994) found that graph production and interpretation ability was correlated to development of specific mental structures. While this comes as no surprise, it has launched something of a chicken-and-egg debate. Should we work on improving cognitive level and building mental structures, in hopes of gaining graphing proficiency as a side benefit, or should we work on graph interpretation directly, with the possible side benefit of raising cognitive level?

Many researchers start with an interest in the more applied area of instruction in graph interpretation, find that MBL works well, and speculate that there may be cognitive benefits that extend beyond developing an ability to interpret the graphs used in the instruction. Linn, Layman, and Nachmias (1987) found that MBL instruction in chemistry and temperature that focused on improving graphing skills also improved students' ability to interpret graphs representing motion, although motion was not included in the instruction. Apparently, the students' graph interpretation abilities had improved in ways that were not dependent on the context of the instruction. Was there an underlying advance in cognitive development as well? Different researchers have advanced different theories about the effects on cognitive development.

Many of the MBL interventions have involved the student moving in front of a motion sensor, while watching a graph of that motion appear in real time on the computer screen. The student's own physical movement is very concrete, and appeals to the kinesthetic sense. The graph, on the other hand, is abstract, and appeals to logical thought. Several researchers (e.g. Adams & Shrum, 1990; Beichner, 1990; Brasell, 1987a; Mokros, 1985; Mokros & Tinker, 1987) have speculated that experiencing the movement while watching the graph appear helps the student to form a link between the two, and thus "transfer the event-graph unit (already linked together) into long-term memory as a single entity" (Beichner, 1990, p. 804). It is also suggested that this may encourage the development of abstract thinking.

The apparent success of MBL instruction in helping students to link the concrete and the abstract inspired Mokros (1985, p. 3) to write:

The power of the intervention stems partly from the fact that it reinforced many learning modalities. The kinesthetic experience of using one's own movements as "data" was linked with the visual experience of seeing graphs of these movements on the screen. By linking the concrete and the abstract, MBL may be providing a bridge that facilitates the development of formal operational thinking. (p. 0)

and:

The study also suggests that by linking the concrete and the abstract, the computer may serve as an important �carrier' of problem solving skills. Viewed within Piagetian theory, the value of MBL may be as a bridge between concrete and formal operations. It is possible that intensive juxtaposition of these concrete and formal operations could facilitate the development of formal operational thinking. (p. 3)

Berg & Phillips (1994) approach the question from the perspective of cognitive theory, and take issue with Mokros & Tinker's (1987) suggestion that MBL instruction may significantly aid cognitive development, serving as a "bridge between concrete and formal operations" (p. 381). Berg & Phillips believe that there are no "quick shortcuts to cognitive development" (p. 324). With reference to the work of Mokros & Tinker and others, Berg & Phillips ask: "We might expect some growth in being able to identify or correctly draw the right graph from recalling the experience, but does a permanent and transferable interpretive ability exist?" (p. 339). They appear to doubt that it does. Rather than using MBL instruction to develop graphing skills, with an expectation of corresponding advancement in cognitive structures, Berg & Phillips believe instruction should be designed to build (gradually, since presumably there is no other way) the cognitive structures from which graphing abilities are expected to follow.

In Berg & Phillips's view, to focus on graphing before the mental structures are in place puts the cart before the horse. They assert that "Evaluating a student's ability to construct or interpret graphs is certainly punitive if students have not yet developed the logical thinking structures necessary to make sense out of the material" (p. 340). While this view would allow instruction on graphing construction and interpretation, it would rule out assessment until the logical thinking structures are judged to be in place, effectively keeping graphing out of the curriculum for younger students.

Berg & Phillips are unfortunately vague on ways to build logical thinking structures. I think that Mokros & Tinker may be right about MBL instruction helping to do that. I don't share Berg & Phillips's interpretation of Mokros & Tinker's statement about MBL instruction serving as a "bridge between concrete and formal operations" (p. 381). Berg & Phillips characterize this as a quick shortcut to cognitive development, which they are certain is impossible. Mokros and Tinker did not say that the student receiving MBL instruction would move from concrete to formal operational reasoning overnight. There is room in what Mokros & Tinker have written for the idea that cognitive development is indeed gradual, with no "shortcuts," but that some forms of instruction can encourage and enhance the student's development more than others, and that MBL instruction is one of the more valuable.

Back to the table of contents of this paper.

Conclusions

Students do have trouble correctly interpreting line graphs, including those representing motion. The misinterpretations called graph-as-picture and slope/height confusion do occur, but may not be of the nature implied by the names. Graph-as-picture may be more precisely termed graph-as-map; it may represent the student's misapplication to line graphs of a correct map-reading schema. Graphs and maps are both two-dimensional sketches representing motion, and thus may be confused with one another. It is also possible that graph-as-picture exists in a broader form, which could be applied to graphs representing phenomena other than motion, but this has not been proven.

Slope/height confusion appears to be one manifestation of a broader problem that students have with distinguishing between a quantity and a change in that quantity. An inability to make this distinction has been found both with and without the use of graphs. This problem clearly would lead to confusing slope and height, and to confusing distance, velocity, and acceleration. Future research should examine whether addressing the distinction between a quantity and a change in that quantity improves students' ability to interpret graphs.

Microcomputer-based laboratory instruction with motion sensors is quite successful in helping students learn to interpret line graphs. The real-time display of graphs is vital to the success of MBL instruction, but is not the only important factor. Videotape-based instruction, with or without real-time display of graphs, is not nearly as successful. The advantage of MBL instruction over videotape-based instruction may be due to the kinesthetic aspect of the MBL experience, or it may be due to the control the students have over the data in the MBL work. Since the kinesthetic experience of motion is the mechanism for giving students control over the data, the two have not been separated. Future research should address this question, perhaps by using a less kinesthetic mechanism for giving the student control over the data.

Students' ability to interpret line graphs increases with their cognitive level and with their acquisition of certain specific mental structures. It seems clear that any intervention which enabled students to construct those mental structures or improve their cognitive level would pay dividends in their graph interpretation abilities. What is not known is whether interventions that improve students' graph interpretation abilities also raise their cognitive level or contribute to the establishment of mental structures. Certainly this would not happen quickly, but it might happen gradually. This is another question to be answered by future research.

Back to the table of contents of this paper.

References

Adams, D. D., & Shrum, J. W. (1990). The effects of microcomputer-based laboratory exercises on the acquisition of line graph construction and interpretation skills by high school biology students. Journal of Research in Science Teaching, 27, 777-787.

Barclay, W. L. (1985). Graphing Misconceptions and Possible Remedies Using Microcomputer-Based Labs. (Technical Report Number TERC-TR-85-5). Cambridge, MA: Technical Education Research Center.

Beichner, R. J. (1990). The effect of simultaneous motion presentation and graph generation in a kinematics lab. Journal of Research in Science Teaching, 27, 803-815.

Berg, C. A., & Phillips, D. G. (1994). An investigation of the relationship between logical thinking structures and the ability to construct and interpret line graphs. Journal of Research in Science Teaching, 31, 323-344.

Brasell, H. (1987a). The effect of real-time laboratory graphing on learning graphic representations of distance and velocity. Journal of Research in Science Teaching, 24, 385-395.

Brasell, H. (1987b, April). The role of microcomputer-based laboratories in learning to make graphs of distance and velocity. Paper presented at the Annual Meeting of the American Educational Research Association, Washington, DC.

Brasell, H. (1987c, April). Sex differences related to graphing skills in microcomputer-based labs. Paper presented at the 60th Annual Meeting of the National Association of Research in Science Teaching, Washington, DC.

Brungardt, J. B., & Zollman, D. (1995). Influence of interactive videodisc instruction using simultaneous-time analysis on kinematics graphing skills of high school physics students. Journal of Research in Science Teaching, 32, 855-869.

Clement, J., Mokros, J. R., & Schultz, K. (1985). Adolescents� Graphing Skills: A Descriptive Analysis. (Technical report number TERC-TR-85-1). Cambridge, MA: Educational Technology Center.

Linn, M. C., Layman, J. W., & Nachmias, R. (1987). Cognitive consequences of microcomputer-based laboratories: Graphing skills development. Contemporary Educational Psychology, 12, 244-253.

McDermott, L. C., Rosenquist, M. L., & van Zee, E. H. (1987). Student difficulties in connecting graphs and physics: Examples from kinematics. American Journal of Physics, 55, 503-513.

McKenzie, D. L., & Padilla, M. J. (1984, April). Effects of laboratory activities and written simulations on the acquisition of graphing skills by eighth grade students. Paper presented at the 57th Annual Meeting of the National Association of Research in Science Teaching, New Orleans, LA.

McKenzie, D. L., & Padilla, M. J. (1986). The construction and validation of the Test of Graphing in Science (TOGS). Journal of Research in Science Teaching, 23, 571-579.

Mokros, J. R. (1985). The Impact of Microcomputer-Based Science Labs on Children�s Graphing Skills. (Technical Report Number TERC-TR-85-3). Cambridge, MA: Technical Education Research Center.

Mokros, J. R., & Tinker, R. F. (1987). The Impact of Microcomputer-Based Labs on Children�s Ability to Interpret Graphs. Journal of Research in Science Teaching, 24, 369-383.

Svec, M. T. (1995, April). Effect of Micro-Computer Based Laboratory on Graphing Interpretation Skills and Understanding of Motion. Paper presented at the Annual Meeting of the National Association for Research in Science Teaching, San Francisco, CA.

Thornton, R. K. (1985). Tools for scientific thinking: Microcomputer-based laboratories for the naive science learner. (Technical Report Number TERC-TR-85-6). Cambridge, MA: Technical Education Research Center.

Thornton, R. K., & Sokoloff, D. R. (1990). Learning motion concepts using real-time microcomputer-based laboratory tools. American Journal of Physics, 58, 858-867.

Trowbridge, D. E., & McDermott, L. C. (1981). Investigation of student understanding of the concept of acceleration in one dimension. American Journal of Physics, 49, 242-253.

Back to the table of contents of this paper.

Footnote 1
The vast majority of available studies have involved tests of students' ability to interpret graphs, rather then their ability to produce graphs. I have chosen the word "misinterpretation" with the intention of focusing on how the student interprets a particular graph on a particular occasion, rather than on a stable, internal cognitive structure. I use "misinterpretation" to mean that the interpretation is not correct, since it does not correspond to the phenomenon which is the subject of the graph, without commenting on whether it is based on a misconception or not.