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Pembelajaran multikultural fisika di smuFinish Time for Multiplication in PretestEFFECTS OF USING THE JAPANESE ABACUS METHOD UPON TFinish Time for Multiplication in Pretest
As can be seen in the F-test’s p-value of 0.3126, which is more than 0.05,
the variances are equal. Thus, Student’s t-test assuming equal variances is used,
revealing a p-value of 0.2106 that is more than 0.05. It is interpreted as having no
difference in terms of the means. From this result, it can be said that students in
the experimental group and control group have statistically similar finish times for
the pretest of multiplication. Based on the observations and the test results, it can
be seen that both groups still had difficulty in doing multipilcation that involved 2
and 3 digits. Both groups were using conventional way regarding 2 and 3 digits
multiplication. Abacus learners in the experimental group have not yet learned
about the multiplication of two two-digit numbers and three-digit with one-digit
numbers in their abacus class outside of school. Furthermore, for simple
multiplication involving one-digit and two-digit numbers (i.e. Grade Two lesson),
the students in the experimental group committed a total of 10 mistakes; for
multiplication that involved more digits (i.e. Grade Three lesson), the 15 students
answered 166 items incorrectly. On the other hand, the control group committed
40 and 199 mistakes for the same categories as mentioned above. From these
results, one can see that the number of mistakes increased as more digits were
involved in the calculation.
These results were consistent with research conducted by Ashcraft and
Koshmider (1991) about the development of children’s mental multiplication
skill: that the third graders had a 4.3 percent error rate on problems that involved
small numbers (e.g. 2 x 3), but 19 percent error rate on problems that involved
larger numbers (e.g. 8 x 9).
Finish Time for Multiplication in Posttest
For this set of data, the p-value for the F-test is 0.0007 which is interpreted
as the data sets having unequal variances. Hence, Student’s t-test for two samples
assuming unequal variances is used, with p-value of 0.0054 obtained which is less
than 0.05. Thus, there is sufficient evidence to show that in terms of finish time,
there is a difference for posttest in multiplication between control and
experimental groups. From the results, it can be seen that the experimental group
was faster that the control group in terms of time spent to finish the posttest.
Students who use the abacus do the calculation from left to right, so they can
simultaneously get the first partial sum as a part of the product while they are
processing the next using the abacus. In the conventional way, students work from
right to left, so students can not give an answer until they finish covering the
entire process. Abacus learner need only few steps compare with conventional
way using by non abacus learner. Abacus learner more focus in doing
multiplication for 2 to 3 digits numbers even though some forgot how to do it and
created some mistakes.
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