(English (Word Find), and Nyanja V.01)
Introduction
The results (see p. 49) estimate the effects on test score of a number of different factors:- urban or rural school (URBAN), sex of child (SEX) grade (YEAR) and whether Nyanja was the home language of the child (HOMEL). When analysing test scores in English the last of these variables (HOMEL) is inappropriate and is not included in the analysis.
Variable codes
|
Variable YEAR |
Categories 3 |
Codes |
|
YEAR |
3 |
346 |
|
SCHOOL |
5 |
C D J K T |
|
SEX |
2 |
B (boy) G (girl) |
|
URBAN |
2 |
R (rural) U (urban) |
|
HOMEL |
2 |
H (home language) X (other) |
The data collected for this study has a hierarchical structure, children within classes within schools, and this complicates the form of the analysis required. Each level in the hierarchy has its own degree of random variation which has to be taken into account e.g. a class may have a particularly good (or bad) teacher with the result that the scores of all the children in the class are better (or worse) than expected. This extra variation is over and above the usual child-to-child variation in scores. When comparing grades, i.e. years 3, 4 and 6, the extra variation should be estimated and taken into account, otherwise the differences between the years will be found to be more significant than they really should be. Similarly at the school level, when comparing urban and rural schools the variation between schools needs to be used. The procedure MIXED in the computer package SAS is designed to deal with this type of data and has been used to produce the analyses.
Three sets of results are provided for each analysis:-
1) estimates of variance parameters - these are the estimated values for the random sources of variation described above, child, class and school.2) estimates of fixed effects - these are the estimates of the effects of the factors listed above (year, sex, urban/rural). Since the analysis is concerned with differences due to the different categories of the factors then one category is taken as the baseline (and attributed 0.0000) and the difference between this and all other categories is presented (eg year 6 is attributed 0.0000 compared with year 4 which gets -16.8213, ie nearly 17 points less than Year 6). In addition to the estimated effects an overall test of whether the factor has a significant effect is given.
3) least squares means - these are adjusted mean scores for each of the factors examined. Adjustment is made for all other factors in the analysis. Thus the least squares means for urban and rural schools are the scores to be expected in such schools if each class had the same number of pupils and equal numbers of boys and girls.
Significance Tests: Findings
1. Sex differencesOverall there is little evidence of differing achievement by the two sexes. There were no statistically significant sex differences.
2. Urban/rural differences
The estimated differences in score between urban and rural schools is in most cases large (7.2 points for English) but none of these estimates is significant. The problem is the relatively small number of schools involved in this study. It is possible that real differences between urban and rural schools do exist but a larger sample of schools (not pupils) would be needed to confirm this.
3. Year differences
Estimated differences between years 3, 4 and 6 are large and strongly significant, indicating a progressive improvement in ability with age for English and Nyanja.
4. Language differences
Nyanja home language pupils doing the Nyanja test do not seem to have a significant advantage. However, the difference is in the expected direction (ie Nyanja home language speakers perform slightly better overall in the Nyanja test than do non-Nyanja home language children).
English test scores.
Variance Parameter Estimates
|
Parameter |
Ratio |
Estimate |
Std Error |
Z |
P |
|
SCHOOL |
0.5605 |
42.3909 |
37.0318 |
1.14 |
0.2523 |
|
CLASS |
0.0857 |
6.4888 |
4.5651 |
1.42 |
0.1552 |
|
Residual |
1.0000 |
75.6285 |
5.1214 |
14.77 |
0.0000 |
Estimates for Fixed Effects
|
Parameter |
Estimate |
Std Error |
DF |
T Value |
P |
|
INTERCEPT |
32.8958 |
4.9055 |
436 |
6.71 |
0.0000 |
|
YEAR 3 |
-23.4253 |
1.9230 |
436 |
-12.18 |
0.0000 |
|
YEAR 4 |
-16.8213 |
1.9079 |
436 |
-8.82 |
0.0000 |
|
YEAR 6 |
0.0000 |
|
|
|
|
|
SEX B |
-1.2056 |
0.8300 |
436 |
-1.45 |
0.1471 |
|
SEX G |
0.0000 |
|
|
|
|
|
URBAN R |
-7.2126 |
6.1526 |
436 |
-1.17 |
0.2417 |
|
URBAN U |
0.0000 |
|
|
|
|
Tests of Fixed Effects
|
Source |
NDF |
DDF |
Type III F |
Pr>F |
|
YEAR |
2 |
8 |
79.39 |
0.0000 |
|
SEX |
1 |
436 |
2.11 |
0.1471 |
|
URBAN |
1 |
3 |
1.37 |
0.3257 |
Least Squares Means
|
Level |
LSMEAN |
Std Error |
DF |
|
YEAR 3 |
5.2613 |
3.2759 |
436 |
|
YEAR 4 |
11.8654 |
3.2685 |
436 |
|
YEAR 6 |
28.6867 |
3.2644 |
436 |
|
SEX B |
14.6683 |
3.1048 |
436 |
|
SEX G |
15.8740 |
3.1031 |
436 |
|
URBAN R |
11.6648 |
3.8970 |
436 |
|
URBAN U |
18.8774 |
4.7608 |
436 |
Nyanja test scores
Variance Parameter Estimates
|
Cov Parm |
Ratio |
Estimate |
Std Error |
Z Value |
Pr > |Z| |
|
SCHOOL |
0.00000000 |
0.00000000 |
|
|
|
|
YEAR* SCHOOL |
0.29499321 |
15.58507453 |
7.42402862 |
2.10 |
0.0358 |
|
Residual |
1.00000000 |
52.83197777 |
3.58155772 |
14.75 |
0.0000 |
Estimates for Fixed Effects
|
Parameter |
Estimate |
Std Error |
DF |
T Value |
P |
|
INTERCEPT |
20.0530 |
2.3507 |
435 |
8.53 |
0.0000 |
|
YEAR 3 |
-18.2916 |
2.6489 |
435 |
-6.91 |
0.0000 |
|
YEAR 4 |
-13.8498 |
2.6392 |
435 |
-5.25 |
0.0000 |
|
YEAR 6 |
0.0000 |
|
|
|
|
|
SEX B |
-0.1826 |
0.6959 |
435 |
-0.26 |
0.7931 |
|
SEX G |
0.0000 |
|
|
|
|
|
URBAN R |
1.7541 |
2.2784 |
435 |
0.77 |
0.4418 |
|
URBAN U |
0.0000 |
|
|
|
|
|
HOMEL H |
0.4222 |
1.0732 |
435 |
0.39 |
0.6942 |
|
HOMEL X |
0.0000 |
|
|
|
|
Tests of Fixed Effects
|
Source |
NDF |
DDF |
Type III F |
Pr>F |
|
YEAR |
2 |
8 |
26.04 |
0.0003 |
|
SEX |
1 |
435 |
0.07 |
0.7931 |
|
URBAN |
1 |
3 |
0.59 |
0.4974 |
|
HOMEL |
1 |
435 |
0.15 |
0.6942 |
Least Squares Means
|
Level |
LSMEAN |
Std Error |
DF |
|
YEAR 3 |
2.75830942 |
1.90838830 |
435 |
|
YEAR 4 |
7.20006093 |
1.89271955 |
435 |
|
YEAR 6 |
21.04991977 |
1.88954775 |
435 |
|
SEX B |
10.24478534 |
1.18049684 |
435 |
|
SEX G |
10.42740809 |
1.17133003 |
435 |
|
URBAN R |
11.21316059 |
1.49854693 |
435 |
|
URBAN U |
9.45903283 |
1.69511988 |
435 |
|
HOMEL H |
10.54723965 |
1.14218611 |
435 |
|
HOMEL X |
10.12495377 |
1.33969706 |
435 |
