A recent report by The Institute for Higher Education
Policy (p. v) debunks the misconceptions that remediation is too expensive and
is an inappropriate function for colleges.
Instead, the report argues that remediation is a core function of higher
education and a good investment for society as well as for colleges and
universities. According to Jamie P. Merisotis, the Institute’s president, “one of our concerns
with the debate about college remediation…is that there really hasn’t been a
whole lot of factual discussion about what remediation is, how it works, and
the impact proposed policy changes might have” (Remedial). David W. Breneman,
Dean of the College of Education at the University of Virginia, said “the
report’s findings mirrored those of a remedial-education study that he and
another researcher published this summer” (Woodhams). The Institute argues that as higher education
strives to educate the populace, remediation will continue to be a core
function of college and universities (p. 6) and proposes a set of strategies
designed to reduce the need for remediation in higher education while also
enhancing its effectiveness (p. v).
Background
The
executive summary of College Remediation:
What It Is: What It Costs: What’s at Stake presents information that
should be considered in any debate regarding developmental education. First, the report argues (p. vi) that the
“financial costs of remediation are modest and generally comparable to or lower
than the costs of other academic programs” (p. vi). Remediation absorbs less than 1 percent—$1
billion of the $115 billion annual higher education budget (p. 12)—of expenditures, a relatively modest proportion. The report goes on to posit that even if
“remedial education were terminated at every college and university in the
country, it is unlikely that the money would be put to better use” (p.
vi).
As for the appropriateness of remediation in
college, it must be noted that remediation is not just for recent high school
graduates. Over one-quarter (27 percent)
of entering freshmen in remedial courses were 30 years of age or older, and
only half (56 percent) of the students enrolled in remedial courses were
freshmen (Institute, p. 9). In fact,
remediation has been a function of colleges since early colonial days,
beginning with Harvard College in the seventeenth century when Greek and Latin
tutors were provided. The need for
remediation is no different today. A
1995 survey by the National Center for Education Statistics (NCES) found that
78 percent of higher educational institutions that enroll freshmen and 100
percent of public two-year institutions offered remedial courses (Institute,
pp. v-vi). Twenty-nine percent, as
compared to 30 percent in 1989, of first-time freshmen enrolled in at least one
of these remedial courses, and freshmen were more likely to enroll in a
remedial mathematics courses than in a remedial reading or writing course. In fact, a recent study of remediation by
Maryland Higher Education Commission found that for students who completed
college-preparatory courses in high school and immediately attended a community
college, 40 percent needed math remediation (Institute, p. 8).
The
Institute’s report not only sanctions remediation as a core function of colleges
but also views remediation as a good investment for society and colleges. The alternatives to remediation can range
from unemployment and low-wage jobs to welfare participation and
incarceration—all of which are more expensive for society. A good remediation program can serve as a
cost-effective investment. Students who
are admitted to college and complete a remediation program go on to enroll in
regular courses, pay tuition, and participate in college activities, which
partially offset the costs of providing remediation (p. viii). Furthermore, the long-term social and
economic benefits of going to college—increased tax revenues, greater
productivity, reduced crime rates, increased quality of civic life—means that
students who succeed as a result of remedial instruction in higher education
also make their contribution to the public good.
A
final concern of the Institute was that evaluation of remedial programs was
minimal. Findings from their study of
116 two- and four-year colleges and universities found “that only a small
percentage conducted any systematic evaluation of their remedial education
programs” (p. 10). Furthermore, the
Southern Regional Education Board has raised the issue of the effectiveness of
remedial programs by observing “few states have exit standards for remedial
courses” (Institute, p. 11). The report
concludes by proposing strategies for the future—two mutually reinforcing goals
(p. ix):
(1)
Reducing the need
for remediation in higher education and
(2)
Improving the
effectiveness of remedial education in higher education.
The
focus of attention in this study is the latter of these two charges—to improve
the effectiveness of the developmental mathematics program in the Virginia Commuity College System.
The report lists three strategies to improve the effectiveness of
remedial education:
(1)
Creating interinstitutional collaboration among colleges and
universities in a state or system, allowing “best practices” and ideas to be
shared and replicated;
(2)
Making
remediation a comprehensive program that encompasses more than just tutoring
and skills development; and
(3)
Utilizing
technology to enhance the teaching-learning process.
The first of these
strategies—creating interinstitutional
collaboration—is most consistent with the three charges made in 1998 by Dr.
Arnold Oliver, Chancellor of the Virginia Community College System (VCCS), to
the VCCS Developmental Studies Implementation Task Force:
(1) To develop common sytemwide guidelines for interpreting the results of the standardized test.
(2) To develop systemwide measurable objectives and exit criteria for developmental reading, writing, and mathematics.
(3)
To make recommendations concerning performance
indicators and assessment methods that can be implemented systemwide
for the purpose of monitoring the success of these new procedures. (Bartholomay, Report No. 1, 2000)
These charges require systemwide collaboration in standardized test
interpretation, common objectives, exit criteria, and assessment methods for
developmental courses. Such agreement
should do much to standardize the treatment of developmental mathematics across
the state system. All of the mathematics
representatives serving on this Task Force are also members of VMATYC (the state
affiliate of AMATYC—American Mathematical Association of Two-Year
Colleges). Thus, the AMATYC Standards—Crossroads
in Mathematics: Standards for
Introductory College Mathematics Before Calculus—served as a guide for
mathematics decisions made by the Task Force.
In fall semester of 2000, the Task Force recommendations were
implemented statewide. Major changes
include common ASSET and COMPASS cutoff scores for placement into mathematics
courses, mandatory placement into developmental mathematics classes, when
appropriate, and common core exit exams for all three developmental mathematics
courses—MTH 02, MTH 03, and MTH 04.
Methodology
The current collaborative study complements the work of this Task Force by determining which teaching methodologies or practices work best to ensure success in preparing developmental mathematics students for college-level mathematics courses. During spring semester of 2000 this researcher carried out a study of five community colleges in the VCCS to observe experienced instructors, gather data, and extract the most effective ideas and teaching methods being utilized in the developmental mathematics classrooms for implementation into our own classrooms.
Ten instructors and fifteen
developmental mathematics classrooms—Basic Arithmetic (02), Basic Algebra I
(03), and Basic Algebra II (04)—in five colleges were involved in the
study. The researcher visited each
classroom at least three times—at the beginning, middle, and end of the
semester—to observe teaching methods and techniques as well as to gather
attendance and student participation data.
She also used this time to discuss details of the project and concerns
for the class with the instructors. The
variables under consideration in this study were course credit hours, class
size, attendance, student gender, teacher gender, class participation rates
(questions and answers), method of instruction (lecture or individualized),
success rates in developmental and subsequent college-level mathematics
courses, and retention and graduation rates for developmental students. The primary goal of the researcher was to
isolate factors that could positively impact the degree of success in
developmental mathematics programs in two-year colleges.
Course Logistics
Table 1 containing the classroom
logistics of these different classes describes the setting for developmental
classrooms in these five colleges.
Table 1
Class Logistics
for Developmental Mathematics
|
CAMPUS |
COURSE |
TEACHER |
HRS CREDIT |
TEACHING METHOD |
NUMBER ENROLLED |
PASSING CRITERION |
|
A |
MTH 02 |
Female |
5 |
LectureLab |
20 |
70% |
|
A |
MTH 03 |
Male |
5 |
LectureLab |
24 |
70% |
|
A |
MTH 04 |
Male |
5 |
LectureLab |
18 |
70% |
|
B |
MTH 02 |
Male |
3 |
LectureLab |
12 |
70% |
|
B |
MTH 03 |
Male |
5 |
LectureLab |
22 |
70% |
|
B |
MTH 04 |
Male |
5 |
LectureLab |
30 |
70% |
|
C |
MTH 02 |
Male |
3 |
LectureLab |
18 |
70% |
|
C |
MTH 03 |
Female |
5 |
LectureLab |
21 |
70% |
|
C |
MTH 04 |
Female |
5 |
LectureLab |
16 |
70% |
|
D |
MTH 02 |
Female |
5 |
Individual |
22 |
85% |
|
D |
MTH 03 |
Female |
5 |
Individual |
24 |
75% |
|
D |
MTH 04 |
Female |
5 |
Individual |
22 |
75% |
|
E |
MTH02,03,04 |
Female |
5 |
Individual |
19 |
80% |
|
E |
MTH02,03,04 |
Female |
5 |
Individual |
22 |
80% |
First, these three courses—Basic Arithmetic (MTH
02), Basic Algebra I (MTH 03), and Basic Algebra II (MTH 04)—were, for the most
part, offered for five hours credit. An
earlier study (Waycaster, 1998) revealed that the
hours of credit given for developmental mathematics courses varied across the
VCCS. Since that time, adjustments have
been made in the credit hours for courses in at least two of the five colleges
involved in this study, making them more consistent with other colleges in the
system. At the time of this study, only
two sections of MTH 02 were offered for three hours credit. All other courses were offered for five hours
credit. The five-hour credit courses had
a variety of class meeting patterns.
·
2 days per week
for 2 hours and 15 minutes each with a break
·
3 days per week
for 1 hour and 25 minutes each
·
3 days per week—2
days for 2 hours each with a break, 1 day for 50 minutes
·
4 days per week—2
days for 50 minutes each, 2 days for 75 minutes each
·
5 days per week
for 50 minutes each
Developmental courses are taught in the system at a funding ratio of 15:1 and usually with a maximum enrollment of 20-25 students with the understanding that a few students will never attend class and/or withdraw during the first couple of weeks. Enrollment in these classes ranged from 12 to 24 with the exception of one MTH 04 class with 30 students. However, no more that 23 students were ever present during any observation day.
Usually from 56% to 81% of the students attended, with the exception of one MTH 04 class that never saw 50% of its students present. Attendance dropped to under ten students in several classes during my third visit near the end of the semester, which is characteristic of many developmental mathematics classes. This attendance problem was most prevalent in the lecture courses with a break. A few students would simply not return from break for the second half of the class period. One of these colleges has decided to change its meeting times for Fall 2000 from one with a break to the 3 days per week for 1 hour and 25 minutes each day without a break in an attempt to resolve this problem.
Female students outnumbered male students in six classes, and males outnumbered females in four classes—three of which were MTH 04. Females tend to outnumber males in MTH 02 and MTH 03 while males outnumber females in MTH 04. As for gender of teacher, there were six female instructors and six male instructors. Only experienced developmental mathematics faculty members were involved in this study. All but one instructor was full-time. This one part-time instructor was a retired high school teacher who had taught the same developmental mathematics course at the college for the last eight years.
The primary methods of instruction were lecture/lab
and individualized (Computer-Assisted Instruction). Three of the colleges use a lecture/lab
format, one college is individualized with tutors assisting teachers, and one
college offers all developmental courses in both a lecture and CAI mode. For this study, only the CAI sections at this
college were observed. All classes
taught in a lecture/lab format at three of the colleges routinely reserved
specified times during class for students to work individually and/or in groups
with worksheets.
Participation Rates
One way to determine if students are engaged in learning is the degree of student participation, i.e., the number of questions asked and answers given by the students during a lecture. So this question/answer data was gathered on nine of the classes in the three colleges that utilized the lecture/lab mode of instruction. Table 2 presents this information.
Table 2
Participation Rates During Lectures in Developmental Math Classes
|
Site |
Course |
Teacher
Gender |
Student
Gender |
Attend |
Male |
Female |
Question |
Male |
Female |
Answer |
Male |
Female |
|
A
|
MTH02 |
F |
F |
15 |
20% |
80% |
65 |
5% |
95% |
126 |
9% |
91% |
|
A |
MTH02 |
F |
F |
12 |
17% |
83% |
|
|
|
103 |
8% |
92% |
|
A |
MTH02 |
F |
F |
6 |
17% |
83% |
|
|
|
81 |
4% |
96% |
|
A |
MTH03 |
M |
|
14 |
50% |
50% |
23 |
87% |
13% |
59 |
54% |
46% |
|
A |
MTH03 |
M |
|
13 |
46% |
54% |
|
|
|
130 |
45% |
55% |
|
A |
MTH03 |
M |
|
14 |
50% |
50% |
|
|
|
81 |
47% |
53% |
|
A |
MTH04 |
M |
M |
8 |
75% |
25% |
30 |
87% |
13% |
126 |
74% |
26% |
|
A |
MTH04 |
M |
M |
4 |
100% |
0% |
|
|
|
176 |
100% |
0% |
|
A |
MTH04 |
M |
M |
4 |
75% |
25% |
|
|
|
126 |
77% |
23% |
|
B |
MTH02 |
M |
F |
9 |
33% |
67% |
25 |
4% |
96% |
60 |
20% |
80% |
|
B |
MTH02 |
M |
F |
8 |
12.5% |
87.5% |
|
|
|
56 |
0% |
100% |
|
B |
MTH02 |
M |
F |
7 |
0% |
100% |
|
|
|
69 |
0% |
100% |
|
B |
MTH03 |
M |
F |
17 |
35% |
65% |
5 |
20% |
80% |
36 |
81% |
19% |
|
B |
MTH03 |
M |
F |
9 |
11% |
89% |
|
|
|
38 |
0% |
100% |
|
B |
MTH03 |
M |
F |
9 |
22% |
78% |
|
|
|
53 |
2% |
98% |
|
B |
MTH04 |
M |
|
23 |
39% |
61% |
3 |
67% |
33% |
56 |
27% |
73% |
|
B |
MTH04 |
M |
|
18 |
61% |
39% |
|
|
|
8 |
83% |
17% |
|
B |
MTH04 |
M |
|
14 |
43% |
57% |
|
|
|
46 |
67% |
35% |
|
C |
MTH02 |
M |
F |
16 |
44% |
56% |
29 |
3% |
97% |
119 |
53% |
47% |
|
C |
MTH02 |
M |
F |
12 |
42% |
58% |
|
|
|
120 |
38% |
62% |
|
C |
MTH02 |
M |
F |
12 |
42% |
58% |
|
|
|
136 |
54% |
46% |
|
C |
MTH03 |
F |
F |
18 |
17% |
83% |
8 |
25% |
75% |
48 |
40% |
60% |
|
C |
MTH03 |
F |
F |
14 |
7% |
93% |
|
|
|
|
|
|
|
C |
MTH03 |
F |
F |
13 |
8% |
92% |
|
|
|
30 |
13% |
87% |
|
C |
MTH04 |
F |
M |
13 |
69% |
31% |
23 |
13% |
87% |
57 |
54% |
46% |
|
C |
MTH04 |
F |
M |
15 |
60% |
40% |
|
|
|
81 |
37% |
63% |
|
C |
MTH04 |
F |
M |
7 |
57% |
43% |
|
|
|
28 |
7% |
93% |
Participation rates varied according to gender
makeup of the class for the most part.
In other words, if the class were predominantly male, then most of the
student responses came from males; if the class were predominantly female, then
most of the student responses came from females. Six classes were predominantly female, and
four classes were predominantly male.
Consequently, as expected, the percentage columns for questions and
answers reflect higher numbers for females when the class is predominantly
female and higher numbers for males when the class is predominantly male, with
two exceptions. First, MTH 03 at college
B was predominantly female, yet on the first classroom visit, males gave 81% of
the 127 answers. Second, MTH 04 at college C was predominantly male, but most
of the questions (87%) and answers (62%) were initiated by females. Another variable, which may have influenced
this deviation from the norm, is the gender of the teacher. The MTH 03 teacher was male and the MTH 04
teacher was female. Is it possible that
math classrooms foster greater participation from students of the same gender
as that of the teacher? Research (Waycaster, 1980) on gender and mathematics classes supports
this idea. Notice that in classes with
males and females equally distributed, males more often dominate questions and
answers. Research in the late 1970’s and
early 1980’s involving mixed-sex developmental mathematics classes found that
males dominated classroom discussions regardless of the gender makeup of the
group. Data from the current study show
that we have progressed a long way from this pattern of the 1970’s. In fact numerous questions and answers were
offered in most of the classes observed from both male and female students.
Findings
and Recommendations
Table 3 contains enrollments and grade
distributions over a seven-year period for Basic Arithmetic (MTH 02), Basic
Algebra I (MTH 03), and Basic Algebra II (MTH 04) for the five colleges in the
study.
Table 3
Success Rates for Developmental Mathematics Classes
Summer, 1993—Spring, 2000
|
|
Basic Arithmetic |
Basic Algebra I |
Basic Algebra II |
||||||
|
Site |
Total |
Pass |
% Pass |
Total |
Pass |
% Pass |
Total |
Pass |
% Pass |
|
A |
1321 |
652 |
49% |
2391 |
1294 |
54% |
696 |
446 |
64% |
|
B |
1915 |
970 |
51% |
2859 |
829 |
29% |
1175 |
459 |
39% |
|
C |
743 |
448 |
60% |
997 |
531 |
53% |
742 |
395 |
53% |
|
D |
958 |
401 |
42% |
2422 |
1204 |
50% |
1536 |
791 |
51% |
|
E |
224 |
93 |
42% |
1319 |
485 |
37% |
685 |
357 |
52% |
Passing
percentages ranged from 29% to 64% across the colleges. Student enrollment for these seven years also
varied from 224 to 2859 for any given developmental mathematics course. A closer look at these enrollment numbers and
success rates reveals some noteworthy data and raises some interesting
questions. First, MTH 03 routinely
enrolls the highest numbers of students in all five colleges. The highest success rates (60%, 54% and 64%)
occurred in MTH 02 at College C, MTH 03 at college A, and MTH 04 at college A,
respectively. Two of the five colleges (A and C) attained 
50% success rates in
all three courses.
College-Level
Courses
Table 4 lists the college level courses taken immediately after successful completion of the corresponding developmental mathematics course. For each college level course the number of developmental and nondevelopmental students enrolled is noted as well as the passing percentage.
Table 4
Success Rate for College Level Mathematics Courses
Fall, 1993—Spring, 2000
|
Site |
Student |
02 |
02 |
02 |
03 |
03 |
03 |
03 |
04 |
04 |
04 |
||||||||||
|
|
|
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
N |
% |
|
A |
dev |
14 |
43 |
|
|
16 |
50 |
12 |
75 |
164 |
78 |
177 |
79 |
66 |
55 |
|
|
26 |
77 |
57 |
63 |
|
A |
reg |
268 |
69 |
|
|
225 |
71 |
84 |
54 |
306 |
80 |
945 |
77 |
747 |
66 |
|
|
945 |
77 |
747 |
66 |
|
B |
dev |
|
|
10 |
50 |
111 |
66 |
18 |
83 |
95 |
77 |
|
|
|
|
|
|
18 |
89 |
59 |
56 |
|
B |
reg |
|
|
283 |
69 |
339 |
76 |
85 |
59 |
294 |
68 |
|
|
|
|
|
|
99 |
61 |
552 |
65 |
|
C |
dev |
|
|
|
|
88 |
66 |
|
|
51 |
84 |
17 |
76 |
|
|
|
|
29 |
83 |
47 |
51 |
|
C |
reg |
|
|
|
|
691 |
70 |
|
|
303 |
81 |
295 |
64 |
|
|
|
|
295 |
64 |
346 |
49 |
|
D |
dev |
75 |
60 |
|
|
|
|
39 |
59 |
|
|
57 |
63 |
17 |
35 |
25 |
72 |
35 |
63 |
133 |
50 |
|
D |
reg |
750 |
74 |
|
|
|
|
179 |
48 |
|
|
686 |
54 |
692 |
45 |
180 |
47 |
685 |
54 |
693 |
45 |
|
E |
dev |
22 |
77 |
|
|
|
|
|
|
|
|
|
|
|
|
|
|
16 |
75 |
25 |
68 |
|
E |
reg |
770 |
80 |
|
|
|
|
|
|
|
|
|
|
|
|
|
|
180 |
82 |
632 |
70 |
MTH 02—Basic Arithmetic MTH 120—Introduction to
Mathematics MTH 115—Technical
Math
MTH 03—Basic Algebra I MTH 126—Math for Allied
Health MTH 151—Math
for Liberal Arts
MTH 04—Intermediate Algebra MTH 141—Business
Math MTH
163—Precalculus
Dev--developmental student reg—regular
,nondevelopmental student
Several
observations are noteworthy. First,
there were mixed results for students in colleges A, B, and D tracked from MTH
02 to their first college-level mathematics course. For the 02
120 sequence, students in College A did not reach an adequate
success level (43%) whereas students in Colleges D and E, both with an individualized instruction
format, attained high levels of success (60% and 77% respectively), which were
close to the success rates of nondevelopmental
students in this course. But note that
Colleges D and E had lower success rates than College A in the Basic Arithmetic
course. One possible explanation is that
Colleges D and E require higher passing criterions, making developmental
students better prepared for college-level mathematics courses. A similar pattern occurs for the 02141 sequence. (Note that MTH 120 and MTH 141 are virtually
the same course.) Students in College A
achieved a lower success rate (50%) than students in Colleges B and C (66%
each). But this time all three colleges
used a lecture format, so a higher passing criterion for developmental courses
cannot explain the difference. Since
College A has inadequate success levels in both MTH 120 and MTH 141, a closer
look at content coverage and passing criteria in both MTH 02 as well as MTH 120
and MTH 141 at that college seems appropriate.
A second consideration may be to change the prerequisite for MTH 120 and
MTH 141 to include one unit of high school algebra.
Even though the prerequisite for MTH 126 is only one unit of mathematics, College B was the only college having students enroll in MTH 126 immediately after successfully completing MTH 02. These students attained a 50% success rate in MTH 126, much lower than the success rates (77%, 78%, and 84%) for developmental students who first successfully completed MTH 03. In fact the success rates of these MTH 03 students were comparable or better than the success rates of nondevelopmental students taking MTH 126. Thus, these observations suggest that good advice to students in the Allied Health Program is to first complete MTH 03 before enrolling in MTH 126.
Students in Colleges A, B, and D taking Technical Math (MTH 115) immediately after successfully completing Basic Algebra I outperformed their nondevelopmental counterparts in this college-level course. However, those students taking MTH 04 before MTH 115 in College D had higher success rates (72% versus 59%) in this college-level course. Even though MTH 04 is the prerequisite for MTH 115, it appears that students taking MTH 115 immediately after successfully completing MTH 03 are achieving higher success rates in this course than their nondevelopmental classmates. Then why should MTH 04 be required to enroll in the MTH 115-116 sequence? The course description for MTH 115-116 provides the rationale for the MTH 04 prerequisite. Topics listed for coverage in this sequence of courses include exponential and logarithmic functions, trigonometry, analytic geometry and complex numbers. MTH 04 provides a much stronger foundation for studying these topics than MTH 03. Further research to determine success rates in MTH 116—the second course in this sequence—for MTH 03 and MTH 04 students would provide valuable additional tracking information on this Technical Math sequence.
This scenario is repeated when tracking students from MTH 03 and MTH 04 into Liberal Arts Math (MTH 151). Students in Colleges A, C, and D proceeding into MTH 151 immediately after successfully completing MTH 03 attain higher levels of success (79%, 76%, and 63% respectively) than their nondevelopmental counterparts. All five colleges had students who successfully completed MTH 04 before enrolling in MTH 151. These students had comparable or a slightly higher success rates in MTH 151. So why should students take MTH 04 before enrolling in the MTH 151-152 sequence? The topics covered in MTH 152—the second course in the sequence—include combinatorics, probability, statistics and algebraic systems. Here again, MTH 04 gives a better preparation for these topics. Tracking research on MTH 152 for MTH 03 and MTH 04 students may provide insights and possible answers as to the need for MTH 04 as a prerequisite.
Tracking
to Precalculus (MTH 163) from MTH 03 and MTH 04
backgrounds produces more clean cut results.
Students taking MTH 163 immediately following successful completion of
MTH 03 in Colleges A and D achieved 55% and 35% success rates
respectively. Students in all five
colleges who successfully completed MTH 04 before taking MTH 163 achieved 50% levels of success
in this college-level course.
Furthermore, all but one college (B) saw the developmental MTH 04
students with comparable or higher success rates than their nondevelopmental
counterparts. And, the students at
Colleges A and D who successfully completed MTH 04 before taking MTH 163
achieved comparable or higher success levels in the college-level course. Thus, the rationale for recommending
successful completion of MTH 04 before enrolling in MTH 163 is certainly
justified by the findings in this research.
Retention
Rates
Table 5 lists the retention (a retained student is one who enrolled during the following term) percentages for developmental and nondevelopmental students for the five colleges over a three-year period from Fall 1997 through Spring 2000.
Table 5
Retention Rates for Developmental and Nondevelopmental Math Students
|
Site |
Dev/ Reg |
Fall, 1997 |
Spr, 1998 |
Fall, 1998 |
Spr, 1999 |
Fall,
1999
|
Spr, 2000 |
|
|
|
N |
% |
N |
% |
N |
% |
|
A |
Dev |
175 |
80.6 |
131 |
79.4 |
116 |
65.5 |
|
A |
Reg |
781 |
47.9 |
827 |
50.7 |
939 |
46.1 |
|
B |
Dev |
344 |
61.9 |
324 |
64.2 |
279 |
64.5 |
|
B |
Reg |
652 |
61.7 |
614 |
55.5 |
664 |
61.9 |
|
C |
Dev |
117 |
73.5 |
173 |
74.0 |
172 |
78.5 |
|
C |
Reg |
630 |
46.8 |
822 |
42.1 |
780 |
53.2 |
|
D |
Dev |
271 |
79.3 |
322 |
79.5 |
316 |
72.5 |
|
D |
Reg |
1004 |
52.5 |
1014 |
53.9 |
1048 |
51.1 |
|
E |
Dev |
62 |
67.7 |
75 |
78.7 |
48 |
77.1 |
|
E |
Reg |
817 |
42.4 |
747 |
51.0 |
843 |
51.6 |
First, retention rates for developmental
students range from 61.9% to 80.6% across the five colleges for this time
period. One college (B) stands out in
that it has one of the highest enrollments in developmental mathematics classes
yet the lowest retention rates for developmental students. However, these “lowest” retention rates for
developmental students were still all higher than the retention rates for nondevelopmental students across all five colleges. Specifically, the retention rates for nondevelopmental students ranged from 42.1% to 61.9% for
this time period. Note that the lowest
rate of retention for developmental students (61.9%) is the same as the highest
retention rate for nondevelopmental students. In other words, for the three-year period
from 1997-2000, retention rates for developmental mathematics students were
almost 19 percentage points higher than the retention rates for nondevelopmental students.
What accounts for this phenomenon?
Developmental faculty would argue that the extra attention—in
counseling, advising, teaching, and monitoring progress—as well as smaller
classes contribute greatly to this higher level of retention for developmental
mathematics students. This research
gives support to their argument. The only college (B) having a developmental
class enrollment over 25 is the same college with the lowest developmental
retention rates. Thus, smaller class
size and special attention through advisement may be a key to retaining developmental
students.
Graduation Rates
Table 6 lists the numbers and percentages of
community college graduates since 1993-94 who took developmental coursework as
part of their studies.
Table 6
Community College Graduates Who Have Taken Developmental Courses
Fall, 1993—Spring, 2000
|
Campus |
1993-94 |
1994-95 |
1995-96 |
1996-97 |
1997-98 |
1998-99 |
||||||
|
|
# Dev |
%Dev |
# Dev |
%Dev |
# Dev |
%Dev |
# Dev |
%Dev |
# Dev |
%Dev |
# Dev |
%Dev |
|
A |
223 |
40.4 |
245 |
44.1 |
230 |
43.6 |
222 |
43.7 |
225 |
43.5 |
250 |
40.7 |
|
B |
135 |
53.8 |
135 |
53.4 |
158 |
53.6 |
206 |
53.8 |
182 |
52.6 |
197 |
53.0 |
|
C |
89 |
30.4 |
82 |
30.1 |
77 |
35.8 |
88 |
32.7 |
86 |
32.8 |
76 |
35.3 |
|
D |
162 |
44.0 |
205 |
53.8 |
150 |
46.0 |
134 |
45.0 |
129 |
41.2 |
147 |
45.7 |
|
E |
153 |
45.5 |
157 |
45.6 |
145 |
40.7 |
157 |
42.1 |
135 |
38.4 |
121 |
38.7 |
|
|
1800 |
42.3 |
1806 |
45.6 |
1720 |
44.2 |
1831 |
44.1 |
1790 |
42.3 |
1836 |
43.1 |
The totals report that over 40% of the graduates from the five
community colleges in this study have taken some developmental coursework in
their program of studies. This is an
impressive statistic, which supports the argument that developmental students do
progress to complete their program or degree and do indeed graduate. In fact, for one college (B) a majority of
its graduates took developmental work.
Conclusion
This study involving five community colleges has resulted in several suggestions for developmental mathematics programs and recommendations for additional research. Course logistics reveal that even though most of the courses carried five hours of credit, there were several different scenarios for meeting times during the week. With such a variety, colleges may choose the pattern which best meets the needs of their students and promotes good attendance habits. Developmental mathematics instructors need to be aware of the gender dynamic routinely at work in the classroom and strive to involve the minority gender in discussions on content. Teachers need to remember that teacher gender also can influence participation from students and work to include both males and females in questions and answers. Checking class attendance regularly and knowing students’ names are details that convey to students that the teacher is concerned about them and their success in class. Every developmental math teacher in all five colleges took class attendance at the beginning of class at every class observation.
Ten
of the fifteen developmental mathematics classes had success rates 50%, yet five classes
had success rates lower than 50%. The
two colleges using individualized instruction had inadequate success rates in
both Basic Arithmetic classes and one Basic Algebra I class, and one lecture
college had low success rates in both Basic Algebra I and Basic Algebra
II. This data is evidence that one mode
of instruction is not a panacea for all students and suggest that colleges
offer at least two modes of instruction for developmental mathematics courses,
if at all possible.
Tracking
developmental students into college-level classes produced some interesting
findings and implications for future research.
Students proceeding from Basic Arithmetic (MTH 02) to college-level
mathematics courses had mixed results, but for the most part students succeeded
in Intro and Business Math courses (MTH 120 and 141). One lecture college had low success rates in
these college-level courses, which suggests a closer examination of their
content coverage and passing criteria for both Basic Arithmetic and the college
level courses. Students who enrolled in
Technical Math immediately after successfully completing Basic Algebra I fared
well in this college mathematics course, outperforming the nondevelopmental
students in the same course, but not performing quite as well as students who
first completed Basic Algebra II.
Although most students succeeded in Technical Math with only a Basic
Algebra I background, this researcher argues that the real need for mastery of
Basic Algebra II before enrolling in this sequence is apparent in the content
coverage for the second course in this sequence (MTH 116). Hence, the VCCS
guidelines appropriately list MTH 04 as a prerequisite for this sequence. Tracking research is recommended for this
sequence to determine the success rates for students in MTH 115-116 with MTH 03
versus MTH 04 backgrounds. A similar
pattern occurs when tracking developmental students into the Liberal Arts
sequence (MTH 151-152). Students with
only a MTH 03 background again outperformed their nondevelopmental
counterparts in MTH 151 as did developmental students with a MTH 04
background. Yet MTH 04 remains as a
prerequisite for Liberal Arts Math since its real value appears in the second
course in this sequence (MTH 152).
Additional tracking of developmental students through this sequence is
also recommended. Tracking developmental
students into Precalculus (MTH 163) is much more
clean-cut. All students who first
completed MTH 04 before taking MTH 163 succeeded at 50%. Furthermore, all colleges but one
outperformed their nondevelopmental classmates. Students from two colleges enrolled in MTH
163 immediately after MTH 03 and attained lower success rates. Additional research on this sequence to monitor
success rates in MTH 164 (Trigonometry) for students with a MTH 03 versus MTH
04 background is warranted.
Finally, the research data on retention rates and graduation rates speak to the real purpose of developmental programs in community colleges. The three-year cohort study reveals that retention rates (61.9%--80.6%) for developmental students is about 19 percentage points higher than retention rates for nondevelopmental students. In fact, across the five colleges, the lowest rate of retention for developmental students (61.9%) is identical to the highest retention rate for nondevelopmental students. Thus, with higher retention rates as one of the goals for community colleges, developmental educators must continue giving strong support in the counseling, advising, and teaching of these students. The high percentage (40%) of graduates with developmental background found in this study also gives added support to the extra assistance provided to developmental students. Results of this study validate the efforts of faculty and staff in these open-door community colleges to bring underprepared students to an academic level that allows them to compete with regular college students.
References
Bartholomay, A. C. 2000, February 3. Recommendations from the VCCS
Developmental Education Implementation Task Force: Report No.1:
Standards for Developmental Education in the Virginia Community College
System. Richmond: Virginia Community
College System.
“Remedial Classes Not Always Sign of Bad
Education, Study Says.” (1998, December
13). Bristol Herald Courier.
The
Institute For Higher Education Policy. December 1998. College
Remediation: What It Is: What It Costs: What’s at Stake. Washington, DC.
Waycaster, E. P. 1980.
The Relationship Between Achievement of Women in AnAll-Female
Basic Algebra Class and the Achievement of Women in Mixed-Sex Classes. Doctoral Dissertation. Indiana
University, Bloomington, IN.
Waycaster, P. 1998.
“Students Should Spend Sufficient Time on Developmental Mathematics.” Inquiry:
The Journal of the Virginia Community Colleges 2 (1): 26-31.
Woodhams, Fred. 1998, December 2. “Report Finds
Misperceptions about Costs, Beneficiaries of Remedial Education.” The Chronicle of Higher Education: Today’s News.