| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 1029.1 | I think partial credit best | HIBOB::SIMMONS | Tristram Shandy as an equestrian | Thu Feb 16 1989 17:36 | 20 |
| I taught second semester calculus about a year ago and found that
giving partial credit was great for the students and very time consuming
for me. Partial credit has been my norm in teaching but with calculus
there can be problems being fair. I decided my students would rather
have the reinforcement for getting something right and not worry
that much about whether I met the standards of Solomon. I believe
I was right and my extra work was justified by the results.
Sometimes not giving partial credit is laziness and sometimes it
is perfectionism. In either case, I don't consider the environment
the best for a subject containing many new concepts and requiring
the student to build rapidly on the new concepts.
In short, the class may be frustrating and not a happy learning
experience. Of course, all of the students will have the same handicap
on tests etc. so the instructor should be evaluated on other strengths
if any. Not my cup of tea and I wouldn't like the class but it
could be OK.
Chuck
|
| 1029.2 | | ALIEN::POSTPISCHIL | Always mount a scratch monkey. | Fri Feb 17 1989 08:13 | 19 |
| I don't think it makes much difference. Either way, the teacher has to
adjust the difficulty of the test so that some students get a good
portion correct and some students get a good portion wrong. The
purpose of the test is to measure ability and anything which scores the
ability being taught while giving different scores to people with
different ability is a suitable measurement. (Then the teacher also
has the job of standardizing the measurement.)
I think it would be wrong to call requiring a student to get a problem
correct an injustice. The ultimate goal of teaching calculus is for
the student to be able to do calculus. If you're ever going to use
calculus, say in engineering a bridge, you've got to get the right
answer. There isn't any partial credit if the bridge falls down
because of an arithmetic error. I don't see anything wrong with
requiring a student to demonstrate that they can handle the entire
subject before giving them a grade certifying that.
-- edp
|
| 1029.3 | Arithmetic and Mathematics not the same | HIBOB::SIMMONS | Tristram Shandy as an equestrian | Fri Feb 17 1989 11:34 | 25 |
| re .2
I would be careful of these statements. It is well known that calculus
is used by engineering departments as a washout course. I consider
this silly but it is a fact of life. (Calculus flunk out rate
exceeds 50%.) Not all teachers of mathematics feel the way I do
about this state of affairs (most do, however) so one finds calculus
teachers in sympathy with the engineering departments once in a
while.
Another point I should like to make is that not all of us in mathematics
can do arithmetic - I was a consistent "C" student in arithmetic
in grade school. I did, however, fully understand that there is
no correlation at all between arithmetical ability and mathematical
ability. On top of this, several excellent mathematicians I know
cannot even make change! They would never have completed their
undergraduate math if arithmetical accuracy had been required of
them.
Insisting on exactness of numerical answers favors students good
at that. As far as getting the right answer in engineering is
concerned, that is not a problem in any case. I usually work such
problems several times to debug the answers.
Chuck
|
| 1029.4 | Here's what one prof. did | SKIF::CJOHNSON | | Mon Feb 20 1989 15:10 | 15 |
| The best calculus instructor I ever had instructed the class to
put any numeric answers in the form of fractions i.e. 3/17, or
22/7, etc. (He would NOT have considered 6/34 or 44/14 as a 'good'
answer, however).
I think I remember him saying that he found it hard to do arithmetic
also, and that one could always resort to a calculator if necessary,
but he was damned if HE was going to calculate decimal answers to
his problems.
I also seem to remember that MOST of his examination problems
eventually resolved to extremely simple fractions.
As a result, I do a lot of mental calculations in the same manner,
now.
|
| 1029.5 | we could lose credit even if we DID get the right answer | HANNAH::OSMAN | type hannah::hogan$:[osman]eric.vt240 | Tue Feb 21 1989 11:57 | 28 |
|
In one memorable electrical engineering class, when we turned
in problem sets, we were required to include a check. Without
a check, even if our answer and work were right, we didn't
get credit!
For example, suppose the problem were to solve
x^2 - x + 12 = 106/9
You could do the quadratic formula on your paper, and get
2/3 as the answer.
But no credit unless you showed a check too ! For example, you
could show:
(2/3)^2 = 4/9
4/9 - 2/3 = -2/9
-2/9 + 12 = -2/9 + 108/9 = 106/9
I found this course VERY helpful, since in future work I had
learned to do checks and hence greatly reduce the chance of
having errors.
/Eric
|
| 1029.6 | I'm glad I didn't matriculate *there*! | KOBAL::GILBERT | Ownership Obligates | Tue Feb 21 1989 12:31 | 6 |
| > In one memorable electrical engineering class, when we turned
> in problem sets, we were required to include a check. Without
> a check, even if our answer and work were right, we didn't
> get credit!
Would a check for $10.00 suffice?
|
| 1029.7 | | HERON::BUCHANAN | Andrew @vbo/dtn8285805/ARES,HERON | Sat Feb 25 1989 11:49 | 14 |
| When I was ten years old, my maths teacher gave occasional revision
tests in class. There were a number of idiosyncrasies in the marking scheme
he used.
(1) The number of points awarded for a question was equal to the number
of pupils who got the question *wrong*.
(2) To a question such as "How many edges does a cube have?" the answer
"12 edges" would be marked wrong. No marks. Luxembourg, nul points.
(Sorry, European joke). The correct answer is "12". Because to reply
"12 edges" `implied' that a cube has 12 edges*edges. The units are
wrong.
Andrew.
|