Difference between revisions of "FormulasToConstants"
(New page: <h2>Formulas Up To Constants: PG Code Snippet</h2> <p style="background-color:#eeeeee;border:black solid 1px;padding:3px;"> <em>This code snippet shows the essential PG code to evaluate a...) |
|||
| (7 intermediate revisions by 5 users not shown) | |||
| Line 1: | Line 1: | ||
| − | <h2>Formulas Up To Constants: PG Code Snippet</h2> |
||
| + | {{historical}} |
||
| + | |||
| + | <p style="font-size: 120%;font-weight:bold">This problem has been replaced with [https://openwebwork.github.io/pg-docs/sample-problems/problem-techniques/FormulasToConstants.html a newer version of this problem]</p> |
||
| + | <h2>Formulas Up To Additive Constants: PG Code Snippet</h2> |
||
<p style="background-color:#eeeeee;border:black solid 1px;padding:3px;"> |
<p style="background-color:#eeeeee;border:black solid 1px;padding:3px;"> |
||
| Line 51: | Line 54: | ||
<pre> |
<pre> |
||
BEGIN_TEXT |
BEGIN_TEXT |
||
| − | An antiderivative of \(cos(x)\) is |
+ | An antiderivative of \(\cos(x)\) is |
\{ ans_rule(15) \} |
\{ ans_rule(15) \} |
||
$BR |
$BR |
||
| Line 72: | Line 75: | ||
<td style="background-color:#eeccff;padding:7px;"> |
<td style="background-color:#eeccff;padding:7px;"> |
||
<p> |
<p> |
||
| − | And then in the answer and solution section of the file we rely on the MathObjects <code>cmp()</code> method. By specifying the <code>upToConstant=>1</code> flag for <code>cmp()</code>, we allow the student's answer to differ from the correct answer by any specific constant. |
+ | And then in the answer and solution section of the file we rely on the MathObjects <code>cmp()</code> method. By specifying the <code>upToConstant=>1</code> flag for <code>cmp()</code>, we allow the student's answer to differ from the correct answer by any specific constant. <code>sin(x)</code> and <code>sin(x)+5</code> are both marked as correct but <code> sin(x) +C </code> is not correct since it is a family of answers and not a single anti-derivative. |
| − | + | ||
| − | < |
+ | Note that for the formula up to an arbitrary constant the comparison will correctly mark students' answers that have different arbitrary constants: thus, a student answer of <code>sin(x)+k</code> to the second question here will be marked correct as will <code>sin(x) +c </code>. |
| − | Note that for the formula up to an arbitrary constant the comparison will correctly mark students' answers that have different arbitrary constants: thus, a student answer of <code>sin(x)+k</code> to the second question here will be marked correct. |
||
</p> |
</p> |
||
</td> |
</td> |
||
</tr> |
</tr> |
||
</table> |
</table> |
||
| + | |||
| + | |||
| + | |||
| + | <ul> |
||
| + | <li>POD documentation: [http://webwork.maa.org/pod/pg/macros/parserFormulaUpToConstant.html parserFormulaUpToConstant.pl]</li> |
||
| + | <li>PG macro: [http://webwork.maa.org/viewvc/system/trunk/pg/macros/parserFormulaUpToConstant.pl?view=log parserFormulaUpToConstant.pl]</li> |
||
| + | </ul> |
||
| + | |||
| + | |||
| + | |||
<p> |
<p> |
||
| Line 141: | Line 154: | ||
[[IndexOfProblemTechniques|Problem Techniques Index]] |
[[IndexOfProblemTechniques|Problem Techniques Index]] |
||
</p> |
</p> |
||
| + | |||
| + | [[Category:Problem Techniques]] |
||
Latest revision as of 15:55, 20 June 2023
This problem has been replaced with a newer version of this problem
Formulas Up To Additive Constants: PG Code Snippet
This code snippet shows the essential PG code to evaluate antderivative and general antiderivative formulas. Note that these are insertions, not a complete PG file. This code will have to be incorporated into the problem file on which you are working.
There are two types of comparison that we're interested in here: one is "an antiderivative of f(x)", and the other is "the most general antiderivative of f(x)". The former requires that the student answers F(x), F(x)+1, F(x)-sqrt(8), etc., all be marked correct, and the latter, that F(x)+C, F(x)+5-k, etc., all be marked correct. These are both illustrated below.
It is possible to do some of this type of comparison with old-style answer checkers. This is shown in a table below.
| PG problem file | Explanation |
|---|---|
loadMacros("parserFormulaUpToConstant.pl");
|
To check the most general antiderivative of a function, that is, a formula up to an arbitrary additive constant, we need to load the |
$func = Formula("sin(x)");
$gfunc = FormulaUpToConstant("sin(x)+C");
|
In the problem set-up section of the problem file, we define an antiderivative function, |
BEGIN_TEXT
An antiderivative of \(\cos(x)\) is
\{ ans_rule(15) \}
$BR
The most general antiderivative is
\{ ans_rule(15) \}
END_TEXT
|
In the text section of the file we ask for the answers as usual. |
ANS( $func->cmp(upToConstant=>1) ); ANS( $gfunc->cmp() ); |
And then in the answer and solution section of the file we rely on the MathObjects |
- POD documentation: parserFormulaUpToConstant.pl
- PG macro: parserFormulaUpToConstant.pl
With old-style answer checkers we can check antiderivatives, but checking the most general antiderivative is much less elegant, as we have to require that the student use a specific constant of integration.
| PG problem file | Explanation |
|---|---|
$func = "sin(x)"; $gfunc = "sin(x)+C"; |
In this case we need no additional macros, and so do not change the description and tagging or initialization sections of the file. In the problem set-up section we specify the function(s) to evaluate. |
BEGIN_TEXT
An antiderivative of \(cos(x)\) is
\{ ans_rule(15) \}
$BR
The most general antiderivative is
\{ ans_rule(15) \}
$BR
${BITALIC}(Use "C" for any arbitrary
constant of integration in your
answer.)$EITALIC
END_TEXT
|
In the text section of the problem we ask for the functions. Because we require that the most general antiderivative use the constant |
ANS( fun_cmp( $func, mode=>"antider" ) ); ANS( fun_cmp( $gfunc, mode=>"antider", var=>["x","C"] ) ); |
When checking the answer in the answer and solutions section of the file, we specify |
