IndefiniteIntegrals1
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Indefinite Integrals and General Antiderivatives
This PG code shows how to check answers that are indefinite integrals or general antiderivatives.
- Download file: File:IndefiniteIntegrals1.txt (change the file extension from txt to pg when you save it)
- File location in NPL:
NationalProblemLibrary/FortLewis/Authoring/Templates/IntegralCalc/IndefiniteIntegrals1.pg
| PG problem file | Explanation |
|---|---|
|
Problem tagging: |
|
DOCUMENT(); loadMacros( "PGstandard.pl", "MathObjects.pl", "AnswerFormatHelp.pl", "parserFormulaUpToConstant.pl", ); TEXT(beginproblem()); |
Initialization: |
Context("Numeric");
#
# Specific antiderivative:
# Marks correct e^x, e^x + pi, etc
#
$specific = Formula("e^x")->flags(upToConstant=>1);
#
# General antiderivative
# Marks correct e^x + C, e^x + C - 3, e^x + K, etc.
#
$general = FormulaUpToConstant("e^x");
|
Setup: |
Context()->texStrings;
BEGIN_TEXT
Enter a specific antiderivative for \( e^x \):
\{ ans_rule(20) \}
\{ AnswerFormatHelp("formulas") \}
$BR
$BR
Enter the most general antiderivative for \( e^x \):
\{ ans_rule(20) \}
\{ AnswerFormatHelp("formulas") \}
END_TEXT
Context()->normalStrings;
|
Main Text: |
$showPartialCorrectAnswers = 1; ANS( $specific->cmp() ); ANS( $general ->cmp() ); |
Answer Evaluation: |
Context()->texStrings;
BEGIN_SOLUTION
${PAR}SOLUTION:${PAR}
Solution explanation goes here.
END_SOLUTION
Context()->normalStrings;
COMMENT('MathObject version.');
ENDDOCUMENT();
|
Solution: |
