WeightedGrader

#######################
#  Initialization
loadMacros("PGstandard.pl");

#  Usual setup and main text go here

#######################
#  Answer evaluation

install_problem_grader(~~&std_problem_grader);

$showPartialCorrectAnswers = 0;

ANS($a->cmp());
ANS($b->cmp());
ANS($c->cmp());

Initialization: Be sure to load PGstandard.pl, which automatically loads PGanswermacros.pl which has the standard problem grader.

Answer Evaluation: We use install_problem_grader(~~&std_problem_grader); to give full credit only if all answers are correct, and zero credit otherwise. We should probably also hide feedback on whether answers are partially correct or not by setting $showPartialCorrectAnswers=0;. The standard problem grader is recommended for true / false and multiple choice questions to prevent students from guessing and receiving either feedback or partial credit that tells them whether their guess was correct.

#######################
#  Initialization
loadMacros(
"PGstandard.pl",
"PGgraders.pl",
);

#  Usual setup and main text go here

#######################
#  Answer evaluation

install_problem_grader(~~&full_partial_grader);

$showPartialCorrectAnswers = 1;

ANS($a->cmp());
ANS($b->cmp());
ANS($c->cmp());

Initialization: Be sure to load PGgraders.pl

Answer Evaluation: Use install_problem_grader(~~&full_partial_grader); to install this grader. Everything else is as usual. If the student answers the third question correctly, they will receive full credit no matter what their other answers are.

DOCUMENT();

loadMacros(
"PGstandard.pl",
"MathObjects.pl",
"weightedGrader.pl",
"PGcourse.pl",
);

install_weighted_grader();

TEXT(beginproblem());

Initialization: We need to include the weightedGrader.pl macro file and immediately install it using install_weighted_grader();.

Context("Numeric");
Context()->variables->add(t=>"Real");
Context()->strings->add(A=>{},B=>{});

$r = random(2,4,1);
$answer1 = Real("pi * $r**2");
$answer2 = Formula("($r - 1) * x**2 * t") -> reduce;
$answer3 = String("A");

Setup: To show how this works with MathObjects, we add some variables and strings to the context.

Context()->texStrings;
BEGIN_TEXT
Enter \( \pi $r^2 \): \{ans_rule(10)\}
Enter \( $answer2 \): \{ans_rule(10)\}
Enter A: \{ans_rule(10)\}
END_TEXT
Context()->normalStrings;

Main Text: Answer boxes are as usual.

$showPartialCorrectAnswers = 0;

WEIGHTED_ANS( ($answer1)->cmp(), 40 );
WEIGHTED_ANS( ($answer2)->cmp(), 40 );
WEIGHTED_ANS( ($answer3)->cmp(), 20 );

ENDDOCUMENT();

Answer Evaluation: Use WEIGHTED_ANS( evaluator, weight ); instead of ANS( evaluator );. The code given assigns 40% to each of the first two answers, and 20% to the last answer. The weights should be positive integers that sum to 100.

DOCUMENT();

loadMacros(
"PGchoicemacros.pl",
"PGanswermacros.pl",
"PGauxiliaryFunctions.pl",
"weightedGrader.pl"
);

install_weighted_grader();
$showPartialCorrectAnswers = 1;

TEXT(beginproblem());

Initialization: We need to include the weightedGrader.pl macro file and immediately install it using install_weighted_grader();.

# problem set up
$a = random(2,9,1);
# $region will already be in displaymath mode
$region = "x = $a y, \quad y^3 = x \quad (\mbox{with } y\geq 0)"; 
$lineofrotation = "the y-axis"; 

Setup: Everything is as usual.

BEGIN_TEXT
The volume of the solid obtained by rotating the region enclosed by 
\[
$region
\] 
about $lineofrotation can be computed using the method of disks or 
washers via an integral
$BR
$BCENTER
\( \displaystyle V = \int_a^b \) 
\{NAMED_ANS_RULE('optional1',50)\}  
\{NAMED_POP_UP_LIST('optional2',''=>'?','dx'=>'dx','dy'=>'dy')\}
$ECENTER
$BR
with limits of integration 
\( a = \) \{NAMED_ANS_RULE('optional3',10)\} and 
\( b = \) \{NAMED_ANS_RULE('optional4',10)\}.
$BR
$BR
The volume is \( V = \) \{ans_rule(50)\} cubic units.

$PAR
${BITALIC}
Note: You can earn full credit if the last question   
is correct and all other questions are either blank 
or correct.
${EITALIC}
END_TEXT

Main Text: The answer box for the credit answer (the actual volume) is as usual; however, the other answer boxes are not as usual. In particular, you must use \{ NAMED_ANS_RULE( 'label', width ) \} or an appropriate variation for all answer boxes other than the credit answer.

The second argument ' '=>'?' in NAMED_POP_UP_LIST('optional2', ...) is a "value=>tag" pair which ensures that if the tag '?' is selected the pop-up returns a blank value, so '?' doesn't count as an incorrect answer when CREDIT_ANS is evaluated.

At the bottom of the text of the problem, include a note to students that explains how they can earn credit.

# answers below are incorrect to maintain 
# the integrity of the original problem
$integrand="pi*x**2";
$differential="dx";
$lowerlimit="3";
$upperlimit="5";
$volume = pi*$a**3;

NAMED_WEIGHTED_ANS( 'optional1', fun_cmp($integrand, vars=>['x','y'], 
limits=>[[1,2],[1,2]]), 50 );

NAMED_WEIGHTED_ANS( 'optional2', str_cmp($differential), 2 );

NAMED_WEIGHTED_ANS( 'optional3', num_cmp($lowerlimit), 4 );

NAMED_WEIGHTED_ANS( 'optional4', num_cmp($upperlimit), 4 );

CREDIT_ANS( num_cmp($volume), 
['optional1','optional2','optional3','optional4'], 40 );

COMMENT('Gives partial credit for correct answers to initial questions
or full credit for answering only the the final question correctly.');

ENDDOCUMENT();

Answer Evaluation: For the non-credit answers, use NAMED_WEIGHTED_ANS( 'label', evaluator, weight ); instead of ANS( evaluator );. For the credit answer, use CREDIT_ANS( evaluator, [list of names of answer blanks to provide credit for], weight );. The code given assigns 50% to the integrand, 2% to the differential, 4% to each of the limits of integration, and 40% to the value of the integral. If the student correctly calculates the volume and either enters only the volume or all other answer blanks are correct, then full credit is awarded. The weights should be positive integers that sum to 100.

Since weighted answers with the credit answer option are non-standard, insert a COMMENT() that explains how answers are evaluated. This comment is only visible to professors browsing the problem library.