# Difference between revisions of "MathObject Answers - PGML"

(Initial section) |
|||

Line 30: | Line 30: | ||

== Passing Options to Answer Checkers == |
== Passing Options to Answer Checkers == |
||

+ | |||

+ | If you need to pass options to the answer checker for a MathObject, you can pass the answer checker to PGML rather than the MathObject itself. |
||

+ | |||

+ | Context("Vector"); |
||

+ | $a = 3, $b = 5; |
||

+ | $v = Vector(-$b,$a); |
||

+ | |||

+ | BEGIN_PGML |
||

+ | A vector perpendicular to [: <[$a],[$b]> :]* is [_____________}{$v->cmp(parallel=>true)} |
||

+ | END_PGML |
||

+ | |||

+ | Alternatively, you can save the answer checker in a variable and pass that to PGML for easier reading. |
||

+ | |||

+ | Context("Vector"); |
||

+ | $a = 3, $b = 5; |
||

+ | $v = Vector(-$b,$a); |
||

+ | $cmp = $v->cmp(parallel=>true); |
||

+ | |||

+ | BEGIN_PGML |
||

+ | A vector perpendicular to [: <[$a],[$b]> :]* is [_____________}{$cmp} |
||

+ | END_PGML |
||

+ | |||

+ | This is particularly useful if you want to provide a custom checker. |
||

+ | |||

+ | Context("Point"); |
||

+ | $a = random(2,10,1); |
||

+ | $x = random(-5,5,1); |
||

+ | $y = $a - $x; |
||

+ | |||

+ | $cmp = Point($x,$y)->cmp( |
||

+ | showCoordinateHints => 0, # doesn't make sense to give hints in this case |
||

+ | checker => sub { |
||

+ | my ($correct,$student,$ansHash) = @_; # get correct and student MathObjects |
||

+ | my ($sx,$sy) = $student->value; # get coordinates of student answer |
||

+ | return ($sx + $sy == $a ? 1 : 0); # return 1 if correct, 0 otherwise |
||

+ | } |
||

+ | ); |
||

+ | |||

+ | BEGIN_PGML |
||

+ | Find a point [:(x,y):] that is a solution to [: x+y = [$a] :]. |
||

+ | |||

+ | [: (x,y) :] = [______________________]{$cmp} |
||

+ | END_TEXT |
||

== Answer Arrays == |
== Answer Arrays == |

## Revision as of 08:51, 13 May 2015

## Contents

## Answers from MathObejcts

When you specify an answer following an answer blank and provide a number or a swing containing a formula, PGML turns your answer into a MathObject (essentially by passing it to `Compute()`

). So you can provide any sort of MathObject-based answer by enclosing it in quotation marks. For example,

Context("Interval"); BEGIN_PGML The interval from 0 to 1 excluding 0 but including 1 is written: [___________]{"(0,1]"} END_PGML

provides an answer that is an interval. The answer is parsed in the current context, which is the Interval context in this example. This means that you are giving the answer exactly as the student will.

Instead of using quotation marks, you can use a MathObject creator function, like `Real()`

or `Matrix()`

if you prefer.

Context("Complex"); BEGIN_PGML As a complex number, [: sqrt(-1) :] is written [__________]{Complex(0,1)} END_PGML

If the determination of the answer involves computations, however, it may be more convenient to produce a MathObject earlier in the problem and pass that to PGML. You can do that by putting the variable that holds the math object into the braces following the answer blank.

Context("Vector"); $p = Point(0,2), $q = Point(1,-1); $v = Vector($q-$p); BEGIN_PGML A vector from [`[$p]`] to [`[$q]`] is [______________]{$v} END_PGML

## Passing Options to Answer Checkers

If you need to pass options to the answer checker for a MathObject, you can pass the answer checker to PGML rather than the MathObject itself.

Context("Vector"); $a = 3, $b = 5; $v = Vector(-$b,$a); BEGIN_PGML A vector perpendicular to [: <[$a],[$b]> :]* is [_____________}{$v->cmp(parallel=>true)} END_PGML

Alternatively, you can save the answer checker in a variable and pass that to PGML for easier reading.

Context("Vector"); $a = 3, $b = 5; $v = Vector(-$b,$a); $cmp = $v->cmp(parallel=>true); BEGIN_PGML A vector perpendicular to [: <[$a],[$b]> :]* is [_____________}{$cmp} END_PGML

This is particularly useful if you want to provide a custom checker.

Context("Point"); $a = random(2,10,1); $x = random(-5,5,1); $y = $a - $x; $cmp = Point($x,$y)->cmp( showCoordinateHints => 0, # doesn't make sense to give hints in this case checker => sub { my ($correct,$student,$ansHash) = @_; # get correct and student MathObjects my ($sx,$sy) = $student->value; # get coordinates of student answer return ($sx + $sy == $a ? 1 : 0); # return 1 if correct, 0 otherwise } ); BEGIN_PGML Find a point [:(x,y):] that is a solution to [: x+y = [$a] :]. [: (x,y) :] = [______________________]{$cmp} END_TEXT