# Logarithms1

(Difference between revisions)

## Answer Must Be Simplified Using Logarithms

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This PG code shows how to disable and undefine some functions and operators, which will require students to simplify their answer using laws of logarithms.

PG problem file Explanation

Problem tagging:

DOCUMENT();

"PGstandard.pl",
"MathObjects.pl",
);

TEXT(beginproblem());

Initialization:

Context("Numeric");
Context()->variables->are(x=>"Real",y=>"Real",z=>"Real");
Context()->variables->set(x=>{limits=>[2,3]});
Context()->variables->set(y=>{limits=>[2,3]});
Context()->variables->set(z=>{limits=>[2,3]});

$a = random(20,40,1);$b = random(20,40,1);
do { $c = random(20,40,1); } until ($c != $b ); # TeX$expr = "\displaystyle \ln \left( \frac{ x^{$a} y^{$b} }{ z^{$c} } \right)";$answer = Compute("$a * ln(x) +$b * ln(y) - $c * ln(z)"); Context()->operators->undefine("/","^","**"); Context()->functions->undefine("sqrt"); Setup: We add the variables to the context and reset their limits since logarithms are not defined on the default domain [-1,1]. After defining$answer, then we undefine certain operators and functions so that students will have to simplify their answer. Since the answer requires multiplication no matter how it is written, we cannot prevent students from entering an answer such as ln(x*x*x...) instead of $a * ln(x), but by choosing large values for$a, $b,$c, we can strongly discourage them from entering ln(x*x*x...).

Context()->texStrings;
BEGIN_TEXT
Using laws of logarithms, write the expression
below using sums and/or differences
of logarithmic expressions which do not contain
the logarithms of products, quotients, or powers.
$BR$BR
$$\displaystyle expr =$$
\{ ans_rule(40) \}
END_TEXT
Context()->normalStrings;

Main Text:

$showPartialCorrectAnswers = 1; ANS($answer->cmp() );

Context()->texStrings;
BEGIN_SOLUTION
${PAR}SOLUTION:${PAR}
Solution explanation goes here.
END_SOLUTION
Context()->normalStrings;

COMMENT('MathObject version.');

ENDDOCUMENT();

Solution: