Difference between revisions of "DifferentiateFunction1"

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<p style="font-size: 120%;font-weight:bold">This problem has been replaced with [https://openwebwork.github.io/pg-docs/sample-problems/DiffCalc/DifferentiateFunction.html a newer version of this problem]</p>
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<h2>Differentiating and Evaluating a Function</h2>
 
<h2>Differentiating and Evaluating a Function</h2>
   

Latest revision as of 05:09, 18 July 2023

This article has been retained as a historical document. It is not up-to-date and the formatting may be lacking. Use the information herein with caution.

This problem has been replaced with a newer version of this problem


Differentiating and Evaluating a Function

Click to enlarge

This PG code shows how to create a function using MathObjects, differentiate it, and evaluate it.


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PG problem file Explanation

Problem tagging data

Problem tagging:

DOCUMENT(); 

loadMacros(
  'PGstandard.pl',
  'MathObjects.pl',
  'PGML.pl',
  'PGcourse.pl'
);

TEXT(beginproblem());

Context('Numeric')->variables->add(k=>'Real');
Context()->flags->set(
  reduceConstants=>0, # no decimals
  reduceConstantFunctions=>1, # combine 4+5*2?
  formatStudentAnswer=>'parsed', # no decimals
);

$a = random(6,9,1);
$k = random(3,5,1);

$f = Formula('k x^2');
$fx = $f->D('x');

$ans1 = $fx;
$ans2 = $fx->substitute(k=>$k); 
$ans3 = $fx->substitute(x=>$a*pi,k=>$k);

Setup: The partial differentiation operator is ->D('x').

The main difference between eval() and substitute() is

  • eval() returns a Real (a number)
  • substitute() returns a Formula
Since plugging a particular number $k into the Formula $f returns a Formula $k x, if we had used the eval method $ans2 = $fx->eval(k=>$k); instead of the substitute method, we would get errors because $k x is a Formula, not a Real. Note: You cannot use eval or substitute to perform function composition, i.e., you can only plug in numbers, not formulas.

When the answer is a constant, we can use either the eval method, in which case the answer would be a Real, or the substitute method, in which case the answer would be a constant Formula. If you use the eval method, $ans3 = $fx->eval(x=>$a*pi,k=>$k); the answer will be a Real and will display as a single number in decimal format. If you use the substitute method instead, you have more control over how the answer will be displayed. In particular, the context flag reduceConstants controls whether the answer will be reduced to a single number in decimal format, the flag reduceConstantFunctions controls whether or not expressions such as 4+5*2 are reduced to 14, and setting the context flag formatStudentAnswer=>'parsed' will prevent the student's answer from being reduced to a single number in decimal format and will also display pi instead of 3.14159...

For more details, see eval versus substitute, formatting correct answers, and constants in problems.

BEGIN_PGML
Suppose [` f(x) = [$f] `] where [` k `] is a constant.

a. [` f ' (x) = `] [_______________]{$ans1}

b. If [` k = [$k] `] then [` f ' (x) = `] [_______________]{$ans2}

c. If [` k = [$k] `] then [` f ' ([$a]\pi) = `] [_______________]{$ans3}

[@ helpLink('formulas') @]*
END_PGML

Main Text:

BEGIN_PGML_SOLUTION
Solution explanation goes here.
END_PGML_SOLUTION

COMMENT('Uses PGML.');

ENDDOCUMENT();

Solution:

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