// Numbas version: finer_feedback_settings {"name": "Cubics: Solving a Cubic Equation", "extensions": [], "custom_part_types": [{"source": {"pk": 2, "author": {"name": "Christian Lawson-Perfect", "pk": 7}, "edit_page": "/part_type/2/edit"}, "name": "List of numbers", "short_name": "list-of-numbers", "description": "

The answer is a comma-separated list of numbers.

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The list is marked correct if each number occurs the same number of times as in the expected answer, and no extra numbers are present.

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You can optionally treat the answer as a set, so the number of occurrences doesn't matter, only whether each number is included or not.

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", "definition": "let(b,filter(x<>\"\",x,split(studentAnswer,settings[\"separator\"])),\n if(isSet,list(set(b)),b)\n)"}, {"name": "expected_numbers", "description": "", "definition": "let(l,settings[\"correctAnswer\"] as \"list\",\n if(isSet,list(set(l)),l)\n)"}, {"name": "valid_numbers", "description": "

Is every number in the student's list valid?

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Are the student's answers in ascending order?

", "definition": "assert(sort(interpreted_answer)=interpreted_answer,\n multiply_credit(0.5,\"Not in order\")\n )"}, {"name": "included", "description": "

Is each number in the expected answer present in the student's list the correct number of times?

", "definition": "map(\n let(\n num_student,len(filter(x=y,y,interpreted_answer)),\n num_expected,len(filter(x=y,y,expected_numbers)),\n switch(\n num_student=num_expected,\n true,\n num_studentHas every number been included the right number of times?

", "definition": "all(included)"}, {"name": "no_extras", "description": "

True if the student's list doesn't contain any numbers that aren't in the expected answer.

", "definition": "if(all(map(x in expected_numbers, x, interpreted_answer)),\n true\n ,\n incorrect(\"Your answer contains \"+extra_numbers[0]+\" but should not.\");\n false\n )"}, {"name": "interpreted_answer", "description": "A value representing the student's answer to this part.", "definition": "if(lower(studentAnswer) in [\"empty\",\"\u2205\"],[],\n map(\n if(settings[\"allowFractions\"],parsenumber_or_fraction(x,notationStyles), parsenumber(x,notationStyles))\n ,x\n ,bits\n )\n)"}, {"name": "mark", "description": "This is the main marking note. It should award credit and provide feedback based on the student's answer.", "definition": "if(studentanswer=\"\",fail(\"You have not entered an answer\"),false);\napply(valid_numbers);\napply(included);\napply(no_extras);\ncorrectif(all_included and no_extras)"}, {"name": "notationStyles", "description": "", "definition": "[\"en\"]"}, {"name": "isSet", "description": "

Should the answer be considered as a set, so the number of times an element occurs doesn't matter?

", "definition": "settings[\"isSet\"]"}, {"name": "extra_numbers", "description": "

Numbers included in the student's answer that are not in the expected list.

", "definition": "filter(not (x in expected_numbers),x,interpreted_answer)"}], "settings": [{"name": "correctAnswer", "label": "Correct answer", "help_url": "", "hint": "The list of numbers that the student should enter. The order does not matter.", "input_type": "code", "default_value": "", "evaluate": true}, {"name": "allowFractions", "label": "Allow the student to enter fractions?", "help_url": "", "hint": "", "input_type": "checkbox", "default_value": false}, {"name": "correctAnswerFractions", "label": "Display the correct answers as fractions?", "help_url": "", "hint": "", "input_type": "checkbox", "default_value": false}, {"name": "isSet", "label": "Is the answer a set?", "help_url": "", "hint": "If ticked, the number of times an element occurs doesn't matter, only whether it's included at all.", "input_type": "checkbox", "default_value": false}, {"name": "show_input_hint", "label": "Show the input hint?", "help_url": "", "hint": "", "input_type": "checkbox", "default_value": true}, {"name": "separator", "label": "Separator", "help_url": "", "hint": "The substring that should separate items in the student's list", "input_type": "string", "default_value": ",", "subvars": false}], "public_availability": "always", "published": true, "extensions": []}], "resources": [], "navigation": {"allowregen": true, "showfrontpage": false, "preventleave": false, "typeendtoleave": false}, "question_groups": [{"pickingStrategy": "all-ordered", "questions": [{"name": "Cubics: Solving a Cubic Equation", "tags": ["Category: Working with polynomials"], "metadata": {"description": "

Solving a cubic equation of the form $ax^3+bx^2+cx+d=0$.

", "licence": "Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International"}, "statement": "

Solve the cubic equation \\[ \\simplify{x^3+{a+b+c}x^2+{a*b+a*c+b*c}x+{a*b*c}=0}.\\]

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", "advice": "

To solve\\[ \\simplify{x^3+{a+b+c}x^2+{a*b+a*c+b*c}x+{a*b*c}=0}, \\]

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we want to factorise the left-hand side of the equation into its linear factors. 

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To find the first of these factors, we can try appropriate values for $x$ to see if they satisfy the above equation. A sensible approach to this step is to try the positive and negative factors of the constant term in the equation, which is $\\var{a*b*c}$ in this case. 

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Starting with $\\var{-a}$, we find this does satisfy the equation, which tells us that $(\\simplify{x+{a}})$ is a factor of the polynomial. 

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(Note: The first number you try will often not be a factor, and this is completely fine. It can be helpful to list the factors first and try each one in order until you find one that works.)

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To find the other factors, we can write the left-hand side as a product of this factor and a quadratic, and then factorise the quadratic to find the remaining linear factors:

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\\[ \\begin{split} \\simplify[all]{x^3+{a+b+c}x^2+{a*b+a*c+b*c}x+{a*b*c}} &\\,= \\simplify{(x+{a})(x^2+{b+c}x+{b*c})} \\\\ &\\,= \\simplify{(x+{a})(x+{b})(x+{c})}. \\end{split} \\]

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Therefore,

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\\[ \\simplify{(x+{a})(x+{b})(x+{c}) = 0}, \\]

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and the solutions for $x$ are $x_1 = \\var{-a}$, $x_2 = \\var{-b}$ and $x_3 = \\var{-c}$.

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$x=$ [[0]]    (Separate your answers with a comma.)

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