$\\simplify[std]{f(x) = sin({b}x + {a}) * e ^ ({n} * x)}$
\n\t\t\t$\\displaystyle \\frac{df}{dx}=\\;$[[0]]
\n\t\t\tClick on Show steps for more information, you will not lose any marks by doing so.
\n\t\t\t", "gaps": [{"checkvariablenames": false, "marks": 3, "checkingaccuracy": 0.001, "scripts": {}, "vsetrangepoints": 5, "expectedvariablenames": [], "answer": "{b} * cos({a} + {b} * x) * e ^ ({n} * x) + {n} * sin({a} + {b} * x) * e ^ ({n} * x)", "showpreview": true, "checkingtype": "absdiff", "vsetrange": [0, 1], "answersimplification": "std", "showCorrectAnswer": true, "type": "jme"}], "stepsPenalty": 0, "marks": 0, "showCorrectAnswer": true, "scripts": {}, "steps": [{"prompt": "The product rule says that if $u$ and $v$ are functions of $x$ then
\\[\\simplify[std]{Diff(u * v,x,1) = u * Diff(v,x,1) + v * Diff(u,x,1)}\\]
31/07/2012:
\n\t\tChecked calculation.
\n\t\tAdded tags.
\n\t\tAllowed no penalty on looking at Show steps.
\n\t\t", "description": "Differentiate $ \\sin(ax+b) e ^ {nx}$.
", "licence": "Creative Commons Attribution 4.0 International"}, "showQuestionGroupNames": false, "name": "George's copy of Differentiation: Product rule", "preamble": {"js": "", "css": ""}, "tags": ["calculus", "Calculus", "checked2015", "derivative of a product", "differentiating a product", "differentiating exponential functions", "differentiating trigonometric functions", "differentiation", "mas1601", "MAS1601", "product rule", "Steps", "steps"], "variables": {"b": {"name": "b", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "s1*random(2..9)"}, "m": {"name": "m", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "random(2..8)"}, "a": {"name": "a", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "random(1..9)"}, "n": {"name": "n", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "s2*random(2..5)"}, "s1": {"name": "s1", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "random(1,-1)"}, "s2": {"name": "s2", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "random(1,-1)"}}, "rulesets": {"std": ["all", "!collectNumbers", "fractionNumbers"], "surdf": [{"result": "(sqrt(b)*a)/b", "pattern": "a/sqrt(b)"}]}, "variable_groups": [], "advice": "\n\t \n\t \n\tThe product rule says that if $u$ and $v$ are functions of $x$ then
\\[\\simplify[std]{Diff(u * v,x,1) = u * Diff(v,x,1) + v * Diff(u,x,1)}\\]
For this example:
\n\t \n\t \n\t \n\t\\[\\simplify[std]{u = sin({a} + {b} * x)}\\Rightarrow \\simplify[std]{Diff(u,x,1) = {b} * cos({a} + {b} * x)}\\]
\n\t \n\t \n\t \n\t\\[\\simplify[std]{v = e ^ ({n} * x)} \\Rightarrow \\simplify[std]{Diff(v,x,1) = {n} * e ^ ({n} * x)}\\]
\n\t \n\t \n\t \n\tHence on substituting into the product rule above we get:
\n\t \n\t \n\t \n\t\\[\\begin{eqnarray*}\\frac{df}{dx} &=& \\simplify[std]{{b} * cos({a} + {b} * x) * e ^ ({n} * x) + {n} * sin({a} + {b} * x) * e ^ ({n} * x)}\\\\\n\t \n\t &=&\\simplify[std]{({b}cos({a}+{b}x)+{n}sin({a}+{b}x))e^({n}x)}\n\t \n\t \\end{eqnarray*}\\]
\n\t \n\t \n\t", "statement": "Differentiate the following function $f(x)$ using the product rule.
", "type": "question", "functions": {}, "variablesTest": {"condition": "", "maxRuns": 100}, "contributors": [{"name": "George Loughlin", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1619/"}]}]}], "contributors": [{"name": "George Loughlin", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1619/"}]}