$y=\\ln(x^\\var{p}+\\var{c[3]})$
\n$\\frac{dy}{dx}=$ [[0]]
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", "licence": "Creative Commons Attribution 4.0 International"}, "ungrouped_variables": ["c", "p"], "variable_groups": [], "rulesets": {}, "variables": {"p": {"description": "", "templateType": "anything", "definition": "random(2..5)", "name": "p", "group": "Ungrouped variables"}, "c": {"description": "", "templateType": "anything", "definition": "repeat(random(2..7),8)", "name": "c", "group": "Ungrouped variables"}}, "variablesTest": {"maxRuns": 100, "condition": ""}, "preamble": {"css": "", "js": ""}, "advice": "The differentiate of $\\ln(x)$ is $\\frac{1}{x}$.
\nThis proof can be found here.
\n\nFor natural logarithms in the form $u\\ln(a(x))$ where $a(x)$ is a function of $x$, the derivative is $u\\frac{a'(x)}{a(x)}$.
", "statement": "Differentiate the following.
\nDo not write out $dy/dx$; only input the differentiated right hand side of each equation.
\nGive your answers as you would in Excel
\nFor example $-\\frac{3}{4}x^2+\\frac{5}{6}x^{-\\frac{4}{5}}-12x+4x^3e^{(2x^2-2)}$
\nWould be entered -(3/4)*x^2 +(5/6)*x^(-4/5) -12*x + 4*x^3*e^(2x^2-2)
", "name": "marion's copy of QM103_test2_2017_Q6", "functions": {}, "type": "question", "contributors": [{"name": "marion curdy", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1417/"}]}]}], "contributors": [{"name": "marion curdy", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1417/"}]}