Solving integration by substitution without help
"}, "statement": "Integrate the following by substitution.
\nYou may assume the constant of integration is zero for the purposes of these questions.
", "functions": {}, "rulesets": {}, "variablesTest": {"condition": "", "maxRuns": 100}, "variables": {"c": {"templateType": "anything", "name": "c", "description": "", "group": "Ungrouped variables", "definition": "repeat(random(-5..5 except 0 except 1 except -1),9)"}, "p": {"templateType": "anything", "name": "p", "description": "", "group": "Ungrouped variables", "definition": "repeat(random(2..5),5)"}}, "ungrouped_variables": ["c", "p"], "tags": [], "preamble": {"js": "", "css": ""}, "variable_groups": [], "advice": "If you do not understand how to begin these questions, please see 'Integration 1 - Substitution'.
", "name": "Integration 2 - Substitution", "parts": [{"showCorrectAnswer": true, "marks": "3", "variableReplacements": [], "valuegenerators": [{"value": "", "name": "x"}], "answerSimplification": "all", "useCustomName": false, "scripts": {}, "customName": "", "type": "jme", "checkingType": "absdiff", "variableReplacementStrategy": "originalfirst", "vsetRangePoints": 5, "checkVariableNames": true, "showFeedbackIcon": true, "vsetRange": [0, 1], "showPreview": true, "checkingAccuracy": 0.001, "prompt": "Use $u=\\simplify{{c[1]}x^3+{c[2]}}$ as your substitution.
\n$\\simplify{Int({c[0]}x^2*({c[1]}x^3+{c[2]})^{p[0]},x)}=$
", "failureRate": 1, "answer": "({c[0]}/(3{c[1]}({p[0]}+1)))*({c[1]}x^3+{c[2]})^({p[0]}+1)", "extendBaseMarkingAlgorithm": true, "customMarkingAlgorithm": "", "unitTests": []}, {"showCorrectAnswer": true, "marks": "3", "variableReplacements": [], "valuegenerators": [{"value": "", "name": "x"}], "answerSimplification": "all", "useCustomName": false, "scripts": {}, "customName": "", "type": "jme", "checkingType": "absdiff", "variableReplacementStrategy": "originalfirst", "vsetRangePoints": 5, "checkVariableNames": true, "showFeedbackIcon": true, "vsetRange": [0, 1], "showPreview": true, "checkingAccuracy": 0.001, "prompt": "Use $u=\\simplify{{c[4]}x^({p[1]}+1)+{c[5]}}$ as your substitution.
\n$\\simplify{Int({c[3]}x^{p[1]}*({c[4]}x^({p[1]}+1)+{c[5]})^{p[2]},x)}=$
", "failureRate": 1, "answer": "({c[3]}/(({p[1]}+1){c[4]}({p[2]}+1)))*({c[4]}x^3+{c[5]})^({p[2]}+1)", "extendBaseMarkingAlgorithm": true, "customMarkingAlgorithm": "", "unitTests": []}, {"showCorrectAnswer": true, "marks": "3", "variableReplacements": [], "valuegenerators": [{"value": "", "name": "x"}], "answerSimplification": "all", "useCustomName": false, "scripts": {}, "customName": "", "type": "jme", "checkingType": "absdiff", "variableReplacementStrategy": "originalfirst", "vsetRangePoints": 5, "checkVariableNames": true, "showFeedbackIcon": true, "vsetRange": [0, 1], "showPreview": true, "checkingAccuracy": 0.001, "prompt": "Use $u=\\simplify{{c[7]}x^({p[3]}+1)+{c[8]}}$ as your substitution.
\n$\\simplify{Int({c[6]}x^{p[3]}*({c[7]}x^({p[3]}+1)+{c[8]})^{p[4]},x)}=$
", "failureRate": 1, "answer": "({c[6]}/(({p[3]}+1){c[7]}({p[4]}+1)))*({c[7]}x^3+{c[8]})^({p[4]}+1)", "extendBaseMarkingAlgorithm": true, "customMarkingAlgorithm": "", "unitTests": []}], "contributors": [{"name": "Katie Lester", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/586/"}, {"name": "Xiaodan Leng", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/2146/"}]}]}], "contributors": [{"name": "Katie Lester", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/586/"}, {"name": "Xiaodan Leng", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/2146/"}]}