{plotgraph(2,x21,x22,-5,25,a2,0,c2)}
\nThis is the graph of the function $f(x) = \\simplify{{a2}*x^2+{c2}}$.
\nUse integration to calculate the area of the shaded region. Give your answer without any rounding.
\n[[0]]
", "gaps": [{"marks": "3", "maxValue": "area2", "mustBeReducedPC": 0, "scripts": {}, "correctAnswerFraction": true, "variableReplacementStrategy": "originalfirst", "type": "numberentry", "customMarkingAlgorithm": "", "showCorrectAnswer": true, "notationStyles": ["plain", "en", "si-en"], "extendBaseMarkingAlgorithm": true, "mustBeReduced": false, "allowFractions": true, "unitTests": [], "correctAnswerStyle": "plain", "minValue": "area2", "showFeedbackIcon": true, "variableReplacements": []}], "scripts": {}, "variableReplacementStrategy": "originalfirst", "type": "gapfill", "customMarkingAlgorithm": "", "showCorrectAnswer": true, "extendBaseMarkingAlgorithm": true, "unitTests": [], "sortAnswers": false, "showFeedbackIcon": true, "variableReplacements": []}, {"marks": 0, "prompt": "{plotgraph(3,x31,x32,-6,15,a3,b3,0)}
\nThis curve has equation $y = \\simplify{x^2-{a3+b3}*x + {a3*b3}}$.
\n(Remember this is a non-calculator question!)
\nCalculate the total area of the shaded regions. Give your answer without any rounding.
\n[[0]]
\n\n", "gaps": [{"marks": "5", "maxValue": "area3", "mustBeReducedPC": 0, "scripts": {}, "correctAnswerFraction": true, "variableReplacementStrategy": "originalfirst", "type": "numberentry", "customMarkingAlgorithm": "", "showCorrectAnswer": true, "notationStyles": ["plain", "en", "si-en"], "extendBaseMarkingAlgorithm": true, "mustBeReduced": false, "allowFractions": true, "unitTests": [], "correctAnswerStyle": "plain", "minValue": "area3", "showFeedbackIcon": true, "variableReplacements": []}], "scripts": {}, "variableReplacementStrategy": "originalfirst", "type": "gapfill", "customMarkingAlgorithm": "", "showCorrectAnswer": true, "extendBaseMarkingAlgorithm": true, "unitTests": [], "sortAnswers": false, "showFeedbackIcon": true, "variableReplacements": []}], "name": "sathasivampillai's copy of sathasivampillai's copy of Integration: Calculating the area under a curve", "tags": [], "extensions": ["jsxgraph"], "variablesTest": {"maxRuns": 100, "condition": ""}, "ungrouped_variables": ["a4", "b4", "c4", "x41", "x42"], "statement": "\n", "functions": {"plotgraph": {"parameters": [["q", "number"], ["x1", "number"], ["x2", "number"], ["ymin", "number"], ["ymax", "number"], ["a", "number"], ["b", "number"], ["c", "number"]], "type": "html", "language": "javascript", "definition": "// Shading under a graph! This functions plots a graph of y = a(x-r1)(x-r2)\n// It creates the board, sets it up, then returns an\n// HTML div tag containing the board.\n\n\n// Max and min x and y values for the axis.\nvar xmin = -7;\nvar xmax = 7;\n\n// First, make the JSXGraph board.\nvar div = Numbas.extensions.jsxgraph.makeBoard(\n '500px',\n '500px',\n {\n boundingBox: [xmin,ymax,xmax,ymin],\n axis: false,\n showNavigation: false,\n grid: true\n }\n);\n\n\n\n// div.board is the object created by JSXGraph, which you use to \n// manipulate elements\nvar brd = div.board; \n\n// create the x-axis.\nvar xaxis = brd.create('line',[[0,0],[1,0]], { strokeColor: 'black', fixed: true});\nvar xticks = brd.create('ticks',[xaxis,1],{\n drawLabels: true,\n label: {offset: [-4, -10]},\n minorTicks: 0\n});\n\n// create the y-axis\nvar yaxis = brd.create('line',[[0,0],[0,1]], { strokeColor: 'black', fixed: true });\nyticks = brd.create('ticks',[yaxis,5],{\ndrawLabels: true,\nlabel: {offset: [-20, 0]},\nminorTicks: 4\n});\n\n\n\n// This function shades in the area below the graph of f\n// between the x values x1 and x2\n\nvar shade = function(f,x1,x2,colour) {\n var dataX1 = [x1,x1];\n var dataY1 = [0,f(x1)];\n\n var dataX2 = [];\n var dataY2 = [];\n for (var i = x1; i <= x2; i = i+0.1) {\n dataX2.push(i);\n dataY2.push(f(i));\n }\n\n var dataX3 = [x2,x2];\n var dataY3 = [f(x2),0];\n\n dataX = dataX1.concat(dataX2).concat(dataX3);\n dataY = dataY1.concat(dataY2).concat(dataY3);\n\nvar shading = brd.create('curve', [dataX,dataY],{strokeWidth:0, fillColor:colour, fillOpacity:0.2});\n\nreturn shading;\n}\n\n\n//Define your functions\nvar f1 = function(x) {\n return a*x+b;\n}\n\nvar f2 = function(x) {\n return a*x*x + c;\n}\n\nvar f3 = function(x) {\n return (x-a)*(x-b);\n}\n\nvar f4 = function(x) {\n return 0.5*(x-a)*(x-b)*(x-c);\n}\n\n\n//Plot the graph and do shading\nswitch(q) {\n case 1:\n brd.create('functiongraph', [f1]);\n shade(f1,x1,x2, 'red');\n break;\n case 2:\n brd.create('functiongraph', [f2]);\n shade(f2,x1,x2,'red');\n break;\n case 3:\n brd.create('functiongraph', [f3]);\n shade(f3,x1,x2,'red');\n shade(f3,x2,x2+2,'green');\n break;\n case 4:\n brd.create('functiongraph', [f4]);\n shade(f4,x1,x2,'red');\n shade(f4,x2,x2+2,'green');\n break\n}\n\n\n\nreturn div;"}}, "advice": "See Lecture 12.4, 12.5, 13.1 and 13.2 for background knowledge and examples. Two main pieces of advice:
\n1) Do a simple estimate to check for big mistakes.
\n2) Remember that you have to think about whether the area is a `positive area' or `negative area'. Thinking about mechanics/distances/changes in position is the most coherent way I know of thinking about this.
", "variables": {"x42": {"name": "x42", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "b4"}, "x12": {"name": "x12", "templateType": "anything", "description": "", "group": "linear graph (not used)", "definition": "random(1..4) + x11"}, "a1": {"name": "a1", "templateType": "anything", "description": "", "group": "linear graph (not used)", "definition": "1"}, "x41": {"name": "x41", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "a4"}, "x21": {"name": "x21", "templateType": "anything", "description": "", "group": "b) quadratic. no neg region", "definition": "random(-4..-2)"}, "a3": {"name": "a3", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "random(-3..-1)"}, "c4": {"name": "c4", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "b4+2"}, "x22": {"name": "x22", "templateType": "anything", "description": "", "group": "b) quadratic. no neg region", "definition": "random(3..5)+x21"}, "x31": {"name": "x31", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "b3-random(2..3)"}, "a4": {"name": "a4", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "random(-3..-2)"}, "b3": {"name": "b3", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "a3+random(3..4)"}, "c2": {"name": "c2", "templateType": "anything", "description": "", "group": "b) quadratic. no neg region", "definition": "random(1..4)"}, "x11": {"name": "x11", "templateType": "anything", "description": "", "group": "linear graph (not used)", "definition": "random(1..2)"}, "x33": {"name": "x33", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "x32+2"}, "b1": {"name": "b1", "templateType": "anything", "description": "", "group": "linear graph (not used)", "definition": "random(1..3)"}, "area3": {"name": "area3", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "(x33^3/3 - 0.5*(a3+b3)*x33^2+a3*b3*x33)-2*(x32^3/3 - 0.5*(a3+b3)*x32^2+a3*b3*x32)+(x31^3/3 - 0.5*(a3+b3)*x31^2+a3*b3*x31)"}, "a2": {"name": "a2", "templateType": "anything", "description": "", "group": "b) quadratic. no neg region", "definition": "1"}, "area2": {"name": "area2", "templateType": "anything", "description": "", "group": "b) quadratic. no neg region", "definition": "(a2*x22^3/3+c2*x22)-(a2*x21^3/3+c2*x21)"}, "x32": {"name": "x32", "templateType": "anything", "description": "", "group": "c quadratic. neg region", "definition": "b3"}, "b4": {"name": "b4", "templateType": "anything", "description": "", "group": "Ungrouped variables", "definition": "a4+random(2..3)"}}, "metadata": {"description": "Two quadratic graphs are sketched with some area beneath them shaded. Question is to determine the area of shaded regions using integration. The first graph's area is all above the $x$-axis. The second graph has some area above and some below the $x$-axis.
", "licence": "Creative Commons Attribution 4.0 International"}, "preamble": {"css": "", "js": ""}, "variable_groups": [{"name": "linear graph (not used)", "variables": ["x11", "x12", "a1", "b1"]}, {"name": "b) quadratic. no neg region", "variables": ["x21", "x22", "a2", "c2", "area2"]}, {"name": "c quadratic. neg region", "variables": ["a3", "b3", "x31", "x32", "x33", "area3"]}], "rulesets": {}, "type": "question", "contributors": [{"name": "Lovkush Agarwal", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1358/"}, {"name": "sathasivampillai umakanthan", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/2528/"}]}]}], "contributors": [{"name": "Lovkush Agarwal", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/1358/"}, {"name": "sathasivampillai umakanthan", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/2528/"}]}