Primitives - STI2D/STL

Méthode d'Euler

Exercice 1 : Calcul d'intégrale par lecture graphique, carrés coloriés

À l'aide de la représentation graphique de \(f\) ci-dessous, déterminer l'intervalle dans lequel se trouve l'intégrale : \[\int_{0}^{3} \operatorname{f}{\left (x \right )}\, dx\]

\(\left[6; 10\right]\)
\(\left[18; 22\right]\)
\(\left[2; 6\right]\)
\(\left[14; 18\right]\)

Exercice 2 : Calcul d'intégrale par lecture graphique, aire coloriée

À l'aide de la représentation graphique de \(f\) ci-dessous, déterminer l'intervalle dans lequel se trouve l'intégrale : \[\int_{1}^{4} \operatorname{f}{\left (x \right )}\, dx\]

{"init": {"range": [[-3, 8], [-2, 9]], "scale": [40, 40], "hasGraph": true, "xLabel": "", "yLabel": "", "num_points": null, "labelStep": [1, 5], "tickStep": [1, 1], "gridOpacity": 0.1, "gridStep": [1, 1], "axisOpacity": 0.5, "unityLabels": true, "axisArrows": "->", "settings": {"scale": [40, 40]}, "x_max": 10, "x_min": -10}, "line": [[[1.0, 0.0], [1.0, 1.75], {"subtype": "segment", "stroke": "#424949"}], [[4.0, 0.0], [4.0, 4.0], {"subtype": "segment", "stroke": "#424949"}], [[1.1, 0.1], [1.1, 1.7025000000000001], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.3, 0.1], [1.3, 1.7225], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.5, 0.1], [1.5, 1.7625], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.7, 0.1], [1.7, 1.8225], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.9, 0.1], [1.9, 1.9024999999999999], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.1, 0.1], [2.1, 2.0025000000000004], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.3, 0.1], [2.3, 2.1225], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.5, 0.1], [2.5, 2.2625], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.7, 0.1], [2.7, 2.4225000000000003], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.9, 0.1], [2.9, 2.6025], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[3.1, 0.1], [3.1, 2.8025], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[3.3, 0.1], [3.3, 3.0225000000000004], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[3.5, 0.1], [3.5, 3.2625], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[3.7, 0.1], [3.7, 3.5225000000000004], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[3.9, 0.1], [3.9, 3.8025], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}]], "plot": [["function(x){ return 0.25*Math.pow(x, 2) - 0.5*x + 2;}", [-10, 10], {"stroke": "#6495ED"}]]}

\(\left[9; 13\right]\)
\(\left[17; 21\right]\)
\(\left[13; 17\right]\)
\(\left[5; 9\right]\)

Exercice 3 : Calcul d'intégrale par lecture graphique

À l'aide de la représentation graphique de \(f\) ci-dessous, déterminer l'intervalle dans lequel se trouve l'intégrale : \[\int_{5}^{8} \operatorname{f}{\left (x \right )}\, dx\]

\(\left[14; 19\right]\)
\(\left[9; 14\right]\)
\(\left[19; 24\right]\)
\(\left[4; 9\right]\)

Exercice 4 : Calcul d'intégrale par lecture graphique, carrés coloriés

À l'aide de la représentation graphique de \(f\) ci-dessous, déterminer l'intervalle dans lequel se trouve l'intégrale : \[\int_{-1}^{3} \operatorname{f}{\left (x \right )}\, dx\]

\(\left[6; 12\right]\)
\(\left[12; 18\right]\)
\(\left[24; 30\right]\)
\(\left[18; 24\right]\)

Exercice 5 : Calcul d'intégrale par lecture graphique, aire coloriée

À l'aide de la représentation graphique de \(f\) ci-dessous, déterminer l'intervalle dans lequel se trouve l'intégrale : \[\int_{0}^{3} \operatorname{f}{\left (x \right )}\, dx\]

{"init": {"range": [[-4, 7], [-2, 9]], "scale": [40, 40], "hasGraph": true, "xLabel": "", "yLabel": "", "num_points": null, "labelStep": [1, 5], "tickStep": [1, 1], "gridOpacity": 0.1, "gridStep": [1, 1], "axisOpacity": 0.5, "unityLabels": true, "axisArrows": "->", "settings": {"scale": [40, 40]}, "x_max": 10, "x_min": -10}, "line": [[[0.0, 0.0], [0.0, 4.0], {"subtype": "segment", "stroke": "#424949"}], [[3.0, 0.0], [3.0, 3.4], {"subtype": "segment", "stroke": "#424949"}], [[0.1, 0.1], [0.1, 3.93], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[0.3, 0.1], [0.3, 3.89], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[0.5, 0.1], [0.5, 3.85], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[0.7, 0.1], [0.7, 3.81], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[0.9, 0.1], [0.9, 3.77], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.1, 0.1], [1.1, 3.73], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.3, 0.1], [1.3, 3.6900000000000004], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.5, 0.1], [1.5, 3.6500000000000004], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.7, 0.1], [1.7, 3.6100000000000003], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[1.9, 0.1], [1.9, 3.5700000000000003], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.1, 0.1], [2.1, 3.5300000000000002], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.3, 0.1], [2.3, 3.49], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.5, 0.1], [2.5, 3.45], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.7, 0.1], [2.7, 3.41], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}], [[2.9, 0.1], [2.9, 3.37], {"subtype": "segment", "stroke": "#C39BD3", "stroke-dasharray": ". "}]], "plot": [["function(x){ return -0.2*x + 4;}", [-10, 10], {"stroke": "#6495ED"}]]}

\(\left[3; 6\right]\)
\(\left[9; 12\right]\)
\(\left[12; 15\right]\)
\(\left[15; 18\right]\)

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