課程名稱︰微積分乙上 課程性質︰共同必修 課程教師︰李聰成 開課學院：管院 開課系所︰ 考試日期（年月日）︰2017/01/12 考試時限（分鐘）：160分鐘 (10:20-13:00) 試題 : 請將每一步驟表達清楚,不可以只寫答案. 2 1.Evaluate the definite integral ∫ x √(x-1) dx 1 2.Find the area (面積) of the region (區域) bounded by the curves y = tan x, y = sin 2x with 0 <= x <= π/3 3.Evaluate the indefinite integral ∫ 1/ (√(x^2-4)) dx 4.Let f:(0,+∞)→R be continuous such that x x ∫f(t)dt = xsinx + ∫f(t)/(1+t^2) dt 1 1 for all x belongs to (0, +∞), find an explict formula for f(x) 5. Evaluate the limit. lim ( 1/(n+1) + 1/(n+2) + 1/(n+3) + .... + 1/(n+n) ) n→+∞ 6.Use logarithmic differentiation to find the derivative of the function x (x^2+1)^2 y = ─────── , where x > 1. √(2x^3-1) 7.Show that f is one-to-one on (0, + ∞) and (f^(-1))'(3), where f^(-1) is the inverse function (反函數) of f and f(x) = 3 + x + tan(πx/2) with -1 < x < 1. 8.Find the volume of a right circular cone (圓錐) with height h and base radius r. 9.For what values of a and b is the following equation true? sin(2x) b lim (──── + a + ────) = 0. x→3 x^3 x^2 10.Find an equation of the tangent line to the curve y = F(x) at the point with x-coordinate (x軸) π, where x F(x) = ∫ (cos(t)/t) dt. π --

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