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研究所、轉學考(插大)-微積分
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112年 - 112 國立臺灣大學_碩士班招生考試題:微積分(D)#130254
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(1) Evaluate
=
(1)
.
其他申論題
(b)
#552084
4. Set Show that f(x,y) do not have a limit as (x, y) → (0,0).
#552085
5. Prove or disprove that is differentiable at x = 0.
#552086
6. For a square real matrix A, define , where A⁰ is defined to be the identity matrix I. Evaluate for Show your work.
#552087
(2) Let y = f(x) be a function defined implicitly by the equation 2(x² + y²)² = 25(x² - y²) near x = 3, y = 1. By linear approximation f(2.87) ≈ (2) .
#552089
(3) Let R be the region described by {(x, y) | cos x ≤ y ≤ sec²x, 0 ≤ x ≤ }. The volume obtained by rotating R about the y-axis is (3) .
#552090
(4) The area of the region inside the polar curve r = 5 + 3 cos θ is (4) .
#552091
(5) The 4th nonzero term of the Maclaurin series of the function f(x) = √(9 + x²) is (5) .
#552092
(6) The coefficient of in the Maclaurin series of g(x) = is (6) .
#552093
(7) The tangent plane of the surface xy²z³ = 8 at the point (2, 2, 1) is given by the equation (7) = 0.
#552094
= (1) .
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= (1) .