課程名稱︰幾何學 課程性質︰數學系大三必修課 課程教師︰蔡宜洵 開課學院：理學院 開課系所︰數學系 考試日期（年月日）︰2014/11/14 考試時限（分鐘）：1:20 ~ 3:20 試題 : Total points: 105 Notice: any theorems or facts put to use in the process of your proof or computation must be stated clearly. s 1 (20 pts in total). Given the parametrized curve (helix) α(s) = (a cos— , c s s 2 2 2 a sin—, b— ), s∈R where a, b, c positive, c = a + b . i)(5 pts) Show that c c the parameter s is the arc length. ii)(15 pts) Determine the curvature, torsion and osculating plane of α. 2 (20 pts in total). The gradient of a differentiable function f : S → R is a 3 differentiable map grad(f) : S → R which assigns to each point p∈S a vector 3 grad(f)∈T (S)⊂R such that < grad(f(p)), v > = df (v) for all v∈T (S). p p p p f G - f F f E - f F u v v u i)(12 pts) Show that grad(f) = —————— x + —————— x with E, F, G 2 u 2 v EG - F EG - F the coefficients of the first fundamental form in a local parametrization x : U → S. ii)(8 pts) If you let p∈S be fixed and v vary in the unit circle grad(f) |v| = 1 in T (S), then df (v) is maximum if and only if v = —————. p p |grad(f)| 2 2 3 (20 pts in total). Let C be the unit circle: x + y = 1 and a differentiable family of straight lines {L } be defined in such a way that for each p∈C, p p∈C π L ∋p is constructed to make an angle —— with the normal n (to C at p) and p 6 p at p = (1, 0), L has a positive slope. i)(8 pts) Put the family as constructed p above into the form given explicitly by a one parameter family of equations. ii)(12 pts) Find the envelope (caustic curve) of this family. 2 2 2 x y z 4 (20 pts in total). S : —— + —— + —— = 1. i)(15 pts) Show that the Gauss 2 2 2 a b c 2 map N : S → S is one to one, onto and differentiable. ii)(5 pts) Let K = K(p) be the Gaussian curvature of S (at p) and dσ be the surface area form of S, 2 i.e. dσ = √(EG - F ) du dv in local parameters. Show/Explain that ∫K dσ S = 4π. 5 (10 pts in total). Given a vector field w : q = (x,y) → w(q) = (1-x,1+y) on plane. i)(5 pts) For p = (A,B) find explicitly the trajectory through p. ii)(5 pts) Find an explicit first integral of the above vector field w. 6 (15 pts in total). For v∈T (S) where S is a regular surface, let H be p v,α π either of the two planes containing p, v and making an angle 0 < α≦ —— 2 with T (S). Let e , e ∈T (S) be principle directions with principle p 1 2 p curvatures k ≧ k ＞ 0. Given v = cosθe + sinθe (θ≠0) let the section C 1 2 1 2 θ be H ∩ S and k be the curvature (at p) of C . Denote by k (C) the normal v,θ θ θ n curvature of a curve C (at p). i)(5 pts) In the above notation given two sections C , C (θ≠θ) with curvature k , k respectively. In terms of θ θ 1 2 θ θ 1 2 1 2 k , k , θ, θ, find k (C ), k (C ) and k , k . ii)(5 pts) Given any v≠0, θ θ 1 2 n θ n θ 1 2 1 2 1 2 v∈T (S) and any M > 0, does there exist a curve C⊂S passing through p, v p ∈T (C) and having its curvature k (p) > M ? Justify your answer. iii)(5 pts) p C Fix a θ≠0 and v≠0 as above. Is it possible to find a curve C∋p in S, v∈T (C), with the property that it has the osculating plane H while its p v,θ curvature k (p) ≠ k ? More generally, do there exist two curves (in S) C θ through p, sharing the same tangent line (at p) and having the same osculating plane (at p) while their curvatures (at p) are different? Justify your answer. -- ※ 發信站: 批踢踢實業坊(ptt.cc), 來自: 58.115.123.62 ※ 文章網址: https://www.ptt.cc/bbs/NTU-Exam/M.1421568956.A.193.html