阿摩線上測驗
登入
首頁
>
轉學考-離散數學
>
99年 - 99 淡江大學 轉學考 離散數學#55471
>
3. Prove or disprove: If
(mod 4), where a and b are integers, then
(mod 4). (12 pts)
其他申論題
4. Show that the sum of the square of the matrix elements is invariant under orthogonal similarity transformation. (15 points)
#208745
5. GivenA =,and/(A) = A3 -2A2 +5A-3, find f(A). (20 points) Note: Evaluating each term in f (A) separately and then adding it up are not credited.
#208746
6. Solve the following 2nd-order ordinary differential equation. (15 points) y" + 2y' + y = 4e-x.
#208747
7. Evaluate . (15 points)
#208748
4. Find the smallest equivalence relation on {1,2,3} that contains (1,2). (12 pts) Justify your answer.
#208750
5. How many nonnegative integer solutions are there to the equation x1 x2 + x3 + x4 = 21 such that (12 pts) Show enough work to get full credits.
#208751
6. Apply Dijkstra’s Algorithm to find a shortest path from a to f. Indicate what is your shortest path and the total weight of the path. You must show every step in order to get full credits. (14 pts)
#208752
7. Use mathematical induction to prove that 3 divides n3+2n whenever n is a nonnegative integer. (15 pts) (3整除n3+2n, n為非負整數)(必須以歸納證明的方法證得)
#208753
沒有 【段考】高二數學下學期 權限,請先開通.
#208754
沒有 【段考】高二數學下學期 權限,請先開通.
#208755
阿摩線上測驗
登入
阿摩線上測驗
登入
(mod 4), where a and b are integers, then 
(mod 4). (12 pts)