Fw: [試題] 100下呂育道離散數學第二次期中考

看板b04902xxx作者simonmao (哈哈哈)時間8年前 (2016/04/29 14:28)推噓0(0推 0噓 0→)

留言0則, 0人參與討論串1/1

※ [本文轉錄自 NTU-Exam 看板 #1FgtP2fG ] 作者: peter506g (一氧化二氫) 看板: NTU-Exam 標題: [試題] 100下呂育道離散數學第二次期中考時間: Thu May 10 16:03:12 2012 課程名稱︰離散數學課程性質︰資訊系選修課程教師︰呂育道開課學院：電資學院開課系所︰資訊系考試日期（年月日）︰101/5/10 考試時限（分鐘）：180 是否需發放獎勵金：（如未明確表示，則不予發放）是試題 : Problem 1 (10 points) Let A be a finite set. Prove that there is a one-to-one correspondence between the set of equivalence relations on A and its set of partitions. Problem 2 (10 points) Let A1∪A2∪A3, where A1 = {1,2}, A2 = {2,3,4}, and A3 = {5}. Define relation R on A so that xRy if x and y are in the same Ai for at least one i. Is R an equivalence relation? tr Problem 3 (10 points) How many 6 ×6 (0,1)-matrices A are there with A = A ? tr (Recall that the ith row of A is defined to be the ith column of A.) Problem 4 (10 points) A room has 800 chairs. How many chairs must be occupied to guarantee that at least two people have the same first and last initials of name? (If a person is called David Letterman, the first initial is "D" and the last initial is "L".) n Problem 5 (10 points) Derive ψ(p ), when p is a prime and n ≧ 1 Problem 6 (10 points) In how many ways can we arrange the integers 1,2,3,...,8 on a line so that there are no occurences of the patterns 12,23,...,81? For example, 87654321 is valid, but 12345678 is not. (A formula suffices. No need to evaluate the answer to an integer.) Problem 7 (10 points) In how many ways can the integers 1,2,3,...,10 be arranged that no even integer i is in the ith position? (A formula suffices. No need to evaluate the answer to an integer.) Problem 8 (10 points) What is the number of integer solutions to x1 + 2*x2 + 3*x3 + ... + 5*x5 = 5 where xi ≧ 0, i = 1,2,3,4,5? # + Problem 9 (10 points) Let q (m,n) denote the number partitions of m∈Z into n distinct positive summands. Let q(m,n) denote the number of partitions of m # n into exactly n positive summands. Prove that q (m,n) = q(m - ( ), n). 2 Problem 10 (10 points) In how many ways can three x's, three y's, and three z's be arranged so that no consecutive triple of the same letter appears? For example, xxyxyzyzz and yyxxzzyxz are valid. (A formula suffices. No need to evaluate the answer to an integer.) + P.S. 第九題的第一行裡面的 m E Z 那個E是"屬於"符號 (我找不到... P.S. 呃已修正∈ 感謝下方推文支援(不過那一排冒號是怎麼回事... -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 140.112.25.108

推

suhorng

05/10 17:09, , 1^F

05/10 17:09, 1^F

推

s864372002

05/10 18:20, , 2^F

05/10 18:20, 2^F

推

roymustang

05/11 01:06, , 3^F

05/11 01:06, 3^F