Fw: [試題] 102下 呂育道 離散數學 第一次期中
※ [本文轉錄自 NTU-Exam 看板 #1JHII6fL ]
作者: aalexx (aalexx.S) 看板: NTU-Exam
標題: [試題] 102下 呂育道離散數學 第一次期中
時間: Wed Apr 9 18:44:17 2014
課程名稱︰離散數學
課程性質︰資工系選修
課程教師︰呂育道
開課學院:電機資訊學院
開課系所︰資工系
考試日期(年月日)︰March 27, 2014
考試時限(分鐘):180
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試題 :
注: (n,2) 表C n取2
Note: Ypu may use any results proved in the class unless stated otherwise.
P1.(5 points)
Calculate 4!/2!
P2.
Consider the expansion of (x+y+z+w)^5.
(1) (5 points) Determine the coefficient of x^2yz^2.
(2) (5 points) Determine the sum of all coefficient.
P3.(5 points)
Let n be any positive integer. Show that (n,0)+(n,2)+(n,4)+...=(n,1)+(n,3)+...
P4.(10 points)
Recall the Catalan number bn = (2n,n)-(2n,n-1) for n>=1. It is equal to,
for example, the number of binomial random walks which start at the origin and
end at the origin in 2n steps without being in the negative territory.
(1)Show that (2n,n)-(2n,n-1) = (2n,n)/(n+1).
(2)Consider 2 types of moves R: (x,y)->(x+1,y) and U:(x,y)->(x,y+1). How many
ways can one go from (0,0) to (6,6) without ever crossing the line y=x
in 12 moves using only R and U moves?
P5.(10 points)
Let X=(p->q)^(q->r)->(p->r) be a boolean expression. Please derive the
simplest logically equivalent expression.
P6.(10 points)
Let A, B, C be any sets. Prove or disprove following statement:
If if A 屬於 B and B 不屬於 C, then A 不屬於 C.
P7.(10 points)
Let A,B be two sets with |A∩B| = 3, and |A∪B| = 8.
(1) How many C satisfy A∩B 屬於 C 屬於 A∪B.
(2) How many C satisfing (1) contain an even number of elements?
P8.(10 points)
Show that Σ[i=1 to n] (i2^i) = 2+(n-1)2^(n-1) by induction.
P9.(10 points)
Let n be nonegative onteger. Show that (2n,n) = Σ[k=0 to n](n,k)^2.
P10.(20 points)
There are two candidates A and B in an election. Let A receive a votes
and B receive b votes, a>b, before the votes are revealed one by one and
counted. On the vote-counting process, a total of a+b votes will be announced
sequentially such as "A A B B A A B ...". Call a vote announcing sequence
legal if A's accumulated vote count is greater than B's throughout
the vote-counting process. For examplem, the above sequence is not legal
because after the 4th vote announced, A's and B's votes break even.
(1) What is the toal number of possible vote announcing sequences (here,
legality is not a concern)?
(2) Show that the number of illegal sequence is (a+b-1,a) given that the
first announced vote is for B. (Hint: there must be a tie and recall the
reflection principle.)
(3) Show that the number of illegal sequences is (a+b-1,a) given that the
first announced vote is for A.(Hint: there must be a tie and recall the
reflection principle.)
(4) Finally, show that the total number of legal sequence is (a-b/a+b)(a+b,a)
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