ความหมาย หรือค าจ ากดัความที่ควรทรา

Meaning or values ​​developed industry and to note
1. Their access gene sets into gene 2, this is
1.1 Accessing gene distributions come Pushkin
1.2 Accessing gene that dam unraveling of Houston. Ki
2. equality of sets
2.1 a  b  If a  a then a  b, and if b  b and b  a
.Set or two sets will be the color Pushkin the idea that any single character
2.2
a  b  a  b and b  a
2.3 If a  b and b  c then a  c
3. That's the same set of Yi Yi
set my feet on a tech set b if and only if n (a)  n (b), or subset of a and b G set amount of damage equal to H
4.Empty set () or {}
a    n (a)  0
5. Sets limit
a the knockout set limit when n (a) = 0, or the amount in full plus.
6. sector now Nat
a post to knock Seton Nut House when a Bill Jacuzzi NO limit
7. subset
7.1 a  b  If a  a then a  b 7.2 a is knocked subsets true b once a  b but a  b
(if the prosecution does not define the Iia at any given
his mind that a  b mean the subset, any where. was a  b) if the proposition requires a  b
and a  b Fo understand that
.a  b means a is knocked subsets original purpose of b, where a  b
a  b means a is knocked subset of any of b, where a  b is the purpose
7.3 The number of subsets of.
na  2, but the number of subsets Track and troubleshooting of a 2 1
n
  where n is a knockout
amounted to a rich skill set, a
7.4 for the Tai should we. The
7.4.1 a  a (any set will knock a subset of the nationalists always)
7.4.2   a (
 will knock any set is always a subset of Magneto during both the nut itself. is   
)
7.4.3 If a  b and b  c  a  c

acts between sets or between sets at the New Nation (operation on sets)
1.UNESCO genes (union of two sets) denoted by 
a  b   xx  a  x  b  color Twombly Tai is important as is
1.1 for the Tai Di a, b . u  a  b  u where u represents the universe of relativity only
1.2 for the Tai switch where a  b  b  a
1.3 for the Tai change group (a  b)  c  a  (b.  c)  a  b  c
1.4 for the Tai to the prior chest logo only a      a  a
1.5 for the Tai cutting out unnecessary ring if a  b  a  c can not be used to conclude that b  c.
1.6
u  a  a  u  u
1.7
a  a  a
1.8 If a  b  a  b  b
2. Forums New router bisexual null (intersection of two sets) represented by the symbol. 
a  b   xx  a  x  b  color Twombly Tai is important as is
2.1 for the Tai Di a, b  u  a  b  u
2.2 for the Tai switches. where a  b  b  a
2.3 for the Tai change group (a  b)  c  a  (b  c)  a  b  c
2.4 for the Tai to the prior chest logo only a  u.  u  a  a
2.5 for the Tai cutting out unnecessary ring if a  b  a  c can not be used to conclude that b  c
2.6
a      a  
2.7
a  a  a.
2.8 If a  b  a  b  a 3. sitcom implementation of a set or a complement of a set (compliment of set) represented by a 
a 
. c (a)   xx  u  x  a  color Twombly Tai is important as is
3.1 (a ) 
 a
3.2 x  a  x  a  or x . a   x  a
3.3  
 u and u 
 
3.4 (a  b) 
 a   b  and (a  b) 
 a   b 
4. . Difference between sets or the difference between the New Nation (different of sets) represented by -
.a  b   xx  a  x  b  color Twombly Tai is important as is
4.1 a  b  a  (a  b)  a  a
 (a  b) . a  a  b
4.2
a  b  a  b  or a  b  a  b  or a  a  
4.3
a  b  b  a, but a  b  b   a. 
4.4 a  b  b  a  a  b
5., the relationship between body too. The name of the new set expense should
5.1
(a  b) 
. a   b  and (a  b) 
 a   b 
5.2 (a  b)  c  (a  c)  (b  c)
(a  b)  c . (a  c)  (b  c)
5.3
a  a 
 u and a  a 
 
5.3 a  b  a  b  a  b
a  b  a  a.  b  a
a  b  a  a  a  b
a  b    a  b  
a  b    1. a or b
 , or
2. a and. b is knocked disjoint set (the set that is free of color come together Pushkin)
.Power reset (power set)
p (a)   xx  a  in the similar p (p (a))   xx  p (a)  that came Pushkin any single character. p (a) must be set as the color
a knock at the Tai the key is as follows:
1., considering that the data follows right or wrong as retaining essentially as follows
1.1
.a  p (b)  a  b
1.2
a  p (b)  If x  a  x  p (b)
1.3  a   p (b)   a   b  a . b
1.4  a   p (b)  a  p (b)  a  b
2.
  p (a),     p (a),   p (a)
3. .
a  p (a)  a  a  a   p (a)  a  p (a)
4.
p ()     and p (p ())   . ,    
5., if
x
n (a)  x  n (p (a))  2

x
.2  n (p (p (a)))  2 b noted the number of Kashmir drive p is equal to the sum of the number 2
6. A  b  p (a)  p (. b)
7. p (a  b)  p (a)  p (b)
8. p (a  b)  p (a)  p (b), but p (a  b)  p (. a)  p (b)
9.  p (a)   p (a )


10. p (a  b)  p (a)  p (b), but p (a  b. )  p (a  b )  p (a)  p (b )

Ven diagram of Eu boiler uncompromised
.a  ba  b   a  b   b  aa  b
a  b


a  b


a  b


a 


The number of Smart Pushkin in. set
If a, b and c are knocked set limit
1.
n  a  b   n (a)  n (b)  n (a  b)
2.
n  a  b.   n (a)  n (b)  n (a  b)  0
3.
n  a  b  c   n (a)  n (b)  n (c)  n (. a  b)  n (b  c)  n (a  c)  n (a  b  c)
4.
n  a    n (u)  n (a)
4.n  a  b   n (a)  n (b).

The meaning, or the price from dak of should know
1.2 directory crossed crossed genes genes set the ้ a 1.1 the genes
crossed here for distribution of the genes
crossed 1.2 chaki said chaki of wax dam.
2.2.1 A set of B
  if a A a B  . b b B, and if A
 . Or set the set 2 color suites would eventually come together, thaku Meihua chaki. A
A
A B 2.2    B and B  A
A B and B if 2.3   C and A C 3 set
 pouring at the same bathao Yi.
A set B set with bathao Yi and when n (A)  n (B), or A set, and the set B must calculate the same machi chaki Member
4. Empty set () or {}
n    A (A) 5
0 . set from A Pedro น็
bite. Set Java bite only if n (A) = 0 or a positive spiral plate.
A
นัต์ episode 6 se. Peter น็. A นัต์ episode when shutting down A set and do not bite.
7
 A 7.1 set hack. B a A a and if    B 7.2 chopped น็ A set B is related to A tactic  A B, but B 
(if you do not set any donyim ka solution, B
A  understand that means any set A, which is minced  B.), but if one takes A good check  B
and A
B understand how disruption .A  B A น็ refers to a set of choppers, Pedro B B A a A B
  refers to any of A shredded paper, น็ set B A B .
7.3. The entire set of choppers were
n minced, but were A set 2  Mt ท้ ngamot of A 1 2
n
น็  n by Pedro 
chaki were A member of 7.4 7.4 บตัที่ควร

and slumber parties.A 1 A  (set, any set of choppers to Pedro น็ มน้ always own)
7.4.2   A (
 is set, any set of choppers, น็ is always ก้ระทั่ง the macro มน้:   
)
7.4.3. If A B and B  C  C  A

 to quail during the set, or a new set of natural cross-David (Operation on sets)
1. U natural gene (Union of two sets), represented by the symbol 
A B .  x x A   B khan masi  x มบตัที่สา:
A B 1.1 batap , SOM di U   U B A  where U represents the relative universe
1.2. A secret B  batat.  BA
1.3 Right บตั change group (A  B)    A C ( B C) A B C   
1.4. A unique บตัการม       A 1.5 out of A possible จ่ บตัการตัด
3 ring if A B A C   . My cold sores can conclude that C
B
  1.6 U U U A A    
A
A 1.7  
A B if A 1.8 A B B
   2. Inorganic inhibitor se กชนั (the Intersection of two sets), represented by the symbol 
.A B  x x A   B khan masi  x มบตัที่สา:
A B 2.1,  di batap; U  U
 B A  2.2. A secret  batat   A B B
บตั sense 2.3 change group (A  B)    A C ( B C) A B C
   2.4.   บตัการม A unique sense U U A A  
2.5. บตัการตัด off my จ่ ring if A B C A   . My cold sores can conclude that C
B
  2.6 A A      
A
 A 2.7  
A B A 2.8 A, if B A    3. surrender of the segment or its complement of set (set of Compliment) represented by A symbol A  

. C(A)  x x U A  x มบตัที่สา masi   khan:
3.1 (A ) 
A
A x 3.2  .  x  x   A or A A  x  
3.3.    U
U and
  
3.4 (A  B)     
A B and (A  B)      B
A
4. the difference between the natural, or a new set of difference (Different sets of) represented by the symbol-
. A B  x x A  x มบตัที่สา B masi   khan: A B A 
  4.1 (A B )  A.  A
(AB)A
A B 4.2     
A B A B A B A    or B   A    or A
B
A B 4.3     B B A A but      A B
A B 4.4   A A . B
5. The relationship between the nature of the set of the new Java 5.1 should be

(A  B) 
.A     and B (A B )      B
A
5.2 ( A B) C   (A C )  ( B C)
( A B) C .  (A  C)  (C  B)
A
A
 5.3    A U and A 
A
B   5.3    A A B A B      A B
A. B A
AB AA  A B
AB  A
A B        B 1 A or B.
2 or
 . A and B into a disjoint set น็ (the color set comes together mighty ม่ chaki)
.The power set (Power set)
P (A)   x x.  overflow  the same book A P (P (A))   x x.  P (A) that is a member of the Quran chakit . Selection of P (A) shall only set Peter masi น็
มบตัที่สา khan:
1. considering that the ขอ้ค of the following is wrong or haiyuet., as follows: 1.1

.(B) A P A    B
A
P  1.2 (B)  if x A x P    (B)
1.3. AP(B) A B  AB
1.4 A P(B)  AP(B)  A  B
2.
P(A) ,     P (A), (A) P  
A
P . 3 (A) A A A     P  (A) (A) A   P
4.
P ()     and P (P ())       ,
5
n
x. (A)   n x (P (A))


2 x . 2 n (P (P (A))) 2 ขอ้สังเก . akat were consummate P will be equal to the number of platters 2
6. A P B   (A), (B) P 
7. P (A B ) P  (A), (B) P 
8. P (A B ) P P   (A), (B) and P (A B ) P  (A)  P (B)
9. P(A)  P(A)


10. P(AB)   P P (A), (B) and P (A B ) P  (A  B ) P  (A) P  ( B)


ayaloe wanen diagram. A  B AB  AB  B  A A  B
A  B


A  B


A  B


A



Chaki were set in a year if A, B and C is น็. Set Java bites A 1 n

B.    n (A), (B)   n n (A  B)
n
2 B A .    n (A), (B)   n n (A  B)
n
0.3   A  B  C   n (A), (B)   n n (C)  n (A  B)   (C  B) n n (A  C)  n (A  B  C)
4
n A  .   n (U)  n (A)
4. nAB  n(A) n(B)

meaning, or the กดั, you should know,
1. The gene Set D. silver shekels of silver to be a genetically modified organisms. The 2
1.1 shekels of silver, and proving a genetic Jabeshgilead
1.2 shekels, gene said, undo the dam of Jabeshgilead
2. The gray, embarrassed, of 2.1
A  B  if a  A  B, and if a B and B  B  A
or embarrassed, you will be required to set D. 2 m color Jabeshgilead, and Jacuzzi,
มอืน. CHAPTER 2.2
A  B  A  B and B  A
2.3 if A  B and B  C. A  C
3. Pour the gene set D. gray, the embarrassed,
A pour the gray gene, the embarrassed B when n (A)  n (B) or embarrassed embarrassed B มจี A and the forest, Jabeshgilead, gray,
4.most cassette players available (), or { }
A    n (A)  0
5. Set D.
A เปน็ embarrassed. The bite, bite. When n (A) = 0 or to the positive forest
6. Processor, when prompted
A เปน็ processor, when prompted, when A ไมใ่, Greece, a bite to the
7. Chop set D. 7.1
A  B  if a  A  B. A 7.2 A เปน็ chopper Set D. the chapter carries out B when A  B but A  B
(if unsolved, ไมก นยิ motorised transport, any,
he will mind that A  B means any chopper embarrassed that any A  B) but if unsolved, a decree A  B
A  B ใหเ้ legs and arms that
A  B means A เปน็ chopper Set D. the chapter of which B A  B
A  B means A เปน็ chopper embarrassed of any B A  B which he proclaims
7.3. The forest chopping embarrassed all of
n A  2. But the forest chopping embarrassed แทท้ tragic A 2 out of 1
n

เปน็   by the n. The forest of Jabeshgilead, embarrassed A
7.4 at home, they should be.
7.4.1 A  A (embarrassed any เปน็ chopper will be embarrassed by the Council's own, always)
7.4 2   A (
 เปน็ chopper will be embarrassed embarrassed of any trees to be always engaged in an anvil, the Council's own    is
)
7.4 3 if A  B and B  C  A  C

a chapter, or embarrassed during the Meonenim. between the embarrassed (Operation on sets)
1.ยูเน genes (two sets of Union), instead of by the symbol
 A  B    A  X X X  B , color, at home, substitute of
is as follows: 1.1 at home ปดิ A, B  U  A  B  U U instead by the universe, Einstein 1.2
at home switch on A  B  B  A
1.3 at home change group (A  B)  C  A  (B  C)  A  B  C
1.4 at home, and in the chest, Head of stolen A      A  A
1.5 at home, cut off the string if it come enjoy Connecticut hospitality A  B  A  C ไมส teachers will come to a conclusion that B  C

1.6 U  A  A  U  U 1.7


A  A  A 1.8 if A  B  A  B  B
2. appointed accommodations beautifully blend extraordinary comfort with welcome in Calcutta; (two sets of Intersection), instead of by the symbol
A  B   X X X  A   B , color, at home, the substitute of
is as follows: 2.1 at home ปดิ A, B  U  A  B  U
2.2 at home switch on A  B  B  A
2.3 at home, change the group (A  B)  C  A  (B  C)  A  B  C
2.4 at home, and in the chest, head of stolen A  U  U  A  A
2.5 at home, cut off the string if it come enjoy Connecticut hospitality A  B  A  C ไมส apron to conclude that B  C

2.6 A      A   2.7


A  A  A 2.8 if A  B  A  B  A 3. comma or embarrassed to give arguments for the complement of SET D. (Compliment of SET) instead of by the symbol A  A 

 C (A)   X X X  U   A , color, at home, the substitute of
is as follows: 3.1 (A )   A

X 3.2 X  A   A   A   X or X  A

3.3    U and U   

3.4 (A  B)
  A   B  and (A  B)
  A   B 
4. difference between embarrassed or the Meonenim. The results are (Different of sets) instead of a symbol-
A  B   X X X  A   B , color, at home, the substitute of
is as follows: 4.1 A  B  A  (A  B)  A  A
 (A  B)  A  A  B

4.2 A  B  A  B  or A  B  A  B  or A  A  

4.3 A  B  B  A but A  B  B   A 
4.4 A  B  B  A  A  B
5. The relationship between the blade of Meonenim. Should be embarrassed at the heart

5.1 (A  B) 
 A   B  and (A  B)
  A   B 
5.2 (A  B)  C  (A  C)  (B  C)
(A  B)  C  (A  C)  (B  C) 5.3


A  A   U A  A 
and
  5.3 A  B  A  B  A  B
A  B  A  A  B  A
A  B  A  A  A  B
A  B    A  B  
A  B    1. A or B
  or
2. A B เปน็ and disjoint set (a set D. ไมม่ Jabeshgilead, together)
Power Set D. (Power set)
P (A)    A  X X in the same Godoy P (P (A)   X  P (A)  Jabeshgilead, there is a jacuzzi, P (A) must be
เปน็ set D. gray color, that is, at home, the substitute of
is as follows: 1. To consider the following: warning message can be wrong or ใหย tsunami main as this

1.1A  P (B)  A  B

A  P 1.2 (B)   A  X if X  P (B)
1.3  A   P (B)   A   B  A  B  A   P
1.4 (B)  A  P (B)  A  B
2.
  P (A),     P (A),   P (A)
3.
A  P (A)  A  A  A   P (A)  A  P (A)
4.
P ()     and P (P ().   ,    
5. If
X
n (A) x   n (P (A)  2

X
2  n (P (P (A).  2 warning message can be observed in the forest, กัษ P will be grayed out on the forest of the number 2
6. A  B  P (A)  P (B)
7. P (A  B)  P (A)  P (B)
8. P (A  B)  P (A)  P (B), but P (A  B)  P (A)  P (B)
9.  P (A)   P (A )


 10. P (A  B)  P (A)  P (B), but P (A  B)  P (A  B )  P (A)  P (B )

map image to pander to expropriation of Gilead, and the
A  B A  B   A  B   B  A A  B A  B






A  B A  B A 





to the forest, and the embarrassed
if A Jabeshgilead, and B C เปน็ embarrassed. The bite
1.
n  A  B   n (A)  n (B)  n (A  B)
2.
n  A  B   n (A)  n (B)  n (A  B)  0
3.
n  A  B  C   n (A)  n (B)  n (C)  n (A  B)  n (B  C)  n (A  C)  n (A  B  C)
4.
n  A    n (U)  n (A)
4.n  A  B   n (A)  n (B).