Range of function /[f(x)=(e^x)/] is ___________
- Set of positive real numbers
Composite relation symbolically written as _______
- SoR={(a,c)aeA, ceC, 3eB, (a,b)eR and (b,c)eS}
If x=17(mod 5) which of the following integers are valid solution for x ?
- 12
Range of the relation {(0,1),(3,22),(90,34)}
- {1,22,34}
Let A= {0,1,2} and R = {(0,2),(1,1),(2,0)} be a relation on A. The which of the following ordered pairs are needed to make it transitive?
- (0,0) and (2,2)
Operation of subtraction is a binary operation on the set of __________
- Integers
Let S=R and define the ‘square’ relation R= {(x,y)Ix2=y2}. The square relation is an _________ relation
- Equivalence relation
The logic gate NOT is a uniary operation on {0,1}.
- True
Let A= {1,2}, then P(A)=__________
- {{},{1},{2},{1,2}}
If a relation R is reflexive, anti symmetric and transitive then which of the following is not true for the inverse relation.
- Inverse relation will be irreflexive.
Let R be a binary relation on a set A,R is anti-symmetric iff ___________
- a,beA if (a,b)eR and (b,a)eR then a=b
“-“ is a binary operation on the set of integers Z.
- True
The inverse relation R^(-1) from B to A is defined as ____________
- R^(-1) = {(b,a) e B*A I (a,b)eR}
Which of the following is always true for the matrix representation of a symmetric relation?
- Matrix is equal to its transpose
Let A= {1,2,3,4} and let R and S be transitive binary relations on A defined as; R= {(1,2), (1,3), (2,2), (3,3), (4,2), (4,3) and S={(2,1), (2,4), (3,3)} then RuS= {(1,2), (1,3), (2,1), (2,2), (2,4), (3,3), (4,2), (4,3)}
- R union S is transitive
Let S=R and define the ‘ square’ relation R = {(x,y)Ix2=y2}. The square is an _________ relation.
- Equivalance relation
If x=-10(mod 15). Which of the following integers are valid solution for x?
- 5
Let R be a binary relation on a set A. If R is anti symmetric then ______________
- Inverse of R is anti symmetric
If A={1,2,3} is a set and R = {(1,2),(2,2),(2,1)} is a relation on A, R is
- Symmetric
Let A={0,1} and B=(1). Let R and S be two binary relations on Cartesian product of A and B such that R={(0,1)} and S= {(1,1)}. Then R intersection S=_________________
- Empty
A relation R is said to be ______ iff it is reflexive, antisymmetric and transitive.
- Partial order Relation
Let X={1,2,3} and Y={7,8,9} and let f be function defined from X to Y such that f is onto then which of the following statement about f is true?
- Co-domain of f must contain 1 element
The function fog and gof are always equal
- False
If a relation R={(1,2),(2,3),(3,4)(4,1)(2,2) is given then which of the following is true about this relation.
- R is reflexive
A set is called countable if , and only if, it is____________
- finite
Let f(x) = x2-1 define function f from R to R and c=2 be any scalar, then c,f(x) is __________
- 2x2+2
The set Z of all integers is ___________
- Countable
Let R be a binary relation on a set A. If R is anti symmetric then _______
- Inverse of R is symmetric
For (2x-3, 4y+2) = (1,10). What will be the value of x and y ?
- (2,2)
Let f and g be the two functions from R to R defined by f(x) = IxI and g(x)= square root of x2 for all xeR. Then______
- F(x) is not equal to g(x)
If a set A has 15 elements then P(A) (power set of A) has ___________ elements.
- 2^15
For the relation below to be a function, x cannot be what values {(12,14),(13,5),(-2,7),(x,13)}?
- X cannot be 12, 13, or -2
Let the set A = {1,2,3,4}. Then the relation {(2,4),(4,2)} is ____________
- Symmetric
For the following relation to be a function, x can not be what values? R={(2,4),(x,1), (4,2),(5,6)}.
- x cannot be 2,4 and 5
Vertical line test is used to determine that whether the graph of a relation is a function or not.
- True
The properties of being symmetric and being anti symmetric are ____________
- Not negative of each other
The number of elements in AxB are ___________ if A is a set with ‘5’ elements and B is a set with ‘4’ elements.
- 20
R={(a,1)(b,2)(c,3)(d,4)} then the inverse of this relation is _____________
- {(1,a)(2,b)(3,c)(4,d)}
Logic gate NOT does not define a binary operation on (0,1) because ____________
- It takes a single input and gives a single output
How many real numbers exist between 1 and 5
- 3
The number pi is
- Irrational
The number square root 2 is
- Irrational
Range the relation {(0,1)(3,22),(90,34)}
- {0,3,90}
Supherical coordinate 0 is related to the cylindrical coordinate as_____________
Operation of subtraction is a binary operation on the set________
- Integers
Let A {1,2,3,4} and R={(1,2),(2,3),(3,3),(3,4)} be a relation on A. Then which one of the following ordered pair has made R not an irreflexive relation?
- (3,3)
Input values of the function are called the ____________
- Domain
Range of function f(x)=IxI will be
- Set of positive real numbers
Which of the following is not a binary operation on the set of integers?
- Division
In the matrix representation of an irreflexive relation all the entries in the main diagonal are __________
- 0
If the partition set of A is {A1,A2} then
- A1nA2= not empty set
Let A= {a,b} then P(A) =
- {Non empty set, {a},{b},{a,b}}
Which relations below are not functions?
- {(13,14),(13,5),(16,7),(18,13)}
In the directed graph of an antisymmetric relation there is _________ pair of arrows between two distinct elements of the set.
- No
If a relation R= (1,1),(2,1)(2,2) is given then which of the following is not true about this relation
- R is irreflexive
Let R and S be transitive relations on a set A then ________________
- Neither R union S is transitive nor R intersection S is transitive
Let R={(1,2)(3,4)(5,6)(7,8)}. Domain of the inverse of the relation is _____________
- {2,4,6,8}
Let A={1,2,3,4,5} and B={4,9,,16,17,25}. Then the relation R={(2,4),(3,9),(4,16),93,17)} The inverse of R is’
- {(4,2),(9,3),(16,4),(17,3)}
Let R be a relation on a set A. If R is symmetric then its compliment is __________
- Irreflexive
Which is not a binary operation on the set of natural numbers N?
- Subtraction
If a relation R={(1,1)(2,1)(1,2)(2,2)} is given then which of the following is not true about this relation.
- R is irreflexive
R={(a,1)(b,2)(c,3)(d,4)} then the inverse of this relation is ______________
- {(1,a)(2,b)(3,c)(4,d)}
For any set A, the Cartesian product of A and A is known as ____________
- Universal relation
Let A={p,q,r,s} and define a relation R on A by R={(p,p),(p,r),(q,r),(q,s),(r,s)} Then which one of the following is the correct statement about R:
- R is not reflexive
A={1,2} B={3,4}, R={(1,3)(2,4)}. Then the complement of R is __________.
- {(1,4)(2,3)}
Domain of a relation symbolically written as____________.
- Dom(R)={aeAI(a,b)eR}
Let X={2,4,5} and Y={1,2,4} and R be a relation from X to Y defined by R={(2,4)(4,1)(a,2)}. For what value of ‘a’ the relation R is a function?
- 5
Let A={1,2,3,4,5,6,7,8,9}, then which of the following sets represent the partition of the set A?
- A={1,3,5,7,9}, B={2,4,6}, C={8}
Let A={1,2,3} and B={2,4} then number of binary relations from A to B are _____________.
- 64
A relation R is said to be ________iff it is reflexive, antisymmetric and transitivde.
- Partial order Relation
Let f be a function from X={2,4,5} to Y={1,2,4,6} defined as:f={(2,6),(4,2),(5,1)} . The range of f is _________
- {1,2,6}
Let A={0,1,2} and R={(0,2),(1,1),(2,0)} be a relation on A. Then which of the following statement about R is true?
- R is symmetric
Let A={2,3,4} and B={2,6,8} and let R be the “divides” relation from A to B i.e for all (a,b) belong to (Cartesian product of A and B), a,R b iff a I b (a divides b). Then
- R={(2,2),(2,6),(2,8),(3,6),(4,8)}
Let A={1,2,3,…,50} and B={2,4,6,8,10}. Then the Cartesian product of A and B has ___________ elements.
- 250
In the matrix representation of an reflexive relation all the entries in the main diagonal are ___________
- 1
Which of the following is not a type of a relation?
- Permutation
Let X={2,4,5} and Y={1,2,4} and R be a relation from X to Y defined by R={(2,4),(4,1),(a,2)}. For what value of ‘a’ the relation R is a function ?
- 5
Which of the following is not a representation of a relation?
- Venn diagram
Let A={1,2,3,4} and define the following relations on A. Then R={(1,3),(1,4),(2,3),(2,4),(3,1),(3,4)} is _________
- R is irreflexive
The range of f:X-> Y is also called the image of
- True
Complementary Relation symbolically written as _________
- R=A*B- R={(a,b)eA*BI (a,b)not belong to R}
Let A={1,2,3,4} and R=(1,1)(2,2),(3,3),(4,4) then R is
- All options
If a relation R={(1,1),(2,1),(1,2),(2,2)} is given then which of the following is not true about this relation.
- R is irreflexive
Which of the following logical connective is not a binary operation ?
- Implication
A set may be dividend up into its disjoint subsets, such division is called_______
- Partition
If A=(1,2,3)&B=(4,5,6) and R ={(1,4)(2,5)(3,6)(3,4)} The complementary relation is _________
- A*B(difference or – ) R
In matrix representation of a__________ relation, the diagonal entries are always 1.
- Reflexive
R is not symmetric iff there are elements a and b in A such that ___________
- (a,b) belongs to R but (b,a) does not belong to R
Which relations below are functions?
R1={(3,4),(4,5),(6,7),(8,9)}
R2={(3,4),(4,5),(6,7),(3,9)}
R3={(-3,4),(4,-5),(0,0),(8,9)}
R4={(8,11),(34,5),(6,17),(8,19)}
- R1 and R3 are functions
The logic gate OR and AND are uniary operation on {0,1}
- False
There is atleast one loop in the graph of an irreflexive relation
- False
There is atleast one loop in the graph of an reflexive relation
- True
A contains 3 elements and B contains 2 elements, then number of subsets of A*B are _________
- 64
Let A={1,2,3} and B={0,1,2} and C={a,b} R={(1,0),(1,2),(3,1),(3,2)} S={(0,b),(1,a),(2,b)} composite of R and S=______________
- {(1,b),(1,a),(3,a),(3,b)}
If R is transitive then the inverse relation will be transitive
- True
The number of elements in the power set of P(not empty set) denoted by P(P(not empty set) is
- 2
The function defined from Z to Z as f(x)= 1/(x+2)(x-2) is not well defined because __________
- Function is not defined at x=2 and x=-2
Rang of relation {(0,1),(3,22),(90,34)} is ___________
- {1, 22, 34}
The number of elements in the power set of P(not empty set) denoted by P(not empty set) is
- 1
Let R={(1,2),(3,4),(5,6),(7,8)}. Domain of inverse of the relation is _________
- {2,4,6,8}
The relation ‘divides’ on the set of integers is _________
- A symmetric relation
Operation of subtraction is a binary operation on the set of__________
- Integers
If R is transitive then the inverse relation will be transitive.
- True
Let A={1,2,3,4} and define the relation R on A by R={(1,2),(2,3),(3,3),(3,4)}. Then__________
- R is both reflexive and irreflexive
A set may be divided up into its disjoints subsets,such division is called
- Partition
If a set A contains is elements then the number of elements in its power set P(A) is ________
- 2n
Range of a relation symbolically written as _______.
- Ran R = {b ∈ B I (a, b) ∈ R }
Let R be a binary relation on a set A. IF R is anti symmetric then _________.
- Inverse of R is anti symmetric
Let A be a set with m elements and B be a set with n elements then the number of elements in A*B are _________
- m.n
Let A{1,2,3,4} and define the following relation on A. Then R={(1,3),(2,2),(2,4),(3,1),(4,2)} Is __________
- R is symmetric
If A={1,2,3}& B={4,5,6} and R={1,4},{2,5},{3,6},{3,4}. The complementary relation is ________
- A*B (difference or -) R
Let R be a relation on a set A. If R is reflexive then its compliment is __________
- Irreflexive
25=1(mod 3) means that 3 divides _______
- 25-1
Let R be the universal relation on a set A then which one of the following statement about R is true ?
- R is reflexive, symmetric and transitive
Domain of a relation symbolically written as ______
- Dom(R)= {aeR I (a,b) e R}
Let R be a relation on a set A. R is transitive if and only if for all a,b,ceA then
- (a,b)eR and (b,c)eR then (a,c)eR
Let A be a non-empty set and P(A) the power set of A Deifne the ‘ subset’ relation ,c as follows for all X,Y e P(A), XcY <-> for all x, iff xeX then xeY . Then c is _________
- c is partial order relation
Define a relation R={(1,1),(2,2),(3,3),(1,3) the relation is
- R is reflexive and transitive
Let R be a relation on a set A. R is transitive if and only if for all a,b,ceA then.
- (a,b)eR and (b,c)eR then (a,c)eR
Let R and S be reflexive relations on a set A then R intersection S is reflexive
- True
A function whose range consists of only one element is called________
- One to one function
The set Z of all integers is ___________
- Countable
One-to-one correspondence means the condition of _______
- Both (a) and (c)
Let X={1,5,9} and Y={3,4,7}, Define a function f from X to Y such that f(1)=7,f(5)=3,f(9)=_________. Which is true f(9) to make it a one-to-one (injective) function?
- 4
What will be the fourth term of the following sequence 1/2,2/3,3/4 ______?
- 4/5
The value of 6!=
- 720
A constant function is one to one iff its ________ is a singleton.
- Domain
A constant function is onto iff its ___________ is a singleton.
- Co-domain
Number of one to one functions from X={a,b} to Y={u,v} are equal to ______-
- 2
If f is defined recursively by f(0) = -1 and f(n+1)=f(n)+3, then f(2)=_________.
- 5
A function whose inverse function exists is called a/an__________
- Invertible function
Let f(2)=3, g(2)=3, f(4)=1 and g(4)=2 then the value of fog(4) is……
- 3
Let A={1,2,3,4} and B={7} then the constant function from A to B is ________.
- Onto
Composition of a function is a commutative operation.
- False
Composition of a function is not a commutative operation
- True
The sum of first five whole number is __________.
- 10
If f and g are two one-to-one functions, then their composition that is gof is one-to-one.
- True
Inverse of a surjective function is always a function.
- False
Inverse of a surjective function may not be a function
- True
Let X={1,2,3,4} and Y={7,8,9} and let f be function defined from X to Y such that f is onto then which of the following statement about f is true?
- Co-domain of f must contain 3 elements
If f; X->Y and g; Y->Z are both onto functions. Then gof; X->Z is _________
- onto
If f and g are two one-to-one functions, then their composition gof is_________
- One-to-one
If f: W →X, g:X →Y, and h:Y →Z are functions, then___________
- (hog)of = ho(gof)
Cardinality of positive prime numbers less than 20 is __________.
- 8
IF f(x)=sin-1(x) and g(x)=sin x then gof(x) is _________.
- X
0!=_________.
- 1
An important data type in computer programming consists of __________.
- Finite sequences
Let f(x)=2x and g(x)=x+2 define functions f and g from R to R, then (f-g)(x) is __________.
- x-2
The total number of terms in an arithmetic series 0+5+10+15+….50 are _________.
- 11
9!/6!=________
- 504
Let f(x)=3x and g(x)=3x-2 define functions f and g from R to R, THEN (F+G)(X) is ___________
- 6x-2
If f is a bijective function then (f-1f(x)) is equal to
- X
A sequence whose terms alternate in sign is called an_________
- Alternating sequence
Common ration in the sequence “4, 16, 64, 256,…” is…..12.
- 4
0.8181818181 is a infinite geometric series.
- True
The word ‘algorithm’ refers to a step-by-step method for performing some action.
- True
A predicate become ______ when its variables are given specific values
- Sentence
The sum of two irrational numbers must be an irrational number.
- False
The sum of two irrational numbers need not be irrational number
- True
The division by zero is allowed in mathematics.
- Fasle
The product of any two consecutive positive integers is divisible by 2
- True
If ‘n’ is an odd integer then n^3+n is ________.
- Even
For integers a,b,c, If divides b and a divides c, then a divides (a+b).
- False
Quotient remainder theorem states that for any positive integer d, there exist unique integer q and r such that ________ and 0<r<d
- N=d.q+r
A rule that assigns a numerical value to each outcome in a simple space is called
- Random variable
If A and B are two disjoint (mutually exclusive) events then P(AB)=
- P(A) + P(B)
How many ways are there to select five players from a 10 member tennis team to make a trip to a match to another school?
- C(10,5)
The expectation of x is equal to
- Sum xf(x)
If P(A intersection B) = P(A) P(B) THEN THE events A and B are called
- Independent
A walk that starts and ends at the same vertex is called.
- None optins
How many integers from 1 through 1000 are neither multiple of 3 nor multiple of 5
- 497
What is the probability of getting a number greater than 4 when a die is thrown?
- 3/5
Eater formula for graphs is___________.
- F=e-v+2
X+a,x+3a,x+5a…..is an____________
- Arithmetic sequence
Composition of a function is a commutative operation.
- False
Real valued function is a function that assigns _____ to each member of its domain.
- Only a real number
Let X={1,2,3,4} and a function ‘f’ defined on X f(1)=1,f(2)=2,f(3)=3,f(4)=4 then ________
- F is an identity function
A constant function is surjective if and only if ____________
- The co-domain consists of a single element
Cardinality means the total number of elements in a set.
- True
If f(x)=2x and g(x)=x then g(f(x)) is _________.
- 2x2
Let f:R->R is one to one function then c,f, c is not equal 0 is also one to one function.
- True
Let X={1,2,3,4} and a function ‘f’ defined from X to X by f(1)=1, f(2)=1, f(3)=1, f(4)=1 then which of the following is true?
- F is a constant function
If f and g are two one-to-one functions, then their composition that is gof is one-to-one.
- True
Which of the following is not correct for a ‘sequence’?
- A sequence is a relation whose domain is the set of natural numbers
F(x)=x2 is not one to one function from R to R+
- True
Let f: R->R is one to one function then c,f c is not equal to is also one to one function.
- True
Let f(x)=x+2 then f-1(x) is________
- x-2
Let f(x)=x2+1 define functions f from R to R and c=2 be any scalar, then c,f(x) is __________.
- 2x2-1
One to one correspondence means the condition of __________.
- Both (a)and (c)
A function F: R-> R defined by f(x) = square root x is a real valued function.
- False
If g:R->R defined by g(x)=e2 is a real valued function of a real variable.
- True
A function F:R-> R defined by f(x) = log x is a real valued function
- True
½, then 3rd term of sequence is __________.
- 1/2
The process of defining an object in terms of smaller versions of itself is called recursion.
- True
Which of the following is not correct for a ‘sequence’?
- A sequence is a relation whose domain is the set of natural numbers
A set is called countable if, and only if, it is ____________.
- Finite and countable infinite…..both
A set that is not countable is called ___________.
- Uncountable
A sequence whose terms alternate in sign is called an _______.
- Alternating sequence
Let f: R->R is one to one function then c,f is also one to one function for _______.
- C is not equal 0
Let f(x) = x+3 then f-1(x) is __________-
- x-3
Let f and g be two functions defined by f(x) = x+2 and g(x)= 2x+1. Then the composition of f and g is__________.
- 2x+3
Number of one to one functions form X={a,b} to Y={u,v} are equal to ______
- 2
The flbonacci sequence is deined as F0=1,F 1=1, Fk=Fk-1+Fk-2 for all integers k> 2 then which of the following is true for F2
- F2-F1= 2+1=3
x+a, x+3a, x+5a,…… is a/an______.
- Arithmetic sequence
Inverse of a function may not be a function.
- True
In the following sequence ak=K/(k+1), for k=1, a1 will be __________.
- ½
If f(x)=x and g(x)= -x are both one to one function then (f+g)(x) is also one to one function.
- False
If f(x)=x and g(x)= -x are both one to one function then (f+g)(x) is not one to one function.
- True
The function ‘f’ and ‘g’ are inverse of each other if and only if their composition gives_______.
- Identity function
Which of the following set is the domain of a sequence?
- Set of real numbers
Let C is defined as the set of all countries in the world then C is a _________.
- Finite set
A constant function is surjective if and only if________.
- The co domain consists of a single element
The sum of the series a1 + a2 +a3 + …….. can be written as ___________.
Inverse of a function may not be a function.
- True
- 3
Let X={1,2,3,4} and a function ‘f’ defined from X to X by f(1)=1, f(2)=1, f(3)=1, f(4)=1 then which of the following is true?
- F is a constant function
The composition of function is always
- Associative
A set is countably infinite if, and only if, it has the same cardinality as the set of
- Positive integers
Two functions ‘f’ and ‘g’ from ‘X’ to ‘Y’ are said to be equal if and only if ______.
- F(x)=g(x) for all ‘x’ belongs to X
Y=x3 is a graph of bijective function from R to R.
- True
Domain and range are same for___________.
- Identity funtion
Let X={1,2,3,4} and a function ‘f’ defined on X by f(1)=1,f(2)=2,f(3)=3
- F is an identity function
Composition of a function is a commutative operation.
- True
Inverse of a surjective function is always a function.
- False
A function whose inverse function exists is called a/an________.
- Invertible
Given a set X define a function I from X to X by i(x)=x from all x belonging to X . Then_________.
- I is both injective and surjective
Let f: R->R is a one to one function then c,f is also one to one function for.
- C is not equal 0
Let X={1,5,9} and Y={3,4,7}. Define a function f from X to Y such that f(1)=7, f(5)=3, f(9)=______. Which is true for f(9) to make it a one-to-one (injective) function?
- 4
Which of the following is not a predecessors of ak?
- Ak+1
Two functions ‘f’ and ‘g’ from X to Y are said to be equal if and only if_________.
- F(x)=g(x) for all ‘x’ belongs to x
The two functions ‘f’ and ‘g’ are equal if _______.
- F(x) =3x and g(x)= 6x2+3x/2x2+1 for all xeR
If first term of a geometric sequence is 2 and common ratio is ½, then 3rd ter, of sequence.
- ¼
Y= squre root x is an __________function form R+ to R
- One to one function
Y= x2 is an __________function form R to R+
- NOT ONE TO ONE FUNTION
If a function (gof)(x) : X->Z is defined as (gof)(x)=g(f(x)) for all xeX, Then the function__________—.
- (gof)
If 0 is the first term and -2 be the common difference of an arithmetic series, then the sum of first five terms of series is _________.
- -20
If f(x)=sin-1(x) and g(x) = sin x then gof(x) is ___________.
- X
F: X->Y that is both one to one and onto is called a _________.
- Bijective function
What does ‘y’ denotes in a geometric sequence?
- Common ratio
Let g be a function defined by g(x)=x+1. Then the composition of (gog).
- X+2
A graph of a function f is one to one iff every horizontal line intersects the graph in at most one point.
- True
Which of the following is true for the following sequence?
- If n is even, then Cn=2 and if n is odd, then Cn = 0
The function ‘f’ and ‘g’ are inverse of each other if and only if their composition gives__________.
- Identity function
N! is defined to be ___________.
- The product of the integers from 1 to n
Let A = {1,2,3,4} and B={7} then the constant function from A to B
- Both one to one and onto
A set is called countable if, and only if, it is ___________.
- Countably infinite and finite
If f(x) = x and g(x) = -x are both one to one functions then (f+g)(x) is also one to one function.
- False
If a is the 1st term and d be the common difference of an arithmetic sequence then the sequence is a, a+d, a+2d, a+3d….
- True
x+a, x+3a, x+5…… is a/an_________.
- Arithmetic sequence
inverse of an injective function may not be a function.
- True
y=x3 is a graph of bijective function form R to R
- False
Two functions ‘f’ and ‘g’ from x to y are said to be equal if and only if _____.
- F(x)=g(x) for all ‘x’ belongs to x
Common ration in sequence ’36, 12, 4 , 4/3, …..’ is ……
- 1/3
A set is called finite if, and only if, is the _______ or there is ———.
- Empty set or one-to-one
Let f(X)=x2-1 and g(x)=x+1 define functions f and g from R to R, then (f/g)x
- x-1
A graph of a function f is one to one iff every horizontal line intersects the graph in at most one point.
- True
Let g be a function defined by g(x) = x+1. Then the composition of (gog).
- X+2
F:X->Y that is both one to one and onto is called a ___________.
- Bijective function
What does ‘I’ denotes in a geometric sequence?
- Common ratio
Let A={1,2,3,4} and B={7} then the constant function from A to B is ______.
- Both one to one and onto
N! is defined to be ________.
- The product of the integers from 1 to n
A set is called countable if, and only if, it is _________.
- Both b and c
Which of the following is the example of an alternating sequence?
- Cn=n/n+1 for n > 0
X+a, x+3a, x+5a….. is an________
- Arithmetic sequence
0, -5, -10, -15, … is an __________.
- Arithemetic sequence
5, 9, 13, 17, … is an __________.
- Arithemetic sequence
An important data type in computer programming consists of ____________.
- Finite sequence
One-to-one correspondence means the condition of _________.
- One-one and onto ….both
Cardinality means the total number of elements in a set.
- True
Inverse of a function may not be a function.
- True
The functions ‘f’ and ‘g’ are inverse of each other if and only if their composition gives ____________.
- Identity function
A set is called finite if , and only if, it is the _________ or there is ________.
- Empty set or one-to-one
Let f and g be the two functions from R to R defined by f(x) = IXI and g(x) = square root x2 for all xeR, then __________.
- F(x) is not equal to g(x)
If f-1(x) = 6-x/2 then f-1 (2) is __________.
- 2
Let f(2)=3, g(2)=3, f(4)=1 and g(4)=2 then the value of fog(4) is _______.
- 3
An important date type in computer programming consists of _——.
- Finite sequence
Let f(x)=x+3 then f-1(x) is _________.
- X-3
If f:X->Y amd g:Y->Z are both onto function. Then gof : X->Z is _______.
- One-to-one function
The functions ‘f’ and ‘g’ are inverse of each other if and only if their composition gives
- Identity function
The two function ‘f’ and ‘g’ are equal if _____________.
- F(x) = 3x and g(x) = 6x2+3x/2x+1 for all xeR
Two functions ‘f’ and ‘g’ from X To Y are said to be equal if and only if——.
- F(x) and g(x) for all ‘x’ belongs to X
Which of the following set is the domain of a sequence?
- Set of natural numbers
If 1st term of a geometric sequence is 2 and common ratio is 1/2 , then 3rd term of sequence is __________.
- 1/2
Composition of a function is a commutative operation.
- True
If a function (gof)(x): X-> Z is defined as (gof)(x)=g(f(x)) for all xeX. Then the function _________ is known as composition of f and g.
- (g o f)
A set is countably infinite if and only if and only if, it has the same cardinality as the set of _________.
- Positive integers
The 3rd term of the sequence bn=5n is _______.
- 125
If f is a bijective function then (f-1(f(x)) Is equal to _____.
- X
Let f(x) = x and g(x) = -x for all xeR, then (f+g)(x) is ____.
0
An infinite sequence may have only a finite number of values.
- True
The functions fog and gof are always equal .
- False
If f and g are two one-to-one functions, then their composition that is gof is one-to-one.
- True
A function whose range consists of only one element is called ___________.
- Constant function
Let X ={1,5,9} and Y={3,4,7}. Define a function f from X to Y such that f(1)=7, f(5)=3, f(9)=4 then which of the following statement about ‘f’ is true?
- F is both one-to-one and onto
Y=x3 is a graph of bijective function from R to R.
- True
A function whose inverse function exists is called a/an______.
- Invertible
Let F and g be two functions defined by f(x)= x+2 and g(x)= 2x+1. Then the composition of f and g is _____.
- 2x + 5
If r is a positive real number, then the value of r in 3, r,r=-27r is
- -9
The _____ of the terms of a sequence forms a series.
- Sum
The sum of first five whole number is _________.
- 10
If fk=fk-1+fk-2then f0=1 , f1=2, then f2= __________.
- 3
Let f(x) = 3x and g(x) = x + 2 define functions f and g from R to R, then (f.g)(x) is _____.
- 3x2 + 6x
Let R be a relation on a set A. If R is reflexive then its compliment is ________ .
- Irreflexive
If A = Set of students of virtual university then A has been written in the _________.
- Descriptive form
If a function (g o f)(x):X→Z is defined as (g o f)(x) = g(f(x)) for all x ∈ X. Then the function ________ is known as composition of f and g.
- (g o f)
If X and Y are independent random variables and a and b are constants, then Var(aX + bY)is equal to
- aVar(X) + bVar(Y)
Let A = {1, 2, 3} and B = {2, 4} then number of functions from A to B are _________.
- 8
p is equivalent to q’ means ________.
- p is necessary and sufficient for q.
Let A and B be subsets of U with n(A) = 12, n(B) = 15, n(A’) = 17, and n(A intersection B) = 8, then n(U)=______ .
- 29
For the following relation to be a function, x can not be what values?
R = {(2,4), (x,1), (4,2), (5,6)}
- x cannot be 2, 4 or 5
Find the number of the word that can be formed of the letters of the word “ELEVEN”.
- 120
There are three bus lines between A and B, and two bus lines between B and C. Find the number of ways a person can travel round trip by bus from A to C by way of B?
- 6
Among 20 people, 15 either swim or jog or both. If 5 swim and 6 swim and jog, how many jog?
- 16
A predicate becomes _________ when its variables are given specific values.
- statement
Find the number of distinct permutations that can be formed using the letters of the word ”BENZENE”
- 420
Suppose there are 8 different tea flavors and 5 different biscuit brands. A guest wants to take one tea and one brand of biscuit. How many choices are there for this guest?
- 40
In how many ways a student can choose one of each of the courses when he is offered 3 mathematics courses, 4 literature courses and 2 history courses.
- 24
If p ↔ q is True, then ________.
- p and q both are True.
If A and B be events with P(A) = 1/3, P(B) = 1/4 and P(A ∩ B) = 1/6, then P(A ∪ B) = ________ .
- 5/12
an integer n is a perfect square if and only if ________ for some integer k.
- n = k^2
If A and B are disjoint finite sets then n(A ∪ B) = ______.
- n(A) + n(B)
Let X = {2, 4, 5} and Y= {1, 2, 4} and R be a relation from X to Y defined by R = {(2,4), (4,1), (a,2)}. For what value of ‘a‘ the relation R is a function ?
- 5
∼(P → q) is logically equivalent to _________.
- p ∧ ∼q
A tree is normally constructed from ________.
- left to right
A Random variable is also called a _________.
- Chance Variable
The conjunction p ∧ q is True when _________.
- p is True, q is True
The logical statement p ∧ q means ________.
- p AND q
Which of the followings is the factorial form of 5 . 4?
- 5!/3!
What is the minimum number of students in a class to be sure that two of them are born in the same month?
- 13
If p is false and q is true, then ∼p ↔ q is ________.
- True
If f and g are two one-to-one functions, then their composition that is gof is one-to-one.
- TRUE
( p ∨ ∼p ) is the ________.
- Tautology
(-2)! = _________ ?
- Undefined
If p = It is raining, q = She will go to college
“It is raining and she will not go to college”
will be denoted by
- p ∧ ∼q
Let X = {1, 2, 3}, then 2-combinations of the 3 elements of the set X are _________?
- {1, 2}, {1, 3} and {2, 3}
Let f(x) = x2 + 1 define functions f from R to R and c = 2 be any scalar, then c.f(x) is ______.
- 2x2 + 2
The disjunction of p and q is written as ________.
- p ∨ q
If X and Y are independent random variables, then E(XY) is equal to
- E(x)E(y)
How many possible outcomes are there when a fair coin is tossed four times?
- 16
Which of the followings is the product set A * B * C ? where A = {a}, B = {b}, and C = {c, d}.
- {(a, b, c), (a, b, d)}
The number of the words that can be formed from the letters of the word,“COMMITTEE” are
- 9! / (2!2!2!)
One-to-One correspondence means the condition of ______.
- One-One and onto
The functions f o g and g o f are always equal.
- FALSE
If order matters and repetition is allowed, then which counting method should be used in order to select ‘k’ elements from a total of ‘n’ elements?
- K-Sample
Determine values of x and y, where (2x, x + y) = (8, 6).
- x = 4 and y = 2
Let g be a function defined by g(x) = x + 1. Then the composition of (g o g)(x)is ______.
- x + 2
What is the truth value of the sentence?
‘It rains if and only if there are clouds.’
- False
Reductio and absurdum’ is another name of _________.
- Proof by contradiction
X belongs to A or x belongs to B, therefore x belongs to ________.
- A union B
Which of the followings is the product set A * B * C? Where A = {a}, B = {b}, and C = {c, d}.
- {(a, b, c), (a, b, d)}
Real valued function is a function that assigns _______ to each member of its domain.
- Only a real number
The negation of “Today is Friday” is
- Today is not Friday
A non-zero integer d divides an integer n if and only if there exists an integer k such that _________.
- n = d k
The statement p → q is logically equivalent to ∼q → ∼p
- True
Let R be the universal relation on a set A then which one of the following statement about R is true?
- R is reflexive, symmetric and transitive.
Let f(x)=3x and g(x) = 3x − 2 define functions f and g from R to R. Then (f+g)(x) = ________.
- 6x − 2
The switches in parallel act just like ________.
- OR gate
The converse of the conditional statement p → q is
- q → p
If X and Y are random variables, then E(aX) is equal to
- aE(X)
Which of the following statements is true according to the Division Algorithm?
- 17 = 5 x 3 + 2
Let p → q be a conditional statement, then the statement q → p is called ________.
- Converse
The disjunction p ∨ q is False when ________.
- P is False, q is False.
A student can choose a computer project from one of the two lists. The two lists contain 12 and 18 possible projects, respectively. How many possible projects are there to choose from?
- 30
The converse of the conditional statement ‘If I live in Quetta, then I live in Pakistan’ is ________.
- If I live in Pakistan, then I live in Quetta.
The functions ‘f’ and ‘g’ are inverse of each other if and only if their composition gives _______.
- Identity function
P (0, 0)=______?
- 1
Let p1, p2, p3 be True premises in a given Truth Table. If the conjunctions of the Conclusion with each of p1, p2, p3 are True, then the argument is ________.
- Valid
If p is false and q is false, then ∼p implies q is ________.
- False
A box contains 5 different colored light bulbs. Which of the followings is the number of ordered samples of size 3 with replacement?
- 125
Let A = {2, 3, 5, 7}, B = {2, 3, 5, 7, 2}, C = Set of first five prime numbers. Then from the following which statement is true ?
- A = B
The set of prime numbers is _________.
- Infinite set
The contrapositive of the conditional statement ‘If it is Sunday, then I go for shopping’ is ________.
- I do Not go for shopping, then it is Not Sunday.
Let p be True and q be True, then ( ∼p ∧ q ) is ________.
- False
In how many ways a student can choose a course from 2 science courses,3 literature courses and 5 art courses.
- 30
The method of loop invariants is used to prove __________ of a loop with respect to certain pre and post-conditions.
- correctness
A student is to answer five out of nine questions on exams. Find the number of ways that can choose the five questions
- 126
If A and B are any two sets, then A − B = B – A
- False
There are 5 girls students and 20 boys students in a class. How many students are there in total?
- 25
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