Let R be the relation in the set N, given by
`R={(x,y):x=y+3,ygt5}`. Choose the correct answer from the following:

Let R be the relation in the set N given by R = {(a , b) : a = b-2, b > 6} . Choose the correct answer.(A) (2, 4) in R (B) (3, 8) in R (C) (6, 8) in R (D) (8, 7) in R

Let R be a relation from a set A to a set B, then

Let R be a relation on the set N be defined by {(x,y)|x,yepsilonN,2x+y=41} . Then prove that the R is neither reflexive nor symmetric and nor transitive.

Let R be a relation defined on the set of natural numbers as: R={(x,y): y=3x, y in N} Is R a function from N to N? If yes find its domain, co-domain and range.

Let f:R to R defined by f(x)=x^(2)+1, forall x in R . Choose the correct answer

Let R be a relation on the set of natural numbers N, defined as: R={(x,y):y=2x,x,y in N}. Is R a function from N xxN ? If yes find the domain, co-domain and range of R.

Let A = {1,2,3,4,5,6} and R be the relation defined on A by R = {(x, y): x, y in A, x divides y}, then range of R is

Let X={1,\ 2,\ 3,\ 4,\ 5,\ 6,\ 7,\ 8,\ 9} , Let R_1 be a relation on X given by R_1={(x ,\ y): x-y is divisible by 3} and R_2 be another relation on X given by R_2={(x ,\ y):{x ,\ y}sub{1,\ 4,\ 7} or {x ,\ y}sub{2,\ 5,\ 8} or {x ,\ y}sub{3,\ 6,\ 9}}dot Show that R_1=R_2 .

Let R be a relation defined on the set of natural numbers N as R={(x , y): x , y in N ,2x+y=41} Find the domain and range of R. Also, verify whether R is (i) reflexive, (ii) symmetric (iii) transitive.

Let R be a relation defined on the set of natural numbers N as R={(x ,\ y): x ,\ y in N ,\ 2x+y=41} Find the domain and range of R . Also, verify whether R is (i) reflexive, (ii) symmetric (iii) transitive.