Let the function f and g be defined by ,
`f={(a,b),(c,e),(d,a)}` and
`g= {(b,c),(e,a),(a,c)}`
Show that ,(g o f ) and (f o g) are both defined. Also find (g o f) and (f o g) as sets of ordered pairs.

Let the functions f and g be defined by, f={(1,2),(3,-2),(-1,1)} and g={(2,3),(-2,1),(1,3)} Prove that , (g o f) and ( f o g) are both defined . Also find (g o f) and (f o g) as sets of ordered pairs.

Let the functions f and g be defined by, f={(1,2),(2,3),(3,4),(4,1)} and g={(2,-1),(4,2),(1,-2),(3,4)} Show that, (g o f) is defined but (f o g) is not defined . Also find ( g o f) as set of ordered pairs.

Let the function f:RR rarr RR and g:RR be defined by f(x) = sin x and g(x)=x^(2) . Show that, (g o f) ne (f o g) .

Let the functions f and g on the set of real numbers RR be defined by, f(x)= cos x and g(x) =x^(3) . Prove that, (f o g) ne (g o f).

Let the function f:RR rarr RR be defined by , f(x)=4x-3 .Find the function g:RR rarr RR , such that (g o f) (x)=8x-1

Let the functions f: RR rarr RR and g: RR rarr RR be defined by f(x)=x+1 and g(x)=x-1 Prove that , (g o f)=(f o g)=I_(RR)

Let the function f:RR rarr RR and g: RR rarr RR be defined by f(x)=x^(2) and g(x)=x+3, evaluate (f o g) (2) , (ii) (g o f) (3)

Let the functions f: QQ rarr QQ and g: QQ rarr QQ be defined by, f(x)=3x and g(x)=x+3 . Assuming that f and g are both invertible , verify that , ( g o f) ^(-1) =(f^(-1) o g ^(-1)) .

Let the function f:RR rarr RR be defined by , f(x)=3x-2 and g(x)=3x-2 (RR being the set of real numbers), then (f o g)(x)=

Let Q be the set of rational numbers and f:QQ rarr QQ be defined by , f(x)=3x-2, find g:QQ rarr QQ , such that (g o f) = I_(QQ) .