Let `f(x)=a x+ba n dg(x)=c x+d , a!=0.` Assume `a=1,b=2.` If `(fog)(x)=(gof)(x)` for all `x ,` what can you say about `ca n dd ?`

Let f(x)=ax+b and g(x)=cx+d,a!=0,c!=0 .Assume a=1,b=2 .If (fog)(x)=(gof)(x) for all x ,what can you say about c and d

Let f(x)=ax+b and g(x)=x+2,a,b in{1,2,3...,8} If (fog)(x)=(gof)(x) for all x then write the number of different possible values of a+b?

Let f(x)=x^2+x+1 and g(x)=sinx . Show that fog!=gof .

If f(x)=-1+|x-2|,0<=x<=4 and g(x)=2-|x|,-1<=x<=3 then find (fog)(x) and (gof)(x)

If f(x)=|x| and g(x)=[x] then value of fog (-(1)/(4))+ gof (-(1)/(4)) is

If f(x)=|x| and g(x)=[x] , then value of fog(-(1)/(4)) +gof (-(1)/(4)) is

If f(x)=x^(2),g(x)=2^x and (fog)(x)=(gof)(x) , then the values of x are

If f (x) =|x| and g (x)=[x], then value of fog (-(1)/(4)) + gof (-(1)/(4)) is

If f(x)=x^(2),g(x)=2^x and (fog)(x)=(gof)(x), then the values of x are

Let f(x)=[x] and g(x)=|x| . Find (gof)(5/3) fog(5/3)