Let f(x)=sinx and g(x)=(log)e|x| If the ...

Let `f(x)=sinx and g(x)=(log)_e|x|` If the ranges of the composition functions `fog and gof` are `R_1 and R_2,` respectively then (a) `R_1{u:-1 le u < 1}, R_2={v:-oo v < 0}` (b) `R_1={u:-oo < u < 0}, R_2={v:-oo < v < 0}` (c) `R_1={u:-1 < u < 1},R_1={v:-oo V le 0}`

Similar Questions

Explore conceptually related problems

Let f(x)=sin x and g(x)=(log)_(e)|x| If the ranges of the composition functions fog and gof are R_(1) and R_(2), respectively then (a)R_(1){u:-1<=u<1},R_(2)={v:-oo v<0}(b)R_(1)={u:-oo

Let f (x) = sin x and g(x) = log_(e)IxI . If the ranges of the composition functions fog and gof are R_1 and R_2 , respectively, then

Let f(x)=sin x and g(x)=In|x|. If the ranges of the composition functions fog and gof are R_(1), and R_(2) respectively,then

Let f(x) = sinx and g(x) = log|x| .If the ranges of composite functions fog and gof are R_1 and R_2 repsectively, then

f : R rarr R , f(x) = cos x and g : R rarr R , g(x) = 3x^(2) then find the composite functions gof and fog.

Let : R->R ; f(x)=sinx and g: R->R ; g(x)=x^2 find fog and gof .

Let f : R rarr R, f(x)=x^2 and g : R rarr R,g(x)=sinx be two given functions. Is gof=fog ?

Let f:R→R:f(x)=(x+1) and g:R→R:g(x)=(x^2−2) . Write down the formulae for (gof) .

Let f:R→R:f(x)=x^2 and g: R→R: g(x)=(x+1) . Show that (gof)≠(fog) .

Let `f(x)=sinx and g(x)=(log)_e|x|` If the ranges of the composition functions `fog and gof` are `R_1 and R_2,` respectively then (a) `R_1{u:-1 le u < 1}, R_2={v:-oo v < 0}` (b) `R_1={u:-oo < u < 0}, R_2={v:-oo < v < 0}` (c) `R_1={u:-1 < u < 1},R_1={v:-oo V le 0}`

Similar Questions

Recommended Questions