Question

If `f_1(x)=-((2x+7)/(x+3)), f_(n+1)(x)=f_1(f_n(x))` then `f_2001(2002)` is?

Answer 1

`2002`.

Explanation:

We have, `f_1(x)=-((2x+7)/(x+3)), and, f_1(f_n(x))=f_(n+1)(x)`.

Observe that, `f_1(x)=-((2x+7)/(x+3))=-((2x+6+1)/(x+3))`

`=-((2x+6)/(x+3)+1/(x+3))`.

`rArr f_1(x)=-(2+1/(x+3))=-2-1/(x+3)`

`:. f_2(x)=f_1(f_1(x))`

`=f_1(-2-1/(x+3))=f_1(y)," say, "y=-2-1/(x+3)`,

`=-2-1/(y+3)=-2-1/(-2-1/(x+3)+3)`,

`=-2-1/(1-1/(x+3))=-2-(x+3)/(x+3-1)`,

`=-2-(x+3)/(x+2)=-2-(x+2+1)/(x+2)`,

`=-2-((x+2)/(x+2)+1/(x+2))`

`rArr f_2(x)=-3-1/(x+2)`.

`:. f_3(x)=f_1(f_2(x))`,

`=f_1(t)," say, where, "t=f_2(x)=-3-1/(x+2)`,

`=-2-1/(t+3)`,

`=-2-1/(-3-1/(x+2)+3)=-2-1/(-1/(x+2))=-2+x+2`.

`rArr f_3(x)=x`.

Clearly, then, `f_6(x)=f_9(x)=...=f_(3m)(x)=x, AA m in NN`.

Since, `2001=3(667)`, we have,

`f_2001(x)=x, & therefore, f_2001(2002)=2002`.

`color(magenta)("Enjoy Maths.!")`