For xvarepsilon R , x!=0,x!=1, Let f0(x)...

For x`varepsilon R , x!=0,x!=1,` Let `f_0(x) = 1/(1-x) ` and `f_(n+1)(x) = f_0(f_n(x))`, n=0,1,2,3.... Then the value of `f_(100)(3) + f_1(2/3)+f_2(3/2)` is equal to:

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For x`varepsilon R , x!=0,x!=1,` Let `f_0(x) = 1/(1-x) ` and `f_(n+1)(x) = f_0(f_n(x))`, n=0,1,2,3.... Then the value of `f_(100)(3) + f_1(2/3)+f_2(3/2)` is equal to:

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