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ISI2014-DCG-33

in Calculus recategorized by
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Let $f(x)$ be a continuous function from $[0,1]$ to $[0,1]$ satisfying the following properties.

  1. $f(0)=0$,
  2. $f(1)=1$, and
  3. $f(x_1)<f(x_2)$ for $x_1 < x_2$ with $0 < x_1, \: x_2<1$.

Then the number of such functions is

  1. $0$
  2. $1$
  3. $2$
  4. $\infty$
in Calculus recategorized by
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Please check the editing again?
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by
Now, it is fixed.
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by
all series of polynomial functions? like x^2 , x^3 ?
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