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From the identity <math>f(0)-(V_{0}^{x})^{1/2} = f(x) \forall x\in[0,1]</math> we notice that <math>V</math> is a positive and increasing function, therefore, <math>f</math> is decreasing. Hence <math>f(x)-f(0)=-V_{0}^{x})</math>.
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From the identity <math>f(0)-(V_{0}^{x})^{1/2} = f(x)</math>  <math>\forall x\in[0,1]</math> we notice that <math>V</math> is a positive and increasing function, therefore, <math>f</math> is decreasing. Hence <math>f(x)-f(0)=-V_{0}^{x})</math>.
  
 
We then have <math>V_{0}^{x}=(V_{0}^{x})^{2}</math>
 
We then have <math>V_{0}^{x}=(V_{0}^{x})^{2}</math>
  
 
It means that there is a point <math>a</math> in <math>[0,1]</math> such that <math>V</math> jumps from <math>0</math> to <math>1</math> right after the point. (It has to occur like that in order to fulfill the identity.)
 
It means that there is a point <math>a</math> in <math>[0,1]</math> such that <math>V</math> jumps from <math>0</math> to <math>1</math> right after the point. (It has to occur like that in order to fulfill the identity.)

Revision as of 09:29, 22 July 2008

From the identity $ f(0)-(V_{0}^{x})^{1/2} = f(x) $ $ \forall x\in[0,1] $ we notice that $ V $ is a positive and increasing function, therefore, $ f $ is decreasing. Hence $ f(x)-f(0)=-V_{0}^{x}) $.

We then have $ V_{0}^{x}=(V_{0}^{x})^{2} $

It means that there is a point $ a $ in $ [0,1] $ such that $ V $ jumps from $ 0 $ to $ 1 $ right after the point. (It has to occur like that in order to fulfill the identity.)

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang