Proving $Phi$ is differentiable and find $D Phi$











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Let $E = { f : [0,1] to mathbb{R} : f(0)=0 , f $ is continuously differential$ }$



With $||f|| = sup_{t in [0,1]} |f'(t)|$ and Let $Phi(f)(t) = int limits_{0}^{t} f(u)du$ with $||f|| = sup_{t in [0,1]} |f(t)|$,



prove that $Phi$ is differentiable and compute $DPhi$ ?



I need hint make sense of the question, like the limits is over real numbers or function that there norm tends to zero.










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  • $Phi(f+h)(t)=ldots$
    – Fakemistake
    Nov 17 at 13:18










  • $Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
    – Ahmad
    Nov 17 at 13:19

















up vote
0
down vote

favorite












Let $E = { f : [0,1] to mathbb{R} : f(0)=0 , f $ is continuously differential$ }$



With $||f|| = sup_{t in [0,1]} |f'(t)|$ and Let $Phi(f)(t) = int limits_{0}^{t} f(u)du$ with $||f|| = sup_{t in [0,1]} |f(t)|$,



prove that $Phi$ is differentiable and compute $DPhi$ ?



I need hint make sense of the question, like the limits is over real numbers or function that there norm tends to zero.










share|cite|improve this question






















  • $Phi(f+h)(t)=ldots$
    – Fakemistake
    Nov 17 at 13:18










  • $Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
    – Ahmad
    Nov 17 at 13:19















up vote
0
down vote

favorite









up vote
0
down vote

favorite











Let $E = { f : [0,1] to mathbb{R} : f(0)=0 , f $ is continuously differential$ }$



With $||f|| = sup_{t in [0,1]} |f'(t)|$ and Let $Phi(f)(t) = int limits_{0}^{t} f(u)du$ with $||f|| = sup_{t in [0,1]} |f(t)|$,



prove that $Phi$ is differentiable and compute $DPhi$ ?



I need hint make sense of the question, like the limits is over real numbers or function that there norm tends to zero.










share|cite|improve this question













Let $E = { f : [0,1] to mathbb{R} : f(0)=0 , f $ is continuously differential$ }$



With $||f|| = sup_{t in [0,1]} |f'(t)|$ and Let $Phi(f)(t) = int limits_{0}^{t} f(u)du$ with $||f|| = sup_{t in [0,1]} |f(t)|$,



prove that $Phi$ is differentiable and compute $DPhi$ ?



I need hint make sense of the question, like the limits is over real numbers or function that there norm tends to zero.







real-analysis multivariable-calculus






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asked Nov 17 at 13:11









Ahmad

2,4831625




2,4831625












  • $Phi(f+h)(t)=ldots$
    – Fakemistake
    Nov 17 at 13:18










  • $Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
    – Ahmad
    Nov 17 at 13:19




















  • $Phi(f+h)(t)=ldots$
    – Fakemistake
    Nov 17 at 13:18










  • $Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
    – Ahmad
    Nov 17 at 13:19


















$Phi(f+h)(t)=ldots$
– Fakemistake
Nov 17 at 13:18




$Phi(f+h)(t)=ldots$
– Fakemistake
Nov 17 at 13:18












$Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
– Ahmad
Nov 17 at 13:19






$Phi(f+h)(t)$ = $Phi(f)(t) + Phi(h)(t)$ , but how does this helps ? @Fakemistake
– Ahmad
Nov 17 at 13:19












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Let $a,binmathbb{R}$, $Phi(af+bg)=aPhi(f)+bPhi(g)$. This implies that $Phi$ il linear and equal to its derivative.






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    1 Answer
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    up vote
    2
    down vote













    Let $a,binmathbb{R}$, $Phi(af+bg)=aPhi(f)+bPhi(g)$. This implies that $Phi$ il linear and equal to its derivative.






    share|cite|improve this answer

























      up vote
      2
      down vote













      Let $a,binmathbb{R}$, $Phi(af+bg)=aPhi(f)+bPhi(g)$. This implies that $Phi$ il linear and equal to its derivative.






      share|cite|improve this answer























        up vote
        2
        down vote










        up vote
        2
        down vote









        Let $a,binmathbb{R}$, $Phi(af+bg)=aPhi(f)+bPhi(g)$. This implies that $Phi$ il linear and equal to its derivative.






        share|cite|improve this answer












        Let $a,binmathbb{R}$, $Phi(af+bg)=aPhi(f)+bPhi(g)$. This implies that $Phi$ il linear and equal to its derivative.







        share|cite|improve this answer












        share|cite|improve this answer



        share|cite|improve this answer










        answered Nov 17 at 13:49









        Tsemo Aristide

        54.6k11444




        54.6k11444






























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