Check my proof please











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Let $f,g:mathbb{R} -> mathbb{R}$ be two continuous,differentiable functions.Prove that if $f'(x)=g'(x)$ then $f(x)-g(x)=C$,where C is a real constant.

My proof: Suppose $f(x)-g(x) neq C$.

By differentiating the above we get that $f'(x)-g'(x) neq 0$,false.

I am not really sure if by differentiating $ neq$ still holds and this is why I am asking for your help.










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  • It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
    – user3482749
    Nov 18 at 10:44












  • I see. So how should I approach proving this then?
    – JustAnAmateur
    Nov 18 at 10:46










  • Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
    – user3482749
    Nov 18 at 10:55










  • The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
    – DonAntonio
    Nov 18 at 10:55












  • @JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
    – Marian G.
    Nov 18 at 13:57















up vote
-2
down vote

favorite












Let $f,g:mathbb{R} -> mathbb{R}$ be two continuous,differentiable functions.Prove that if $f'(x)=g'(x)$ then $f(x)-g(x)=C$,where C is a real constant.

My proof: Suppose $f(x)-g(x) neq C$.

By differentiating the above we get that $f'(x)-g'(x) neq 0$,false.

I am not really sure if by differentiating $ neq$ still holds and this is why I am asking for your help.










share|cite|improve this question






















  • It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
    – user3482749
    Nov 18 at 10:44












  • I see. So how should I approach proving this then?
    – JustAnAmateur
    Nov 18 at 10:46










  • Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
    – user3482749
    Nov 18 at 10:55










  • The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
    – DonAntonio
    Nov 18 at 10:55












  • @JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
    – Marian G.
    Nov 18 at 13:57













up vote
-2
down vote

favorite









up vote
-2
down vote

favorite











Let $f,g:mathbb{R} -> mathbb{R}$ be two continuous,differentiable functions.Prove that if $f'(x)=g'(x)$ then $f(x)-g(x)=C$,where C is a real constant.

My proof: Suppose $f(x)-g(x) neq C$.

By differentiating the above we get that $f'(x)-g'(x) neq 0$,false.

I am not really sure if by differentiating $ neq$ still holds and this is why I am asking for your help.










share|cite|improve this question













Let $f,g:mathbb{R} -> mathbb{R}$ be two continuous,differentiable functions.Prove that if $f'(x)=g'(x)$ then $f(x)-g(x)=C$,where C is a real constant.

My proof: Suppose $f(x)-g(x) neq C$.

By differentiating the above we get that $f'(x)-g'(x) neq 0$,false.

I am not really sure if by differentiating $ neq$ still holds and this is why I am asking for your help.







functions derivatives






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share|cite|improve this question











share|cite|improve this question




share|cite|improve this question










asked Nov 18 at 10:41









JustAnAmateur

92




92












  • It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
    – user3482749
    Nov 18 at 10:44












  • I see. So how should I approach proving this then?
    – JustAnAmateur
    Nov 18 at 10:46










  • Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
    – user3482749
    Nov 18 at 10:55










  • The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
    – DonAntonio
    Nov 18 at 10:55












  • @JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
    – Marian G.
    Nov 18 at 13:57


















  • It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
    – user3482749
    Nov 18 at 10:44












  • I see. So how should I approach proving this then?
    – JustAnAmateur
    Nov 18 at 10:46










  • Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
    – user3482749
    Nov 18 at 10:55










  • The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
    – DonAntonio
    Nov 18 at 10:55












  • @JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
    – Marian G.
    Nov 18 at 13:57
















It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
– user3482749
Nov 18 at 10:44






It does hold, in this situation. Unfortunately, that's exactly the result that you're trying to prove. For a hint, notice that the result is false if the domain is not connected, so your proof will have to use the connectedness of $mathbb{R}$ at some point.
– user3482749
Nov 18 at 10:44














I see. So how should I approach proving this then?
– JustAnAmateur
Nov 18 at 10:46




I see. So how should I approach proving this then?
– JustAnAmateur
Nov 18 at 10:46












Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
– user3482749
Nov 18 at 10:55




Since differentiation is linear, (f-g)' = f' - g' = 0. Thus, you just need to prove that if a function has zero derivative, then it is constant.
– user3482749
Nov 18 at 10:55












The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
– DonAntonio
Nov 18 at 10:55






The result is true if $;f'(x)=g'(x);$ for some $;xin I;,;;I = $ a *non-trivial (open) interval*. Otherwise it is false, of course. For the proof: do you already know that $;h'(x)=0;$ for all values in some non-trivial interval , iff $;h;$ is a constant on that interval ?
– DonAntonio
Nov 18 at 10:55














@JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
– Marian G.
Nov 18 at 13:57




@JustAnAmateur Your statement is a simple consequence of the mean value theorem. E.g, see the following Wikipedia link - en.wikipedia.org/wiki/Mean_value_theorem#A_simple_application
– Marian G.
Nov 18 at 13:57















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