Non-Linear Function f(x) with f'(x1)=f'(x2)

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A non-linear function f(x) is sought where f'(x1) = f'(x2) for distinct x1 and x2. Suggestions include periodic functions and polynomials of degree higher than two. The derivative must not be injective, meaning multiple x-values can yield the same slope. The discussion highlights that functions like sin(x) and x^3 may not meet the specific tangent line condition at the given points. Overall, the focus is on identifying suitable non-linear functions that satisfy these derivative properties.
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Hi,

I am looking for a non-linear function f(x) such that f'(x1) = f'(x2) but x1 != x2.

Thanks,
Chen
 
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I guess sin(x) will do... :)
 
Although I wouldn't mind hearing other suggestions, I'm sure there are lots of functions that satisfy this requirement.

Thanks
 
Any function that is not injective has the quality that f(x_1) = f(x_2) does not imply that x_1 = x_2.

edited to add: oops I see he little ' now,, in this case you just need it so the derivative of the function is not injective.

So quickly f'(x) = 3x^2 is not injective and f(x) = x^3 is non-linear.
 
Last edited:
Chen said:
Although I wouldn't mind hearing other suggestions, I'm sure there are lots of functions that satisfy this requirement.

Thanks
Here's a couple :
1) any periodic function,
2) any polynomial higher than a quadratic
 
Hmm, sorry I think I forgot to mention one thing. I tried to simplify the task, which is to find a non-linear function, so that its tangent line at (x1, f(x1)) is the same tangent line at (x2, f(x2)). So in that perspective, x^3 doesn't work.

Thanks :)
 

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