Why is sin(x^2) not a periodic function?

Question

Why is sin(x^2) not a periodic function?

2 Answers

Impact of this question

19672 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2018-03-19T03:59:46

While $sin (x)$ $sin(x)$ repeats every time $x$ $x$ changes by a fixed amount ( $2 π$ $2pi$ ), $sin (x^{2})$ $sin(x^2)$ repeats only when $x^{2}$ $x^2$ changes by $2 π$ $2pi$ , and this does not happen at uniform intervals of $x$ $x$ .

Explanation:

For a function $f (x)$ $f(x)$ to be periodic with a period $X$ $X$ , we must have

$f(x+X)=f(x) qquad forall x$

This immediately implies that $f(x), f(x+X), f(x+2x), f(x+3X),...$ etc. all have the same value. So, a periodic function of $x$ repeats after equally spaced values of $x$ .

Now, $sin(x^2)$ attains the value 0, for example, when $x^2$ attains the values 0, $pi$ , $2pi$ , $3pi$ , etc. While these values are equally spaced, the corresponding $x$ values are 0, $sqrt(pi)$ , $sqrt(2pi)$ , $sqrt(3pi)$ etc. - and these are not equally spaced.

Answer 2 · 2018-03-19T03:59:46

While $sin(x)$ repeats every time $x$ changes by a fixed amount ( $2pi$ ), $sin(x^2)$ repeats only when $x^2$ changes by $2pi$ , and this does not happen at uniform intervals of $x$ .

Explanation:

For a function $f(x)$ to be periodic with a period $X$ , we must have

$f(x+X)=f(x) qquad forall x$

This immediately implies that $f(x), f(x+X), f(x+2x), f(x+3X),...$ etc. all have the same value. So, a periodic function of $x$ repeats after equally spaced values of $x$ .

Now, $sin(x^2)$ attains the value 0, for example, when $x^2$ attains the values 0, $pi$ , $2pi$ , $3pi$ , etc. While these values are equally spaced, the corresponding $x$ values are 0, $sqrt(pi)$ , $sqrt(2pi)$ , $sqrt(3pi)$ etc. - and these are not equally spaced.

Science

Math

Humanities

... and beyond

Why is sin(x^2) not a periodic function?

2 Answers

Explanation:

Explanation:

Related questions

Impact of this question