If f(x) has a property that f(2-x) = f(2+x) for all x and f(x) has exactly 4 real zeros, how do you find their sum?

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If f(x) has a property that f(2-x) = f(2+x) for all x and f(x) has exactly 4 real zeros, how do you find their sum?

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Answer 1 · 2016-07-24T09:49:27

8

Explanation:

Since $f (2 - x) = f (2 + x)$ $f(2-x)=f(2+x)$ for all $x$ $x$ , we must have $f (t) = f (4 - t)$ $f(t) = f(4-t)$ for all $t$ $t$ .

Let $a$ $a$ be one of the real roots, then $f (a) = f (4 - a) = 0$ $f(a)=f(4-a)=0$ , so that $4 - a$ $4-a$ must be another real zero. (This works even if $a = 2$ $a=2$ , in which case $4 - a = 2$ $4-a=2$ is to be counted as another of the real roots,and 2 must be a double root). If $b$ $b$ is a root different from both $a$ $a$ and $4 - a$ $4-a$ , then $4 - b$ $4-b$ must be the fourth zero (it is easy to check that this is different from either $a$ $a$ or $4 - a$ $4-a$ ).

So, each pair of zeroes add up to 4, and the sum of all four is 8.

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If f(x) has a property that f(2-x) = f(2+x) for all x and f(x) has exactly 4 real zeros, how do you find their sum?

1 Answer

Explanation:

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