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Modulus Function

Let fx = |x2 ...

Question

Let $f (x) = | x^{2} - 9 | - | x - a |,$ then number of integers in the range of $a$ so that $f (x) = 0$ has 4 distinct real roots, is

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Solution

$| x^{2} - 9 | = | x - a |$

For tangent $\to x^{2} - 9 = x - a$
$↓$
D = 0
$a = \frac{37}{4}$
Similarly $a = - \frac{37}{4}$ for left tangent
So for 4 distinct solution.
$a \in (\frac{- 37}{4}, - 3) \cup (- 3, 3) \cup (3, \frac{37}{4})$
So total number of integers = 17.

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