Let f
f
be the function given by f(x)=∣∣x2−3∣∣⋅(x+0.5)(x2−3)(x+0.5)
f
(
x
)
=
|
x
2
−
3
|
⋅
(
x
+
0.5
)
(
x
2
−
3
)
(
x
+
0.5
)
. On which of the following open intervals is f
f
continuous?

The function f(x)=∣x^2−3∣*(x+0.5)*(x^2−3)*(x+0.5) is composed by the multiplication of 4 parts. The first one, ∣x^2−3∣, is continuous for all real numbers because is composed by h(g(x)) = |g(x)| and g(x) = x^2−3 where both are continuous for all real numbers. The other 3 parts are the polynomials (x+0.5), (x^2−3) and (x+0.5); all polynomials is continuous for all real numbers. So, f(x), the multiplication of these continuous functions, is in consequence continuous on all subsets of real numbers.

Let f f be the function given by f(x)=∣∣x2−3∣∣⋅(x+0.5)(x2−3)(x+0.5) f ( x ) = | x 2 − 3 | ⋅ ( x + 0.5 ) ( x 2 − 3 ) ( x + 0.5 ) . On which of the following open intervals is f f continuous?

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Let f
f
be the function given by f(x)=∣∣x2−3∣∣⋅(x+0.5)(x2−3)(x+0.5)
f
(
x
)
=
|
x
2
−
3
|
⋅
(
x
+
0.5
)
(
x
2
−
3
)
(
x
+
0.5
)
. On which of the following open intervals is f
f
continuous?