How do you find the domain of $h(x)=sqrt(4-x)+sqrt(x^2-1)$ ?

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How do you find the domain of $h(x)=sqrt(4-x)+sqrt(x^2-1)$ ?

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Answer 1 · 2016-01-06T14:44:48

Domain of $h(x)$ $=(-oo,-1]uu[1,4]$

Explanation:

Domain is all possible allowable $x$ value inputs.

There are generally 2 cases that are not allowed in real functions :

Even square roots of negative numbers. (Not defined in $RR$ ).
Division by zero. (Not defined at all).

In this case there are no divisions (denominators) in $h(x)$ so we only consider case 1 of the square roots not allowed to be negative.
Doing so, it becomes clear that the first term is only negative if $x>4$ and the second term is only negative if $x<1$ .

So #

Hence the domain is ${x in RR | -oo < x<= 1 and 1 <= x <= 4}$

$=(-oo,-1]uu[1,4]$ .

The graph makes it clear :

graph{sqrt(4-x)+sqrt(x^2-1) [-7.28, 10.5, -1.93, 6.95]}

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How do you find the domain of $h(x)=sqrt(4-x)+sqrt(x^2-1)$ ?

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