How do you find the domain and range of $y = \sqrt{x^{2} - 1}$ $y = sqrt(x^2 - 1)$ ?

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How do you find the domain and range of $y = \sqrt{x^{2} - 1}$ $y = sqrt(x^2 - 1)$ ?

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Answer 1 · 2017-12-02T18:24:59

Range: $y \geq 0$ $y>=0$
Domain: $x \geq 1$ $x>=1$ and $x \leq - 1$ $x<=-1$

Explanation:

We can first consider the range, rather simply, we must consider all the values that $y$ $y$ can take on, but as we know $\sqrt{α} \geq 0$ $sqrt alpha >=0$ , $alpha in RR$ , or in other words, the square root of a value can never be negative for $x in RR$ , so hence $y>=0$

Now we can consider the domain, to what we can consider for what values of $x$ yields and valid value of $y$ , we know the valid values of $sqrt delta$ is where $delta >=0$ , so in this circumstance we must consider where $x^2-1 >=0$ we can sketch to find the values:
graph{x^2-1 [-3.538, 3.572, -1.437, 2.118]}

we can evidently see that where $x^2-1 >= 0$ is for $x>=1$ and $x<=-1$

So hence the domain is; $x>=1 and x<=-1$

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How do you find the domain and range of $y = \sqrt{x^{2} - 1}$ $y = sqrt(x^2 - 1)$ ?

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Explanation:

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How do you find the domain and range of y = sqrt(x^2 - 1)y=√x2−1y = sqrt(x^2 - 1)?

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How do you find the domain and range of $y = \sqrt{x^{2} - 1}$ $y = sqrt(x^2 - 1)$ ?