How do you find the domain and range of $(x^2-x-12)^-(1/4)$ ?

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How do you find the domain and range of $(x^2-x-12)^-(1/4)$ ?

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Answer 1 · 2017-08-23T06:31:10

See explanation.

Explanation:

The function can be written as:

$f(x)=1/(root(4)(x^2-x-12))$

To find the domain of rhis function we have to think of the set of arguments ( $x$ ), for which the function's value is defined.

This function is defined for those values of $x$ , fior which

$x^2-x-12 >0$

$Delta=(-1)^2-4-1*(-12)=1+48=49$

$sqrt(Delta)=7$

$x_1=(1-7)/2=-3$

$x_2=(1+7)/2=4$

graph{x^2-x-12 [-32.48, 32.47, -16.24, 16.24]}

From the graph we can see that the domain is:

$D=(-oo;-3) uu (4;+oo)$

To find the range we have to analyze the end behaviour of the function.

If $x$ goes to $-3$ from the left side or to $4$ from the right side, then the denominator goes to zero, so the function's value goes to $+oo$

If $x$ goes to $+oo$ and $-oo$ then $f(x)$ goes to zero, so the function's range is:

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How do you find the domain and range of $(x^2-x-12)^-(1/4)$ ?

1 Answer

Explanation:

$f(x)=1/(root(4)(x^2-x-12))$

$x^2-x-12 >0$

$R=(0;+oo)$

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How do you find the domain and range of (x^2-x-12)^-(1/4)(x^2-x-12)^-(1/4)?

1 Answer

Explanation:

f(x)=1/(root(4)(x^2-x-12))f(x)=1/(root(4)(x^2-x-12))

x^2-x-12 >0x^2-x-12 >0

R=(0;+oo)R=(0;+oo)

Related questions

Impact of this question

How do you find the domain and range of $(x^2-x-12)^-(1/4)$ ?

$f(x)=1/(root(4)(x^2-x-12))$

$x^2-x-12 >0$

$R=(0;+oo)$