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What is the domain of the function [tex]y = \sqrt[3]{x - 1}[/tex]?

A. [tex]-\infty \ \textless \ x \ \textless \ \infty[/tex]

B. [tex]-1 \ \textless \ x \ \textless \ \infty[/tex]

C. [tex]0 \leq x \ \textless \ \infty[/tex]

D. [tex]1 \leq x \ \textless \ \infty[/tex]

Sagot :

GinnyAnsweridn
To determine the domain of the function [tex]\( y = \sqrt[3]{x - 1} \)[/tex], we need to understand the nature of the cube root function.

The cube root function [tex]\( y = \sqrt[3]{z} \)[/tex] is defined for all real numbers [tex]\( z \)[/tex]. This is because the cube root of any real number is also a real number. There are no restrictions on the input [tex]\( z \)[/tex] when taking its cube root.

Given the function [tex]\( y = \sqrt[3]{x - 1} \)[/tex], we can rewrite it in the form [tex]\( y = \sqrt[3]{z} \)[/tex] by letting [tex]\( z = x - 1 \)[/tex]. Since [tex]\( z \)[/tex] can be any real number, [tex]\( x - 1 \)[/tex] can also be any real number. Therefore, [tex]\( x \)[/tex] itself can be any real number.

In other words, there are no restrictions on [tex]\( x \)[/tex] for the function [tex]\( y = \sqrt[3]{x - 1} \)[/tex]. The function is defined for all real values of [tex]\( x \)[/tex].

Thus, the domain of the function [tex]\( y = \sqrt[3]{x - 1} \)[/tex] is:
[tex]\[ -\infty < x < \infty \][/tex]

So, the correct answer is:
[tex]\[ -\infty < x < \infty \][/tex]
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