Question

asked Aug 13, 2023 29.2k views

2 Answers

George Sovetov · Answer 1 · 2023-08-14T04:51:26+0000

Answer:

0 < x < 6

Explanation:

This question asks to solve an inequality which can be written as:

√(x^2-6x+9) < 3

Solve for x:

$√(x^2-6x+9) < 3\\x^2-6x+9 < 9\\x^2-6x < 0\\x(x-6) < 0$

From here we can deduce that the inequality is
when:

x = 0 or
x = 6

We can write the solution as:

0 < x < 6

TheNotMe · Answer 2 · 2023-08-17T17:06:01+0000

$\qquad\qquad\huge\underline{{\sf Answer}}$

Let's evaluate ~

$\qquad \sf  \dashrightarrow \: \sqrt{ {x}^(2) - 6x + 9 }$

$\qquad \sf  \dashrightarrow \: \sqrt{ {x}^(2) - 3x - 3x+ 9 }$

$\qquad \sf  \dashrightarrow \: \sqrt{ {x}^{}(x - 3) - 3(x - 3) }$

$\qquad \sf  \dashrightarrow \: √( (x - 3)(x - 3) )$

$\qquad \sf  \dashrightarrow \: \sqrt{ (x - 3) {}^(2) }$

$\qquad \sf  \dashrightarrow \: { (x - 3) {}^{} }$

Now, we have been given that value of x :

$\qquad \sf  \dashrightarrow \:x < 3$

So, let's plug the value of x as 3 in the given expression ~

$\qquad \sf  \dashrightarrow \:3 - 3$

$\qquad \sf  \dashrightarrow \:0$

Therefore, we can conclude that :

$\qquad \sf  \dashrightarrow \: \sqrt{ {x}^(2) - 6x + 9 } < 0$

Value of the expression should be less than 0

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