Respuesta :

calculista

we have

[tex]\left|x-5\right|=1[/tex]

Find the first solution (case positive)

[tex](x-5)=1[/tex]

Adds [tex]5[/tex] both sides

[tex](x-5)+5=1+5[/tex]

[tex]x=6[/tex]

Find the second solution (case negative)

[tex]-(x-5)=1[/tex]

[tex]-x+5=1[/tex]

Adds [tex](x-1)[/tex] both sides

[tex]-x+5+x-1=1+x-1[/tex]

[tex]x=4[/tex]

therefore

the answer in the attached figure

Ver imagen calculista

Answer:

second number line represents the [X-5]=1.

Step-by-step explanation:

Given : [X-5]=1 .

To find : Which number line represents the solutions to [X-5]=1.

Solution : We have given that [X-5]=1.

We can se the value x-5 is inside the modulus it may be positive or negative.

So, we will do it by both cases.

1) (x - 5) = 1

On adding by 5 both sides.

x = 1+5 = 6

x = 6.

2) if -(x-5) = 1

remove parenthesis

-x +5 = 1

On subtracting by 5 both side

-x = -4

On dividing by -1 both side

x = 4.

So , x = 4, 6.

Therefore , second number line represents the [X-5]=1.

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