Use the number line to determine the absolute value. Enter the value, as a mixed number in simplest form, in the box. ∣∣−2 2/3∣∣ = Pleasee help will give brainliest! 

Use the number line to determine the absolute value Enter the value as a mixed number in simplest form in the box 2 23 Pleasee help will give brainliest class=
Use the number line to determine the absolute value Enter the value as a mixed number in simplest form in the box 2 23 Pleasee help will give brainliest class=

Respuesta :

Absolute value is a term which is used to indicate the distance of a point or number from the origin of a number line or coordinate system.

Suppose x is a real number. Then the absolute value of x is defined as follows:

For x = 0 or x > 0, | x | = x

For x < 0, | x | = - x

Now, we have to find the absolute value of the given number [tex]\left \| -2\frac{2}{3} \right \|[/tex] that means we have to find the distance of [tex]\left \| -2\frac{2}{3} \right \|[/tex]  from the origin of a number line.

Distance of [tex]-2\frac{2}{3}[/tex] from the origin is [tex]2\frac{2}{3}[/tex] . As distance can never be negative.

Therefore, the absolute value of [tex]\left \| -2\frac{2}{3} \right \|[/tex] is [tex]2\frac{2}{3}[/tex] .

Answer:

he or she is right {Absolute value is a term which is used to indicate the distance of a point or number from the origin of a number line or coordinate system.

Suppose x is a real number. Then the absolute value of x is defined as follows:

For x = 0 or x > 0, | x | = x

For x < 0, | x | = - x

Now, we have to find the absolute value of the given number  that means we have to find the distance of   from the origin of a number line.

Distance of  from the origin is  . As distance can never be negative.

Therefore, the absolute value of  is  .

Step-by-step explanation:

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