Question

find all the rational numbers whose absolute value is greater than 5

Answer 1

Absolute value of an integer is the
numerical value of the integer 
regardless of its sign.
If ' x ' is an integer then its absolute 
value is denoted by l x l and is 
defined as
i) l x l = x if x is positive
ii) l x l = - x , if x is negative
iii) l x l = 0 , if x is zero
According to the problem,
Two rational numbers 1 ) 16/ 80
2) - 8 / 40 its absolute values are 1/5,
1 ) l 16 / 80 l = 16/ 80 = 1/ 5
2) l - 8 / 40 l = - ( - 8 / 40 ) = 8/ 40 = 1/5
I hope this will useful to you.

Answer 2

Answer:

Absolute value of an integer is the

numerical value of the integer  

regardless of its sign.

If ' x ' is an integer then its absolute  

value is denoted by l x l and is  

defined as

i) l x l = x if x is positive

ii) l x l = - x , if x is negative

iii) l x l = 0 , if x is zero

According to the problem,

Two rational numbers 1 ) 16/ 80

2) - 8 / 40 its absolute values are 1/5,

1 ) l 16 / 80 l = 16/ 80 = 1/ 5

2) l - 8 / 40 l = - ( - 8 / 40 ) = 8/ 40 = 1/5

I hope this will useful to you.