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26 votes
26 votes
This is a absolute value equality assignment how do I solve
2|x| -10 = 100 ?

User Davide Patti
by
3.0k points

2 Answers

10 votes
10 votes

Answer: x=55 or x=-55 (this is how it is usually how it is to be be written in the Cambridge syllabus or else you can write 'x=55,-55')

Explanation:

All you have to do is make ' |x|' the subject and then continue as normal simplifications by switching the - 10 to the other side in order to make ' |x|' the subject then when you switch the -10 to the other side it becomes positive 10 (+10)

2|x| -10 = 100

2|x| = 100+10

2|x| = 110

|x| = 110/2 ← (then you should lastly remove the two to make the

|x| = 55 ' |x|' the subject so it becomes division)

therefore x=55 or x=-55

A small note incase you have a confusion :)

and just incase you don't know what |x| means- it is the determinant. And the determinant is the denominator you get while getting the inverse of a matrix (
(1)/(55))

User AlexeySRG
by
2.3k points
19 votes
19 votes

Answer:

x = 55, x = -55

Explanation:

→ 2|x| -10 = 100

→ 2lxl = 100 + 10

→ lxl = 110/2

→ [ lxl = 55 ]

Now the absolute value of x will be,

→ lxl = 55

→ x = 55 (or) x = -55

Hence, the value of x is 55,-55.

User Leonardo Henriques
by
2.7k points
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