Q: For | x | > 8, which one of the following answers must be true?
UNANSWERED.
The correct answer is E.
A:
Absolute value means the distance from 0. So, for example, | 10 | is 10, but | -10 | is also 10. On a number line both 10 and -10 are 10 away from 0.
In our problem | x | > 8, if we test out x = 10, we see it works: | 10 | > 8 10 > 8
Since we know that x can equal 10, let's try it out in the answers.
A. x > -8 10 > -8 TRUE
B. x > 8 10 > 8 TRUE
C. x < -8 10 < -8 FALSE, so C can't be the correct answer
D. x2 < 64 10 2 < 64 100 < 64 FALSE, so D can't be the correct answer
E. x2 > 64 10 2 > 64 100 > 64 TRUE
Since C and D were elimated, only A, B, and E are possible answers.
If we test out x = -10, it's also a valid number for the inequality: | x | > 8, | -10 | > 8 10 > 8
Let's try x = -10 in the remaining possible answers A, B, and E.
A. x > -8 -10 > -8 FALSE
B. x > 8 -10 > 8 FALSE
E. x2 > 64 (-10) 2 > 64 100 > 64 TRUE
E is the only possible answer that works for x = 10 or -10.
More detailed explanation:
Above we showed that x = 10 or -10 can work in | x | > 8.
We can try out larger numbers for x like 9, 11, etc, then we see all numbers larger than 8 are valid in | x | > 8. Similarly we can try out numbers smaller than -8 and see that they work too. So far, we know that x > 8 or x < -8.
Let's test a number in the middle of the number line: If x = 0, | x | > 8 | 0 | > 8 0 > 8 So 0 is not a valid number. In fact, all the numbers between -8 and 8 are not valid. 8 and -8 are not valid because the problem | x | > 8 has a > sign not a ≥ . The number line for | x | > 8 looks like the picture below:
