Absolute value equations result in two answers
This brings up a really important point: absolute value equations give us two answers. |x| = 20? x is 20 or -20. |x| = 1,000? x is 1,000 or -1,000. |x| = -5,000? x equals 5,000 or negative - wait! Absolute values can't be negative numbers, so no matter what I plug in for x, there's no way I'm going to get -5,000. So anytime an absolute value is set equal to a negative number, there is no solution.
Splitting an Equation into Two
Let's take the difficulty up a bit now. What if it asks you to solve |x-5| = 20? Now it can be really tempting to simply undo the subtraction with addition because they're inverse operations. So we add 5 to both sides and we get |x| = 25 and then we say, 'hey, two answers! 25 and -25 and we're done.' But you can't forget that absolute value bars kind of act like parentheses, which means you have to do everything on the inside before you take the absolute value. So when you first add 5 to both sides like that, you're kind of breaking that rule, which means doing that is a big no-no. You can't do that.
So if we take a step back and look at the big picture and say, 'okay, we're going to do some stuff to our xhere, and after all that's done, we take the absolute value and get 20.' It's kind of like we can just cover up what's on the inside of the absolute value with our finger and say, 'I don't really care what's on the inside there; I take an absolute value when I get 20, which means that whatever is on the inside there must be equal to 20 or whatever is on the inside there must be equal to -20.'
After you split it up into two equations, then you can substitute back in what's on the inside of the bars by taking your finger away and saying, 'oh yeah, there's an x-5 there.' So x-5 = 20 or x-5 = -20, and those are the correct two equations we should end up with.
Solve for x to get the two answers for the problem
Now we can undo the subtraction with addition. Adding 5 to both sides gives us our two answers that x = 25 or x = -15. When you're solving equations, you can always check your answers by substituting them back into the original equation. I can do that here just to make sure I did everything okay. If I plug in 25, 25-5 is 20 and |20| stays the same and I get 20, so it checks out. I put in -15, -15-5 is -20. Now I take the absolute value, it turns positive again and it checks out as well so we know we got the right answer.
Just to remind us of another common misconception; when splitting up the equation into two separate ones, do not change it into x-5 = 20 or x+5 = 20. Again, absolute value bars do not change the operations going on inside of them, they only change the end result to be a positive number. So we still have to do the -5 and then after we do that, we change the number back. So changing it into two equations where one is a minus and one is a plus is another thing you've got to be careful not to do.
Lesson Summary
To review, absolute value equations give us two answers. Absolute values that equal negative numbers have no solution because absolute values are always positive. Absolute value equations with operations on the inside must be split up first before solving for the variable.
Print Lesson
Next Lesson
You are viewing lesson 3 in chapter 8 of the course:
GMAT Prep: Help and Review
24 chapters | 272 lessons
Ch
- Basic Arithmetic Calculations: Help...
Ch
- Rational Numbers: Help and...
Ch
- Decimals and Percents: Help and...
Ch
Data & Statistics: Help and...
Ch
- Basic Algebraic Expressions: Help and...
Ch
- Exponents: Help and Review
Ch
- Algebraic Linear Equations &...
Ch
- Algebra - Absolute Value Equations &...,