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4. Solving Inequalities with Absolute Values

For inequalities involving absolute values ie. |x|, we use the following relationships, for some number n:

If `|f(x)| > n`, then this means:

`f(x) < -n` or `f(x) > n`

If `|f(x)| < n`, then this means:

`-n < f(x) < n`

Example 1

Solve the inequality |x − 3| < 2.

Answer

Applying the relationships discussed above:

`- 2 < x - 3 < 2`

Adding `3` to all sides, we get:

`-2 + 3 < x - 3 + 3 < 2 + 3`

`1 < x < 5`

Here is the graph of our solution:

Convince yourself that this answer is correct by checking. Try `x = 0` (should fail, because it is outside the range of our answer), `x = 3` (should work) and `x = 10` (should fail). Every time you check like this, it becomes clearer why we solve it this way.

Example 2

Solve the inequality |2x − 1| > 5.

Answer

Applying the relationships discussed earlier:

`2x - 1 < -5 \ or \ 2x - 1 > 5`

Solving both inequalities, we get:

`2x < -5 + 1` or `2x > 5 + 1`
`2x < -4` or `2x > 6`
`x < -2 ` or `x > 3 `

Here's the graph of our solution:

Example 3

Solve the inequality `2|(2x)/3 + 1|>=4`

Answer

`2|(2x)/3 + 1|>=4`

This gives

`|(2x)/3 + 1|>=2`

So either...

`(2x)/3+1<=-2`

OR

`(2x)/3+1>=2`

Multiply both sides by 3

`2x + 3 ≤ -6 `

`2x ≤ -9`

`x<=-9/2`

OR

`2x + 3 ≥ 6 `

`2x ≥ 3`

`x>=3/2`

Solution: `x<=-9/2 = -4.5,\ "or"\ x>=3/2=1.5`

Here's the graph of our solution:

Example 4

Solve the inequality `|3 − 2x| < 3`

Answer

`|3 − 2x| < 3`

`-3 < 3 - 2x < 3`

Subtract `3` from all sides:

`-6 < -2x < 0`

Divide all sides by `-2`

`3 > x > 0`

(note the change in sense due to dividing by a negative number)

A better way to write this is: `0 < x < 3`, since we usually have smaller numbers on the left hand side.

Here's the solution graph:

Example 5

A technician measures an electric current which is `0.036\ "A"` with a possible error of `±0.002\ "A"`. Write this current, i, as an inequality with absolute values.

Answer

The possible error of `± 0.002\ "A"` means that the difference between the actual current and the value of `0.036\ "A"` cannot be more than `0.002\ "A"`.

So the values of i we have can be expressed as:

`0.034 ≤ i ≤ 0.038`

We can simply write this as:

`|i − 0.036 | ≤ 0.002`

Here's the solution graph:

Exercises

1. Solve ` |5 − x| ≤ 2`

Answer

`-2 ≤ 5 - x ≤ 2`

`-7 ≤ - x ≤ -3`

`7 ≥ x ≥ 3`

It is better to write this as: `3 ≤ x ≤ 7`.

Here's the graph of the solution:

2. Solve `|(2x-9)/4|<1`

Answer

`-1<(2x-9)/4<1`

`-4<2x-9<4`

`5<2x<13`

`2.5<x<6.5`

3. Solve `|(4x)/3-5|>=7`

Answer

`|(4x)/3-5|>=7`

`(4x)/3-5<=-7` OR `(4x)/3-5>=7`

`4x-15<=-21`

`4x<=-6`

`x<=-1.5`

 

`4x-15>=21`

`4x>=36`

`x>=9`

So the solution is: `x ≤ -1.5` or `x ≥ 9`.

Here's the graph of the solution:

4. Solve `|x^2+3x-1|<3`

Answer

`-3<x^2+3x-1<3`

Now we need to break this up into 2 parts:

Left part

`-3<x^2+3x-1`

`0<x^2+3x+2`

`x^2+3x+2>0`

`(x+2)(x+1)>0`

Critical values for the left side are:

`x = -2 and x = -1`.

This gives:

`x < -2 and x > -1`.

Right part

`x^2+3x-1<3`

`x^2+3x-4<0`

`(x+4)(x-1)<0`

Critical values:

`x = -4` and `x = 1`

This gives:

`-4 < x < 1`

It's easier to graph these together on one axis to decide the final result:

These 3 regions intersect in the following 2 places:

This gives us our final solution: −4 < x < −2 and −1 < x < 1.

Remember to check numbers inside and outside the given solution region to make sure it works.

Tips, tricks, lessons, and tutoring to help reduce test anxiety and move to the top of the class.

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