Question

How do you solve `4 - |3k+1| <2`?

Answer 1

`k<-1`
`k>1/3`

Explanation:

To make the absolute positive multiply everything by (-1). Note that this turns the inequality sign round the other way. So now we have:

`-4+|3k+1| > -2`

Add 4 to both sides

`|3k+1| >+2`

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There are what I will call 'trigger' values that this condition relates to.

Lets determine these 'trigger' values.

Set `|3k+1|=2` this is the same as `|+-2|=2`

So the 'trigger' values are such that
`3k+1=-2 " "=>" " k= -3/3=-1`
`3k+1=+2" "=>" "k=1/3`

so we have `|"increasingly negative"|>2=> k<-1`

and we have `|"increasingly positive"|>2=>k>1/3`