Question

How do you solve `(1/4)(3x + 2) ≤ (2/3)(-3 + 3x)`?

Answer 1

First notice that the right hand side can be rearranged as follows:

`(2/3)(-3+3x)`

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

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

`=2(x - 1)`

`=2x-2`

So we have:

`(1/4)(3x + 2) <= 2x - 2`

Multiply both sides by 4 to get:

`3x + 2 <= 8x - 8`

Add 8 to both sides to get:

`3x + 10 <= 8x`

Subtract `3x` from both sides to get:

`10 <= 5x`

Divide both sides by 5 to get:

`2 <= x`

Or to put it another way:

`x >= 2`