Solution - Absolute value equations

$$3x+3·2=2·\left(x-4\right)$$

Simplify the arithmetic:

$$3x+6=2·\left(x-4\right)$$

Expand the parentheses:

$$3x+6=2x+2·-4$$

Simplify the arithmetic:

$$3x+6=2x-8$$

Subtract $$$$ from both sides:

$$\left(3x+6\right)-2x=\left(2x-8\right)-2x$$

Group like terms:

$$\left(3x-2x\right)+6=\left(2x-8\right)-2x$$

Simplify the arithmetic:

$$x+6=\left(2x-8\right)-2x$$

Group like terms:

$$x+6=\left(2x-2x\right)-8$$

Simplify the arithmetic:

$$x+6=-8$$

Subtract $$$$ from both sides:

$$\left(x+6\right)-6=-8-6$$

Simplify the arithmetic:

$$x=-8-6$$

Simplify the arithmetic:

$$x=-14$$

$$3x+3·2=2·\left(-\left(x-4\right)\right)$$

Simplify the arithmetic:

$$3x+6=2·\left(-\left(x-4\right)\right)$$

Expand the parentheses:

$$3x+6=2·\left(-x+4\right)$$

$$3x+6=2·-x+2·4$$

Group like terms:

$$3x+6=\left(2·-1\right)x+2·4$$

Multiply the coefficients:

$$3x+6=-2x+2·4$$

Simplify the arithmetic:

$$3x+6=-2x+8$$

Add $$$$ to both sides:

$$\left(3x+6\right)+2x=\left(-2x+8\right)+2x$$

Group like terms:

$$\left(3x+2x\right)+6=\left(-2x+8\right)+2x$$

Simplify the arithmetic:

$$5x+6=\left(-2x+8\right)+2x$$

Group like terms:

$$5x+6=\left(-2x+2x\right)+8$$

Simplify the arithmetic:

$$5x+6=8$$

Subtract $$$$ from both sides:

$$\left(5x+6\right)-6=8-6$$

Simplify the arithmetic:

$$5x=8-6$$

Simplify the arithmetic:

$$5x=2$$

Divide both sides by :

$$\frac{\left(5x\right)}{5}=\frac{2}{5}$$

Simplify the fraction:

$$x=\frac{2}{5}$$