5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation
Step 1: Combine like terms
5x - 12 - 6x = -10x + 7 - 1
-1x - 12 = -10x + 6
Step 2: Get x-terms on same side of equation
-1x + 10x = 6 + 12
9x = 18
Step 3: Get constants on same side of equation
9x = 18
Step 4: Get the x by itself by using the inverse operation
Divide both sides by 9:
x = 18/9
Simplify:
x = 2
5x−12−6x=−10x+7−1
Step 1: Combine like terms Response area,
Step 2: Get x-terms on same side of equation Response area
Step 3: Get constants on same side of equation Response area
Step 4: Get the x by itself by using the inverse operation
Step 1: Combine like terms
5x - 12 - 6x = -10x + 7 - 1
(5x - 6x) - 12 = -10x + 6
(-1x) - 12 = -10x + 6
-1x - 12 = -10x + 6
Step 2: Get x-terms on same side of equation
-1x - 12 + 10x = -10x + 6 + 10x
(-1x + 10x) - 12 = 6
Step 3: Get constants on same side of equation
9x - 12 = 6
Step 4: Get the x by itself by using the inverse operation
Add 12 to both sides:
9x - 12 + 12 = 6 + 12
9x = 18
Divide both sides by 9:
9x/9 = 18/9
x = 2
Step 1: Combine like terms:
5x - 12 - 6x = -10x + 7 - 1 simplifies to:
(5x - 6x) - 12 = -10x + 6
Step 2: Get x-terms on the same side of the equation:
(5x - 6x) - 12 = -10x + 6 can be rewritten as:
-1x - 12 = -10x + 6
Step 3: Get constants on the same side of the equation:
-1x - 12 = -10x + 6 can be rewritten as:
-1x + 10x = 6 + 12
Step 4: Get the x by itself by using the inverse operation:
-1x + 10x = 6 + 12 simplifies to:
9x = 18
To isolate x, divide both sides of the equation by 9:
9x/9 = 18/9
x = 2