How to solve this???

-1-8(x+12)> -44-8x

-4(-12v-9)+6(-6+5v)> -4v+12v

Okay, so the first problem...

-1 - 8(x + 12) > -44 - 8x
-1 - 8x - 96 > -44 - 8x
-97 > -44
The above statement is FALSE; therefore, x has no solution....

Second prob...
-4(-12v - 9) + 6(-6 + 5v) > -4v + 12v
48v + 36 - 36 + 30v > 8v
78v > 8v
70v > 0
v > 0

Omg thanks herp_derp

To solve these equations, you need to apply the principles of algebra to simplify and isolate the variables on one side of the inequality sign.

Let's start with the first equation:
-1 - 8(x + 12) > -44 - 8x

1. Distribute the -8 to the terms inside the parentheses:
-1 - 8x - 96 > -44 - 8x

2. Combine like terms on both sides of the inequality:
-97 - 8x > -44 - 8x

3. Since we have -8x on both sides of the inequality, we can eliminate it by adding 8x to both sides:
-97 - 8x + 8x > -44 - 8x + 8x

-97 > -44

4. The resulting inequality, -97 > -44, is true. Therefore, the solution is all real numbers (or x can be any value).

Now let's work on the second equation:
-4(-12v - 9) + 6(-6 + 5v) > -4v + 12v

1. Simplify the expressions inside the parentheses:
48v + 36 + 36 - 30v > -4v + 12v

2. Combine like terms on both sides of the inequality:
48v - 30v + 36 + 36 > -4v + 12v

18v + 72 > 8v

3. To eliminate the variable on one side, subtract 8v from both sides:
18v + 72 - 8v > 8v - 8v

10v + 72 > 0

4. To isolate the variable, subtract 72 from both sides:
10v + 72 - 72 > 0 - 72

10v > -72

5. Finally, to solve for v, divide both sides by 10:
(10v)/10 > (-72)/10

v > -7.2

Therefore, the solution to the inequality is v > -7.2.