1) 2x-(x-3)>-4(x+2)+5x 2) 6(x-1)+5<2x-3

Sure, I can help you solve these inequalities:

1. $2x - (x - 3) > -4(x + 2) + 5x$

First, let's simplify the expressions on both sides of the inequality:

$2x - x + 3 > -4x - 8 + 5x$

Simplify further:

$x + 3 > x - 8$

Subtract $x$ from both sides:

$3 > -8$

This is a true statement. Since $3 > -8$ is always true, the original inequality $2x - (x - 3) > -4(x + 2) + 5x$ is also true for all values of $x$.

2. $6(x - 1) + 5 < 2x - 3$

Let's simplify the expressions on both sides of the inequality:

$6x - 6 + 5 < 2x - 3$

Combine the constants:

$6x - 1 < 2x - 3$

Subtract $2x$ from both sides:

$4x - 1 < -3$

Subtract 1 from both sides:

$4x < -2$

Now, divide both sides by 4 (remember to reverse the inequality since you're dividing by a negative number):

$x < -\frac{1}{2}$

So, the solution for the inequality $6(x - 1) + 5 < 2x - 3$ is $x < -\frac{1}{2}$.

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