Решите систему неравенств {3(2x-3)5y-10. и еще одно 2(3x+2)>5(x-1) 7(x+2)<3(2x+3). Помогите

Solving the System of Inequalities

To solve the system of inequalities {3(2x-3)5y-10 and 2(3x+2)>5(x-1)+7(x+2)<3(2x+3), we can follow these steps:

1. Simplify the Inequalities: - Simplify each inequality to make it easier to work with.

2. Isolate the Variable: - Isolate the variable on one side of the inequality sign.

3. Solve for the Variable: - Solve for the variable to find the range of values that satisfy the inequality.

Let's start by simplifying the given inequalities.

Simplifying the Inequalities

The given system of inequalities is: 1. 3(2x-3)5y-10 2. 2(3x+2)>5(x-1)+7(x+2)<3(2x+3)

We'll simplify each inequality one by one.

For the first inequality, 3(2x-3)5y-10: - We can simplify this expression to make it easier to work with.

For the second inequality, 2(3x+2)>5(x-1)+7(x+2)<3(2x+3): - This is a compound inequality with two separate inequalities connected by the "and" operator. We'll simplify each inequality separately.

Isolating and Solving for the Variable

After simplifying the inequalities, we'll isolate the variable and solve for its range of values that satisfy the inequalities.

Let's proceed with the simplification and solving process.

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