Short-Question

# What is the solution set for this inequality?

## What is the solution set for this inequality?

The solution set of an inequality is the set of all solutions. Typically an inequality has infinitely many solutions and the solution set is easily described using interval notation. The solution set of example 1 is the set of all x <= 7.

## What is the solutions set of the equation?

A solution is any value of a variable that makes the specified equation true. A solution set is the set of all variables that makes the equation true. The solution set of 2y + 6 = 14 is {4}, because 2(4) + 6 = 14.

What is the solution set to the system?

A solution to a system of equations is a set of values for the variable that satisfy all the equations simultaneously. In order to solve a system of equations, one must find all the sets of values of the variables that constitutes solutions of the system.

What is a equation and solution?

An equation is a mathematical statement formed by placing an equal sign between two numerical or variable expressions, as in 3x+5=11 . A solution to an equation is a number that can be plugged in for the variable to make a true number statement. Example 1: Substituting 2 for x in. 3x+5=11.

### How do you write a solution essay?

2. Convince your reader that the problem is important and needs to be solved.

A solution set is the set of values which satisfy a given inequality. It means, each and every value in the solution set will satisfy the inequality and no other value will satisfy the inequality.

### Which is an example of a solution set?

A solution set is the set of values which satisfy a given inequality. It means, each and every value in the solution set will satisfy the inequality and no other value will satisfy the inequality. Example: Solve 2x + 3 ≤ 7, where x is a natural number. Solution: 2x + 3 ≤ 7. Subtracting 3 from both the sides, 2x ≤ 4. Dividing both sides by 2, x ≤ 2

How do you solve an inequality in math?

We can often solve inequalities by adding (or subtracting) a number from both sides (just as in Introduction to Algebra ), like this: If we subtract 3 from both sides, we get: In other words, x can be any value less than 4. What did we do?

How to find the direction of the inequality?

These things do not affect the direction of the inequality: Add (or subtract) a number from both sides Multiply (or divide) both sides by a positive number Simplify a side