The inequality you provided is:

\[
x + 1 \geq 2
\]

To solve for \(x\), follow these steps:

1. Subtract 1 from both sides of the inequality:
\[
x \geq 2 - 1
\]

2. Simplify:
\[
x \geq 1
\]

So, the solution is \(x \geq 1\).

Would you like further details or have any questions?

Here are 5 related questions to explore:

1. How would the solution change if the inequality was \(x + 1 > 2\)?
2. What happens if you add or subtract the same number to both sides of an inequality?
3. How would you graph \(x \geq 1\) on a number line?
4. Can you solve \(2x + 3 \geq 7\)?
5. How do you solve and graph compound inequalities?

**Tip:** When solving inequalities, the direction of the inequality sign stays the same unless you multiply or divide by a negative number.

Learn how to solve the inequality X + 1 ≥ 2 with a step-by-step guide. This problem covers key algebraic concepts, including properties of inequalities and how to solve them. Suitable for students in Grades 6-8.

Math Problem Statement

Solution

Ask a new question for Free

By Image

Math Problem Analysis

Mathematical Concepts

Formulas

Theorems

Suitable Grade Level

Related Recommendation