Math Problem Statement

X+1greater than or equal to2

Solution

The inequality you provided is:

x+12x + 1 \geq 2

To solve for xx, follow these steps:

  1. Subtract 1 from both sides of the inequality: x21x \geq 2 - 1

  2. Simplify: x1x \geq 1

So, the solution is x1x \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>2x + 1 > 2?
  2. What happens if you add or subtract the same number to both sides of an inequality?
  3. How would you graph x1x \geq 1 on a number line?
  4. Can you solve 2x+372x + 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.

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Math Problem Analysis

Mathematical Concepts

Algebra
Inequalities

Formulas

x + 1 ≥ 2

Theorems

Properties of inequalities

Suitable Grade Level

Grades 6-8