A linear inequality compares two first-degree expressions. Instead of asking when two expressions are equal, it asks when one side is greater than, less than, or equal to the other in an inequality sense. That is why a problem like 2x + 3 > 7 usually has many correct values. Every real number larger than 2 works, so the answer is a set of values, not a single solution.
This is the key distinction between a linear equation and a linear inequality. An equation such as 2x + 3 = 7 has one exact answer, x = 2. The related inequality 2x + 3 > 7 has an entire ray of answers, x > 2. The variable still has degree one, the algebra rules are still familiar, but the final interpretation is different because the result describes a range.
You will most often see four symbols in linear inequality work: >, <, >=, and <=. Strict symbols, > and <, exclude the boundary value. Inclusive symbols, >= and <=, include the boundary value. That inclusion rule shows up everywhere: in the final isolated statement, in interval notation, and on the graph where the endpoint changes from an open circle to a closed circle.