Question

How do you solve \[x + 3 < 2\]?

Answer 1

Hint: Here, we need to solve the algebraic expression of inequality with a simple method by the following: perform addition, subtraction, multiplication and division and then get the\[x\]value. The given equation of binomial expression is defined as the two terms of polynomial function. Inequality, a statement of an order relationship is greater than, greater than or equal to, less than, or less than or equal to in between two numbers or algebraic expressions

Complete step by step solution:
Take the given inequality algebraic sum of binomial expression, we have
\[x + 3 < 2\]
By performing subtraction on both side by\[ - 3\], we get
\[x + 3 - 3 < 2 - 3\]
Now, solve the expression on both side, we get
\[x < - 1\]
Therefore, the Final answer is \[x < - 1\].
So, the correct answer is “ \[x < - 1\].”.

Note: To check whether the value is correct or not by substitute it on the original inequality expression. The word inequality means a mathematical expression in which the sides are not equal to each other. Basically, an inequality compares any two values and shows that one value is less than, greater than, or equal to the value on the other side of the equation. Basically, there are five inequality symbols used to represent equations of inequality.