Conceptos de Inecuaciones o Desigualdades.
Understanding Inequalities and Their Properties
Introduction to Inequalities
- The video introduces the concept of inequalities, defined as a relationship of inequality between two algebraic expressions involving one or more variables.
- An example provided is x - 3 geq 10 + x , illustrating the use of inequality signs such as greater than, less than, greater than or equal to, and less than or equal to.
Solving Inequalities
- To solve an inequality means finding all values of the variable that satisfy the inequality condition. For instance, x > 2 includes all numbers greater than 2.
- The solution set for x > 2 includes numbers like 3, 4, 5, etc., extending infinitely in the positive direction.
Solution Representation
- Solutions can be represented in various forms: interval notation, graphical representation, and set notation.
- The process involves isolating the variable (commonly x ), similar to solving algebraic equations.
Example of Solving an Inequality
- An example given is x + 7 < 12 . By moving '7' across the inequality sign, it becomes x < 12 - 7 , simplifying to x < 5 .
Properties of Inequalities
- Key properties include:
- First Property: Adding or subtracting the same number on both sides does not change the direction of the inequality.
- Second Property: Multiplying or dividing by a positive number keeps the direction unchanged.
- Third Property: Multiplying or dividing by a negative number reverses the direction of the inequality.
Types of Inequalities
- Different types discussed include linear inequalities, double inequalities, quadratic inequalities, and absolute value inequalities. This concludes an overview of inequalities and their properties.