Squeezebox, I don't think you know what you're talking about. It is perfectly reasonable to assume that a < b and c < d in this problem, because this statement is the hypothesis.Squeezebox said:Looks good. The only thing that I would change is "Assume a < b and c < d". Assuming something does not mean it is necessarily correct as a proof by contradiction can demonstrate. So you can change it to something like "Stated a < b and c < d." Since a < b and c < d was given to you.
A simple inequality proof is a type of mathematical proof that demonstrates the validity of a given inequality. It involves using logical reasoning and mathematical operations to show that one side of the inequality is always greater than or less than the other side.
To check a simple inequality proof, you can substitute different values for the variables in the inequality and see if the statement remains true. You can also use algebraic manipulations to simplify both sides of the inequality and see if they are equivalent.
The most common types of simple inequalities are less than (<), greater than (>), less than or equal to (≤), and greater than or equal to (≥). These symbols are used to compare two quantities and indicate which one is larger or smaller.
Some tips for solving simple inequality proofs include starting with the side of the inequality that is simpler, breaking up complex expressions into smaller parts, using known properties and rules of inequality, and being careful with the direction of the inequality when multiplying or dividing by a negative number.
Simple inequality proofs are important because they help us understand and make sense of mathematical relationships between quantities. They also allow us to solve problems involving inequalities, such as finding the range of possible values for a variable, determining the feasibility of a solution, or comparing the efficiency of different methods.