Law of Detachment
The Law of Detachment is a logical rule that is commonly used in mathematical reasoning and proof writing
The Law of Detachment is a logical rule that is commonly used in mathematical reasoning and proof writing. It helps to establish a relationship between conditional statements and their conclusions.
The Law of Detachment states that if a conditional statement, known as the hypothesis, is true, and its corresponding conclusion is also true, then we can validly conclude that the given conditional statement is true.
Mathematically, the Law of Detachment can be expressed as follows:
If p -> q is a true conditional statement, and p is true, then q must also be true.
Here, “p” represents the hypothesis and “q” represents the conclusion of the given conditional statement.
Let’s consider an example to understand the application of the Law of Detachment:
Statement 1: If it is raining, then the ground is wet.
Statement 2: It is raining.
Using the Law of Detachment, we can conclude the following:
Conclusion: Therefore, the ground is wet.
In this example, we have the conditional statement “If it is raining, then the ground is wet.” Since we are given the information that “it is raining,” we can use the Law of Detachment to validly deduce that “the ground is wet.”
The Law of Detachment is a powerful tool in mathematical reasoning, as it allows us to make logical deductions based on conditional statements and their corresponding hypotheses. It helps ensure the validity of mathematical arguments and proofs.
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