![]() ![]() In logic, every assertion can only be either true or false. Negationīefore we can construct the converse inverse contrapositive of a conditional statement, we must first look at the concept of negation, which we will discuss later. Don’t worry they both mean the same thing. While reading other textbooks or materials, you may come across the phrases “antecedent” and “consequent,” which relate to the hypothesis and conclusion, respectively. In specific contexts, a conditional statement is referred to as an inference. What exactly is a Conditional Statement, and how does it function?Ī contrapositive and converse conditional statement has the form “If pp, then qq,” where pp represents the hypothesis and Q represents the conditional statement’s conclusion. In this session, we will get familiar with the fundamental ideas for converting or rewriting a conditional statement into its converse, inverse, and contrapositive forms, which will be addressed in further detail later.īefore we begin, we should define a conditional statement since it is the foundation or predecessor of the three connected sentences we will cover in this session. Following the contrapositive and converse formulation of an initial dependent account, we arrive at three additional conditional assertions, which we label the converse inverse contrapositive. ![]() Also significant are assertions connected to the original conditional statement by modifying the positions of P and Q and the negation of a statement in the original conditional statement. ![]() Conditional statements are, without a doubt, quite essential. It doesn’t take long to come across anything along the lines of “If P then Q,” whether in mathematics or otherwise. Conditional statements may be seen in a variety of contexts. ![]()
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