which shows a true conditional with a correctly identifoed hypothesis and conclusion
One example of a true conditional statement with a correctly identified hypothesis and conclusion is:
If it is raining, then the ground is wet.
In this case, the hypothesis is "it is raining" and the conclusion is "the ground is wet".
To identify a true conditional statement with a correctly identified hypothesis and conclusion, you need to understand the structure of a conditional statement.
A conditional statement is an "if-then" statement where one thing (the hypothesis) is claimed to lead to another thing (the conclusion). The hypothesis represents the condition or assumption, while the conclusion represents the result or consequence.
Here's an example of a true conditional statement with a correctly identified hypothesis and conclusion:
If it rains, then the ground will get wet.
In this statement:
- The hypothesis is "it rains" since it represents the condition or assumption (i.e., if it rains).
- The conclusion is "the ground will get wet" because it represents the result or consequence (i.e., then the ground will get wet).
This conditional statement is true because if it genuinely rains, then the ground will indeed get wet.
A true conditional statement with a correctly identified hypothesis and conclusion may look like this:
"If it is raining (hypothesis), then the ground is wet (conclusion)."