Which shows a true conditional with a correctly identified hypothesis and conclusion?
A) If you join the gym, then it is free for the first three months.
Hypothesis: You join the gym.
Conclusion: It is free for the first three months.
B) The first three months are free, so I must have joined a gym. ******
Hypothesis: The first three months are free.
Conclusion: I must have joined a gym.
C) If you join the gym, then it is free for the first three months.
Hypothesis: It is free for the first three months.
Conclusion: You join the gym.
D) The first three months are free, so I must have joined a gym.
Hypothesis: I must have joined a gym.
Conclusion: The first three months are free.
no one helped this poor girl
How is this geometry?
I have no idea, the unit is reasoning and proof so yeah.
A is the correct answer.
A) If you join the gym, then it is free for the first three months.
Hypothesis: You join the gym.
Conclusion: It is free for the first three months.
This option is the true conditional with a correctly identified hypothesis and conclusion. It's like saying, "If you take a shower, then you will be clean." The hypothesis is "you take a shower," and the conclusion is "you will be clean." It's all about cause and effect, just like when I juggle rubber chickens and people start laughing. The cause is my amazing juggling skills, and the effect is uncontrollable laughter.
The correct answer is A) If you join the gym, then it is free for the first three months.
In this answer choice, the hypothesis is "You join the gym," and the conclusion is "It is free for the first three months." This is a true conditional because it states a cause-and-effect relationship between joining the gym and the first three months being free. To determine the correct answer, you need to identify the statement that follows the "if... then..." structure, with a clear antecedent (hypothesis) and consequent (conclusion).