CHECK MY ANSWER!
Which is a conditional statement for this sentence?

All birds can fly.
A. If an animal can fly, then it is a bird.
B. If an animal can’t fly, then it is a bird.
C. If an animal is a bird, then it can fly.

Question

CHECK MY ANSWER! 
Which is a conditional statement for this sentence?

 All birds can fly. 
A. If an animal can fly, then it is a bird. 
B. If an animal can’t fly, then it is a bird. 
C. If an animal is a bird, then it can fly. <--- 
D. If an animal is not a bird, then it can fly.

@SolomonZelman

anonymous · Answer

I'm pretty sure it's C.

anonymous · Answer

Based on the statement, all birds can fly.  So the first one can be eliminated because it says that if an animal can fly, then it is a bird.  That is false.  The second one says if an animal can't fly, then it is a bird and so that one is false because the statement is all birds can fly.  The third one says if an animal is a bird, then it can fly which says that any animal that is a bird can fly and the last one is not it because it excludes birds.

anonymous · Answer

@jtryon Am I right?

anonymous · Answer

You are right.  The answer is C

anonymous · Answer

Which is the conclusion of this statement?
If a and b are both negative then a • b = |a| • |b|.	
 
A. If a and b are both negative, a • b = |a| • |b|.  <---
B. a • b = |a| • |b| if a and b are both negative. 
C. a and b are both negative. 
D. a • b = |a| • |b|.

anonymous · Answer

@jtryon