Express the statement given below in "then" form. Then write the converse, inverse, and contrapositive.
Being correct is sufficient to not being incorrect
Which statement below is the correct "then" statement?
A. If someone is incorrect, then he or she is not correct.
B. If someone is correct, then he or she is not incorrect
C. If someone is not correct, then he or she is incorrect.
D. If someone is not incorrect, then he or she is correct.
Which statement below is the correct converse?
A. If someone is not incorrect, then he or she is correct
B. If someone is correct, then he or she is not incorrect.
C. If someone is incorrect, then he or she is not correct
D. If someone is not correct, then he or she is incorrect
Which statement below is the correct inverse?
A. If someone is correct, then he or she is not incorrect
B. If someone is incorrect, then he or she is not correct
C. If someone is not incorrect, then he or she is correct.
D. If someone is not correct, then he or she is incorrect
Which statement below is the correct contrapositive?
A. If someone is incorrect, then he or she is not correct
B. If someone is correct, then he or she is not incorrect.
C. If someone is not correct, then he or she is incorrect.
D. If someone is not incorrect, then he or she is correct
Answer (1)
The original statement translates to 'If someone is correct, then he or she is not incorrect.' The converse, inverse, and contrapositive statements are also determined, with the correct options identified as per the conditional structure. This analysis assists in understanding the logical relationships between these statements. ;
