adplus-dvertising
frame-decoration

Question

What is the converse of the conditional statement “If it ices today, I will play ice hockey tomorrow.”

a.

“I will play ice hockey tomorrow only if it ices today.”

b.

“If I do not play ice hockey tomorrow, then it will not have iced today.”

c.

“If it does not ice today, then I will not play ice hockey tomorrow.”

d.

“I will not play ice hockey tomorrow only if it ices today.”

Posted under Discrete Mathematics

Answer: (a).“I will play ice hockey tomorrow only if it ices today.”

Engage with the Community - Add Your Comment

Confused About the Answer? Ask for Details Here.

Know the Explanation? Add it Here.

Q. What is the converse of the conditional statement “If it ices today, I will play ice hockey tomorrow.”

Similar Questions

Discover Related MCQs

Q. What are the contrapositive of the conditional statement “I come to class whenever there is going to be a test.”

Q. What are the inverse of the conditional statement “ A positive integer is a composite only if it has divisors other than 1 and itself.”

Q. What are the converse of the conditional statement “When Raj stay up late, it is necessary that Raj sleep until noon.”

Q. What are the contrapositive of the conditional statement “Medha will find a decent job when she labour hard.”?

Q. What are the inverse of the conditional statement “If you make your notes, it will be a convenient in exams.”

Q. The compound propositions p and q are called logically equivalent if ________ is a tautology.

Q. p → q is logically equivalent to ________

Q. p ∨ q is logically equivalent to ________

Q. ¬ (p ↔ q) is logically equivalent to ________

Q. p ∧ q is logically equivalent to ________

Q. Which of the following statement is correct?

Q. p ↔ q is logically equivalent to ________

Q. (p → q) ∧ (p → r) is logically equivalent to ________

Q. (p → r) ∨ (q → r) is logically equivalent to ________

Q. Let P (x) denote the statement “x >7.” Which of these have truth value true?

Q. Let Q(x) be the statement “x < 5.” What is the truth value of the quantification ∀xQ(x), having domains as real numbers.

Q. Determine the truth value of ∀n(n + 1 > n) if the domain consists of all real numbers.

Q. Let P(x) denote the statement “x = x + 7.” What is the truth value of the quantification ∃xP(x), where the domain consists of all real numbers?

Q. Let R (x) denote the statement “x > 2.” What is the truth value of the quantification ∃xR(x), having domain as real numbers?

Q. The statement,” Every comedian is funny” where C(x) is “x is a comedian” and F (x) is “x is funny” and the domain consists of all people.