# How to write a biconditional statement

User: What is a counterexample for the conjecture? Conjecture: The product of two positive numbers is greater than the sum of the two numbers. A. 3 and 5 B. 2 and 2 C. A counterexample exists, but it is not shown above. D. There is no counterexample. The conjecture is true.

Weegy: B. 2 and 2 is an example for the conjecture.

User: What is a counterexample for the conjecture? Conjecture: Any number that is divisible by 4 is also divisible by 8. A. 24 B. 40 C. 12 D. 26

User: Identify the hypothesis and conclusion of this conditional statement: If two lines intersect at right angles, then the two lines are perpendicular. A. Hypothesis: The two lines are perpendicular. Conclusion: Two lines intersect at right angles. B. Hypothesis: Two lines intersect at right angles. Conclusion: The two lines are perpendicular. C. Hypothesis: The two lines are not perpendicular. Conclusion: Two lines intersect at right angles. D. Hypothesis: Two lines intersect at right angles. Conclusion: The two lines are not perpendicular.

Weegy: C. Hypothesis: The two lines are not perpendicular. Conclusion: Two lines intersect at right angles is the answer.

User: Which choice shows a true conditional, with the hypothesis and conclusion identified correctly? A. Yesterday was Monday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Monday. B. If tomorrow is Thursday, then yesterday was Tuesday. Hypothesis: Yesterday was Tuesday. Conclusion: Tomorrow is not Thursday. C. If tomorrow is Thursday, then yesterday was Tuesday. Hypothesis: Yesterday was Tuesday. Conclusion: Tomorrow is Thursday. D. Yesterday was Tuesday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Tuesday.

Weegy: D. Yesterday was Tuesday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Tuesday.

sharinalb |Points 105|

User: Write this statement as a conditional in if-then form: All triangles have three sides. A. If a triangle has three sides, then all triangles have three sides. B. If a figure has three sides, then it is not a triangle. C. If a figure is a triangle, then all triangles have three sides. D. If a figure is a triangle, then it has three sides.

Weegy: D. If a figure is a triangle, then it has three sides.

rugmaker |Points 2555|

User: Which statement is a counterexample for the

following conditional? If you live in Springfield, then you live in Illinois. A. Sara Lucas lives in Springfield. B. Jonah Lincoln lives in Springfield, Illinois. C. Billy Jones lives in Chicago, Illinois. D. Erin Naismith lives in Springfield, Massachusetts.

Weegy: Sara Lucas lives in Springfield.

jeifunk |Points 8993|

User: Which conditional has the same truth value as its converse? A. If x = 7, then. B. If a figure is a square, then it has four sides. C. If x – 17 = 4, then x = 21. D. If an angle has a measure of 80, then it is acute.

Weegy: The answer is B. If x. 7 = 14

jeifunk |Points 8993|

User: Which statement provides a counterexample to the following faulty definition? A square is a figure with four congruent sides. A. A six-sided figure can have four sides congruent. B. Some triangles have all sides congruent. C. A square has four congruent angles. D. A rectangle has four sides.

Weegy: The answer is A. A six-sided figure can have four sides congruent.

jeifunk |Points 8993|

User: Which biconditional is NOT a good definition? A. A whole number is even if and only if it is divisible by 2. B. A whole number is odd if and only if the number is not divisible by 2. C. An angle is straight if and only if its measure is 180. D. A ray is a bisector of an angle if and only if it splits the angle into two angles.

Weegy: The answer is D. A ray is a bisector of an angle if and only if it splits the angle into two angles.

bonaxle |Points 789|

User: Which statement is the Law of Detachment? A. If is a true statement and q is true, then p is true. B. If is a true statement and q is true, then is true. C. If and are true, then is a true statement. D. If is a true statement and p is true, then q is true.

User: Which statement is an example of the Addition Property of Equality? Use the given property to complete the statement. A. If p = q then B. If p = q then C. If p = q then D. p = q

Weegy: D. p = q. Anything else?