What is a conditional statement give two examples?
Conditional Statement: “If today is Wednesday, then yesterday was Tuesday.” Hypothesis: “If today is Wednesday” so our conclusion must follow “Then yesterday was Tuesday.” So the converse is found by rearranging the hypothesis and conclusion, as Math Planet accurately states.
What is the hypothesis of a square is a rectangle?
A square is a rectangle. The conditional statement would be “If a figure is a square, then it is a rectangle,” which gives us our hypothesis and conclusion.
What is the conditional type 2?
The type 2 conditional refers to an unlikely or hypothetical condition and its probable result. In type 2 conditional sentences, the time is now or any time and the situation is hypothetical.
What are the associated conditional statements for a rectangle?
The associated conditional statements are: a) If the adjacent sides of a rectangle are congruent then it is a square. b) If a rectangle is a square then the adjacent sides are congruent.
What are the sides of a rectangle?
A Rectangle is a four sided-polygon, having all the internal angles equal to 90 degrees. The two sides at each corner or vertex, meet at right angles. The opposite sides of the rectangle are equal in length which makes it different from a square. For example, if one side of a rectangle is 20 cm, then the side opposite to it is also 20 cm.
What is an example of conditional statement?
Conditional Statements. A statement written in the if-then form is a conditional statement. p → q represents the conditional statement. “if p then q .”. Example 1: If two angles are adjacent , then they have a common side. The part of the statement following if is called the hypothesis , and the part following then is called the conclusion.
When is a rectangle a square?
A rectangle is a square if and only if the adjacent sides are congruent. The associated conditional statements are: a) If the adjacent sides of a rectangle are congruent then it is a square. b) If a rectangle is a square then the adjacent sides are congruent.