Using the conditional statement below, match the correct statement to the inverse, converse, contrapositive and biconditional statement
If two angles form a linear pair, then they are supplementary.
If two angles are not supplementary, then they do not form a linear pair
Two angles form a linear pair if and only if they are supplementary
If two angles are supplementary, then they form a linear pair
If two angles do not form a linear pair, then they are not supplementary
Inverse: If two angles are not supplementary, then they do not form a linear pair.
Converse: If two angles are supplementary, then they form a linear pair.
Contrapositive: If two angles do not form a linear pair, then they are not supplementary.
Biconditional: Two angles form a linear pair if and only if they are supplementary.
Inverse: If two angles are not supplementary, then they do not form a linear pair.
Converse: If two angles do not form a linear pair, then they are not supplementary.
Contrapositive: If two angles are not supplementary, then they do not form a linear pair.
Biconditional: Two angles form a linear pair if and only if they are supplementary.
Inverse: If two angles are not supplementary, then they do not form a linear pair.
To find the inverse of the conditional statement, we simply negate both the hypothesis and the conclusion.
Converse: If two angles are supplementary, then they form a linear pair.
To find the converse of the conditional statement, we switch the hypothesis and the conclusion.
Contrapositive: If two angles do not form a linear pair, then they are not supplementary.
To find the contrapositive of the conditional statement, we switch and negate both the hypothesis and the conclusion.
Biconditional: Two angles form a linear pair if and only if they are supplementary.
The biconditional statement combines the conditional statement and its converse, connecting them with "if and only if" or "iff".