Respuesta :
Answer:
1. The hypothesis of the conditional statement = If a polygon is a quadrilateral
2. The conclusion of the conditional statement = It is a square
3. The conditional statement is false
The counterexample is a rhombus is a quadrilateral, but it is not a square
4. The inverse of the conditional statement = If a polygon is not a quadrilateral, then it is not a square
5. The converse of the conditional statement is; If a polygon is a square, then it is a quadrilateral
6. The biconditional statement is; A polygon is a quadrilateral if and only if it is a square
Step-by-step explanation:
A conditional statement is of the following form;
[tex]{}[/tex] In logical form
If M, then N [tex]{}[/tex] M → N
1) The hypothesis = M
2) The conclusion = N
3) A counterexample is a statement that is in line with the conditions of the statement but clearly does not lead to the conditions of the statement
4) The inverse of a conditional statement is; if not M then not N which is written mathematically as ~M → ~N
5) The converse of a conditional statement is; if N then N which is written mathematically as N → M
6) The biconditional statement is M if and only if N The inverse of a conditional statement is; if not M then not N which is written mathematically as M ↔ N
