Which statement is not always true for a parallelogram?
Answer and Explanation: Of the statements given, the one that is not always true about a parallelogram is that the diagonals are congruent. By the definition of a parallelogram, we know that the opposite sides are congruent and parallel, so the second and fourth statements are always true.Click to see full answer. Subsequently, one may…
Answer and Explanation: Of the statements given, the one that is not always true about a parallelogram is that the diagonals are congruent. By the definition of a parallelogram, we know that the opposite sides are congruent and parallel, so the second and fourth statements are always true.Click to see full answer. Subsequently, one may also ask, which statement is always true about a parallelogram?All four sides are congruent. All four angles are right angles. The diagonals bisect each other.Beside above, which quadrilateral must have diagonals that are congruent and perpendicular? rhombus Then, what is not a characteristic of a parallelogram? If the four sides do not connect at their endpoints, you do not have a closed shape; no parallelogram! If one side is longer than its opposite side, you do not have parallel sides; no parallelogram! If only one set of opposite sides are congruent, you do not have a parallelogram, you have a trapezoid.Which figure does not always have congruent diagonals? Quadrilaterals A B in these quadrilaterals, the diagonals are congruent rectangle, square, isosceles trapezoid in these quadrilaterals, each of the diagonals bisects a pair of opposite angles rhombus, square in these quadrilaterals, the diagonals are perpendicular rhombus, square a rhombus is always a parallelogram
