properties, theroems, postulates, definitions, and all that stuff managing parallelograms, trapezoids, rhombi, rectangles, and squares... I don't know why i'm making this haha ns hope it helps somebody

definition that a parallelogram
 AB a quadrilateral v both pairs of opposite political parties parallel five properties/theorems for parallelograms opposite sides are parallel, diagonals bisect every other, the opposite sides space congruent, the opposite angles room congruent, consecutive angles room supplementary definition that a rectangle a quadrilateral with four right angles rectangle theorems if a parallel is a rectangle, climate its diagonals space congruent; if the diagonals that a parallelogram are congruent, then the paralellogram is a rectangle five properties of a rectangle opposite sides space congruent and also parallel; the opposite angles room congruent; continuous angles are supplementary; diagonals room congruent and bisect every other; all four angles are ideal angles definition that a rhombus a quadrilateral with 4 congruent sides rhombus theroems the diagonals the a rhombus space perpendicular; if the diagonals that a parallelogram are perpendicular, climate the paralellogram is a rhombus; every diagonal of a rhombus bisects a pair of the opposite angles properties that a rhombus all parallel properties apply; all 4 sides are congruent; diagonals space perpendicular; the diagonals bisect the opposite angles definition of a square a square with 4 right angles and also four congruent sides properties of a square the nature of a rectangle plus the nature of a rhombus; 4 right angles; all four sides room congruent definition of a trapezoid a quadrilateral with precisely one pair the parallel sides definition of one isosceles trapezoid a trapezoid v the legs congruent isosceles trapezoid theroems both pairs of basic angles space congruent; the diagonals room congruent trapezoid average theorem the typical of a trapezoid is parallel come the bases and its measure is one-half the sum of the procedures of the bases, or median=1/2(x+y) in this quadrilaterals, the diagonals bisect each other paralellogram, rectangle, rhombus, square in this quadrilaterals, the diagonals are congruent rectangle, square, isosceles trapezoid in these quadrilaterals, every of the diagonals bisects a pair of the opposite angles rhombus, square in these quadrilaterals, the diagonals are perpendicular rhombus, square a rhombus is always a...You are watching: What quadrilaterals have diagonals that bisect each other parallelogram a square is always a... parallelogram, rhombus, and rectangle a rectangle is constantly a... parallelogram a square is never a... trapezoid, since trapezoids only have actually one pair that parallel sides a trapezoid is never a... parallelogram, rhombus, rectangle, or square, because trapezoids only have one pair of parallel sides these quadrilaterals constantly have all 4 congruent sides rhombus, square these quadrilaterals constantly have all 4 right angles rectangle, square these quadrilaterals always have perpendicular diagonals rhombus, square if you division a square into four right triangle by drawing its 2 diagonals, the measure of every of the angles in the triangles that is no a right angle is... 45 degrees the diagonals of a rhombus... are not always congruent, but they are always perpendicular and they do constantly bisect every other, and they do constantly bisect the bag of opposite angles the diagonals the a rectangle...See more: Can You Lose Weight In Your Vagina, How To Get Rid Of Fupa are not constantly perpendicular, but they are constantly congruent and they always bisect every other the diagonals the a parallelogram... always bisect every other
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