No, a rectangle's diagonals do not bisect opposite angles.
The diagonals of a rectangle bisect the angles only if the rectangle is a square.
No, but the diagonals of a square does bisects its interior angles.
No but the diagonals of a square bisect each other at right angles
not all
opposite angles in which type of quadrilateral?
Square
the anser to this question is a trapiezuim as it could have right angles and its diagonals definatly do not bisect each other
trapezoid
Rhombus and square are the only quadrilaterals whose diagonals bisect the angles of the quadrilateral. In both these quadrilaterals, the diagonals intersect at right angles, dividing each angle into two equal parts.
Parallelogram and rhombus.
A square has diagonals that split the angles into two 45-degree parts, thus bisecting them.
It is a rhombus or a kite
A rhombus is a 4 equal sided quadrilateral with equal opposite acute angles and equal opposite obtuse angles with diagonals that bisect each other at right angles.
No, a rectangle's diagonals do not bisect opposite angles.
In rhombuses and squares the diagonals bisect opposite angles.
Not for every parallelogram. Only for a rhombus (diamond) or square will the diagonals bisect the opposite angles they connect, and diagonals are perpendicular. In rectangles, the diagonals do not bisect the angles and are notperpendicular, but they do bisect each other.