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Question
mark each shape that always has the following properties.
property | parallelogram | rectangle | rhombus | square | trapezoid | isosceles trapezoid | kite
- both pairs of opp. sides are ≅ | | | | | | |
- diagonals are ≅ | | | | | | |
- diagonals are perpendicular | | | | | | |
- diagonals bisect each other | | | | | | |
- consecutive angles are supplementary | | | | | | |
- both pairs of opposite ∠’s are ≅ | | | | | | |
- ∠’s are ≅ | | | | | | |
Response
To solve this, we analyze each property for each quadrilateral:
Property 1: Both pairs of opp. sides are ≅
- Parallelogram: Yes (definition of parallelogram).
- Rectangle: Yes (a rectangle is a parallelogram with right angles, so opposite sides are congruent).
- Rhombus: Yes (all sides are congruent, so opposite sides are too).
- Square: Yes (a square is a rhombus and a rectangle, so opposite sides are congruent).
- Trapezoid: No (only one pair of parallel sides, not necessarily congruent).
- Isosceles Trapezoid: No (only one pair of parallel sides, legs are congruent, but not both pairs of opposite sides).
- Kite: No (two pairs of adjacent sides congruent, not opposite sides).
Property 2: Diagonals are ≅
- Parallelogram: No (diagonals bisect each other but aren’t necessarily congruent).
- Rectangle: Yes (diagonals of a rectangle are congruent).
- Rhombus: No (diagonals are perpendicular but not necessarily congruent).
- Square: Yes (a square is a rectangle, so diagonals are congruent).
- Trapezoid: No (diagonals not necessarily congruent).
- Isosceles Trapezoid: Yes (diagonals of an isosceles trapezoid are congruent).
- Kite: No (diagonals are perpendicular, not congruent).
Property 3: Diagonals are perpendicular
- Parallelogram: No.
- Rectangle: No (diagonals are congruent but not perpendicular).
- Rhombus: Yes (diagonals of a rhombus are perpendicular).
- Square: Yes (a square is a rhombus, so diagonals are perpendicular).
- Trapezoid: No.
- Isosceles Trapezoid: No.
- Kite: Yes (diagonals of a kite are perpendicular).
Property 4: Diagonals bisect each other
- Parallelogram: Yes (definition of parallelogram).
- Rectangle: Yes (a rectangle is a parallelogram, so diagonals bisect each other).
- Rhombus: Yes (a rhombus is a parallelogram, so diagonals bisect each other).
- Square: Yes (a square is a parallelogram, so diagonals bisect each other).
- Trapezoid: No (diagonals intersect but don’t bisect each other).
- Isosceles Trapezoid: No (diagonals intersect but don’t bisect each other).
- Kite: No (diagonals intersect at right angles, but one diagonal is bisected, not both).
Property 5: Consecutive angles are supplementary
- Parallelogram: Yes (consecutive angles in a parallelogram are supplementary).
- Rectangle: Yes (all angles are 90°, so consecutive angles are supplementary).
- Rhombus: Yes (a rhombus is a parallelogram, so consecutive angles are supplementary).
- Square: Yes (all angles are 90°, so consecutive angles are supplementary).
- Trapezoid: Yes (consecutive angles between the bases are supplementary).
- Isosceles Trapezoid: Yes (consecutive angles between the bases are supplementary).
- Kite: No (consecutive angles not necessarily supplementary).
Property 6: Both pairs of opposite ∠s are ≅
- Parallelogram: Yes (opposite angles in a parallelogram are congruent).
- Rectangle: Yes (all angles are 90°, so opposite angles are congruent).
- Rhombus: Yes (a rhombus is a parallelogram, so opposite angles are congruent).
- Square: Yes (all angles are 90°, so opposite angles are congruent).
- Trapezoid: No (only one pair of parallel sides, opposite angles not necessarily congruent).
- Isosceles Trapezoid: No (base angles are congruent, but not both pairs of opposite angles).
- Kite: No (one pair of opposite angles congruent, not both pairs).
Now, we mark “Yes” (✓) or “No” (✗) for each property and shape:
| Property | Parallelogram | … |
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To solve this, we analyze each property for each quadrilateral:
Property 1: Both pairs of opp. sides are ≅
- Parallelogram: Yes (definition of parallelogram).
- Rectangle: Yes (a rectangle is a parallelogram with right angles, so opposite sides are congruent).
- Rhombus: Yes (all sides are congruent, so opposite sides are too).
- Square: Yes (a square is a rhombus and a rectangle, so opposite sides are congruent).
- Trapezoid: No (only one pair of parallel sides, not necessarily congruent).
- Isosceles Trapezoid: No (only one pair of parallel sides, legs are congruent, but not both pairs of opposite sides).
- Kite: No (two pairs of adjacent sides congruent, not opposite sides).
Property 2: Diagonals are ≅
- Parallelogram: No (diagonals bisect each other but aren’t necessarily congruent).
- Rectangle: Yes (diagonals of a rectangle are congruent).
- Rhombus: No (diagonals are perpendicular but not necessarily congruent).
- Square: Yes (a square is a rectangle, so diagonals are congruent).
- Trapezoid: No (diagonals not necessarily congruent).
- Isosceles Trapezoid: Yes (diagonals of an isosceles trapezoid are congruent).
- Kite: No (diagonals are perpendicular, not congruent).
Property 3: Diagonals are perpendicular
- Parallelogram: No.
- Rectangle: No (diagonals are congruent but not perpendicular).
- Rhombus: Yes (diagonals of a rhombus are perpendicular).
- Square: Yes (a square is a rhombus, so diagonals are perpendicular).
- Trapezoid: No.
- Isosceles Trapezoid: No.
- Kite: Yes (diagonals of a kite are perpendicular).
Property 4: Diagonals bisect each other
- Parallelogram: Yes (definition of parallelogram).
- Rectangle: Yes (a rectangle is a parallelogram, so diagonals bisect each other).
- Rhombus: Yes (a rhombus is a parallelogram, so diagonals bisect each other).
- Square: Yes (a square is a parallelogram, so diagonals bisect each other).
- Trapezoid: No (diagonals intersect but don’t bisect each other).
- Isosceles Trapezoid: No (diagonals intersect but don’t bisect each other).
- Kite: No (diagonals intersect at right angles, but one diagonal is bisected, not both).
Property 5: Consecutive angles are supplementary
- Parallelogram: Yes (consecutive angles in a parallelogram are supplementary).
- Rectangle: Yes (all angles are 90°, so consecutive angles are supplementary).
- Rhombus: Yes (a rhombus is a parallelogram, so consecutive angles are supplementary).
- Square: Yes (all angles are 90°, so consecutive angles are supplementary).
- Trapezoid: Yes (consecutive angles between the bases are supplementary).
- Isosceles Trapezoid: Yes (consecutive angles between the bases are supplementary).
- Kite: No (consecutive angles not necessarily supplementary).
Property 6: Both pairs of opposite ∠s are ≅
- Parallelogram: Yes (opposite angles in a parallelogram are congruent).
- Rectangle: Yes (all angles are 90°, so opposite angles are congruent).
- Rhombus: Yes (a rhombus is a parallelogram, so opposite angles are congruent).
- Square: Yes (all angles are 90°, so opposite angles are congruent).
- Trapezoid: No (only one pair of parallel sides, opposite angles not necessarily congruent).
- Isosceles Trapezoid: No (base angles are congruent, but not both pairs of opposite angles).
- Kite: No (one pair of opposite angles congruent, not both pairs).
Now, we mark “Yes” (✓) or “No” (✗) for each property and shape:
| Property | Parallelogram | Rectangle | Rhombus | Square | Trapezoid | Isosceles Trapezoid | Kite |
|---|---|---|---|---|---|---|---|
| 2 | ✗ | ✓ | ✗ | ✓ | ✗ | ✓ | ✗ |
| 3 | ✗ | ✗ | ✓ | ✓ | ✗ | ✗ | ✓ |
| 4 | ✓ | ✓ | ✓ | ✓ | ✗ | ✗ | ✗ |
| 5 | ✓ | ✓ | ✓ | ✓ | ✓ | ✓ | ✗ |
| 6 | ✓ | ✓ | ✓ | ✓ | ✗ | ✗ | ✗ |
Final Table (Marked):
| Property | Parallelogram | Rectangle | Rhombus | Square | Trapezoid | Isosceles Trapezoid | Kite |
|---|---|---|---|---|---|---|---|
| 2 | ✗ | ✓ | ✗ | ✓ | ✗ | ✓ | ✗ |
| 3 | ✗ | ✗ | ✓ | ✓ | ✗ | ✗ | ✓ |
| 4 | ✓ | ✓ | ✓ | ✓ | ✗ | ✗ | ✗ |
| 5 | ✓ | ✓ | ✓ | ✓ | ✓ | ✓ | ✗ |
| 6 | ✓ | ✓ | ✓ | ✓ | ✗ | ✗ | ✗ |