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QUADRILATERALS CLASS 9 CBSE MATHEMATICS

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QUADRILATERALS CLASS 9

Quadrilaterals for class 9 is an important topic this article contains the important points to remember and different types of quadrilaterals along with their properties . this post contains quadrilaterals 9 notes , quadrilaterals class ncert solutions , quadrilaterals class 9 mcq.

QUADRILATERALS

Definition: A quadrilateral is a simple closed figure with four sides, four angles and four vertices.

Types of Quadrilaterals: There are five types of quadrilaterals:

  • Parallelogram
  • Rectangle
  • Square
  • Rhombus
  • Trapezium

Kite is also a special type of quadrilateral.

Angle sum property of a Quadrilateral: One common property of all quadrilaterals is that the sum of all their angles equals to 360 .

PROPERTIES OF DIFFERENT QUADRILATERALS

All sides are congruent

Opposite sides are parallel and congruent

All angles are congruent

Opposite angles are congruent

Diagonals are congruent

Diagonals are perpendicular

Diagonals Bisect each other

Adjacent angles are supplementary.

PROPERTIES OF PARALLELOGRAM

Opposite sides are parallel and congruent

Opposite angles are congruent

Diagonals Bisect each other

Adjacent angles are supplementary.

PROPERTIES OF RECTANGLE

Opposite sides are parallel and congruent

All angles are congruent

Opposite angles are congruent

Diagonals are congruent

Diagonals Bisect each other

Adjacent angles are supplementary.

PROPERTIES OF RHOMBUS

All sides are congruent

Opposite sides are parallel and congruent

Opposite angles are congruent

Diagonals are perpendicular

Diagonals Bisect each other

Adjacent angles are supplementary.

PROPERTIES OF SQUARE

All sides are congruent

Opposite sides are parallel and congruent

All angles are congruent

Opposite angles are congruent

Diagonals are congruent

Diagonals are perpendicular

Diagonals Bisect each other

Adjacent angles are supplementary.

THE MID-POINT THEOREM

THE MID-POINT THEOREM

The line segment joining the mid-points of two sides of a triangle is parallel to the third side.

QUADRILATERALS CLASS 9
QUADRILATERALS CLASS 9

Converse of Mid-point theorem
The line drawn through the mid-point of one side of a triangle parallel to another side bisects the third side.
QUADRILATERALS CLASS 9


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QUADRILATERALS CLASS 9 CBSE MATHEMATICS

QUADRILATERALS CLASS 9

(a) 90°

(b) 75°

(c) 65°

(d) 10°

Ans. C

QUADRILATERALS CLASS 9

(a) A parallelogram

(b) A square

(c) A rhombus

(d) A rectangle

Ans. B

3. Given a quadrilateral ABCD, and diagonals AC and BD bisect each other at P such that AP = CP and BP = DP.  Also APD = 90°, then quadrilateral is a

(a) Rhombus

(b) Trapezium

(c) Parallelogram

(d) Rectangle

Ans.  A

4. Given a rectangle ABCD and P, Q, R, S are the mid-points of AB, BC, CD and DA respectively.  Length of diagonals of a rectangle is 8 cm.  Then the quadrilateral PQRS is a

(a) Parallelogram with adjacent sides 4 cm and 6 cm

(b) Rectangle with adjacent sides 4 cm and 6 cm

(c) Rhombus with side 4 cm

(d) Square with side 4 cm. 

Ans. C

5. Can the angles 110 , 80 , 70  and 95  be the angles of a parallelogram? Why or why not?

Ans. No

6. Can all the angles of a quadrilateral be right angles? Give reason for your answer.

Ans. Yes

7. In the given figure, BX and CY are perpendiculars to a line through the vertex A of ABC and Z is the mid – point of BC. Prove that XZ = YZ.

QUADRILATERALS CLASS 9

Sol. Given: BX and CY are Perpendiculars to a line XAY.
To prove: XZ = YZ
QUADRILATERALS CLASS 9



Construction:

8. ABCD is a trapezium in which AB || DC.  M and N are the mid-points of AD and BC respectively.  If AB = 12 cm and MN = 14 cm, find CD.

Sol. Here, ABCD is a trapezium in which, AB|| DC and M and N arethe mid-points of AD andBC respectively.

Since the line segment joining the mid-points of non-parallel sides of a trapezium is half of the sum of the lengths of its parallel sides,

QUADRILATERALS CLASS 9

9. In the given figure, ABCD and PQRC are rectangles and Q is the mid-point of AC.  Prove that:

 (i) DP = PC   

 (ii) PR = AC

QUADRILATERALS CLASS 9


Sol.  Given: ABCD and PQRC are two rectangles and Q is the mid-point of AC. 
To prove: (i) DP = PC
QUADRILATERALS CLASS 9
QUADRILATERALS CLASS 9
QUADRILATERALS CLASS 9

QUADRILATERALS CLASS 9

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