Class 9 Exam  >  Class 9 Notes  >  Mathematics (Maths) Class 9  >  Long Answer Type Questions- Areas of Parallelograms and Triangles

Class 9 Maths Question Answers - Areas of Parallelograms

Q1. In a parallelogram ABCD, it is being given that AB = 12 cm and the altitude corresponding to the sides AB and AD are DL = 5 cm and BM = 8 cm respectively. Find AD.

∵  Area of a parallelogram = base x heightClass 9 Maths Question Answers - Areas of Parallelograms

∴ Area of parallelogram ABCD = AB x DL = 12 cm x 5 cm = 60 cm2 Again, area of parallelogram ABCD = AD x BM
∴  AD x BM = 60 cm2                    [∵ ar (parallelogram ABCD) = 60 cm2]
⇒ AD x 8 cm = 60 cm2                 [∵ BM = 8 cm (Given)]
⇒ AD = (60/8) cm
= (15/2) cm = 7.5 cm
Thus, the required length of AD is 7.5 cm.


Q2. Find the area of a trapezium whose parallel sides are 9 cm and 5 cm respectively and the distance between these sides is 8 cm.

Let ABCD be a trapezium such that AD || BC. Let us join BD.

Class 9 Maths Question Answers - Areas of Parallelograms

∵ Area of a triangle = (1/2)x base x height
∴ Area of ΔABD = (1/2)x AD x height
= (1/2)x 5 cm x 8 cm = 20 cm2
ar (ΔBCD) = (1/2)x base x height
= (1/2)x BC x height
= (1/2)x 9 cm x 8 cm
= 36 cm
Now, ar (trapezium ABCD) = ar (D ABD) + ar (D BCD)
= 20 cm2 + 36 cm2
= 56 cm2

 

Q3. In the adjoining figure, find the area of the trapezium ABCD.

 ∵ DEC is a right triangle.

Class 9 Maths Question Answers - Areas of Parallelograms

Class 9 Maths Question Answers - Areas of Parallelograms

∴ ar (ΔDEC) = (1/2)x base x height
= (1/2)x 8 x 15 cm2
= 60 cm2 ar (rectangle ABED) = length x breadth
= 10 cm x 15 cm = 150 cm2
Now, ar (trapezium ABCD) = ar (rectangle ABED) + ar (ΔDEC)
= 150 cm2 + 60 cm2 = 210 cm2
Thus, the required area of trapezium ABCD = 210 cm2.


Q 4. In the figure BD || CA, E is mid-point of CA and BD = (1/2) CA.
Prove that ar (
ΔABC) = 2 ar (ΔDBC)

Join D and E 

∵ BD = CE and BD || CE
∴ BCED is a parallelogram. ⇒ ΔDBC and ΔEBC are on the same base BC and between the same parallels,

Class 9 Maths Question Answers - Areas of Parallelograms

∴ ar (ΔDBC) = ar (ΔEBC)                 ... (1)
In ΔABC, BE is a median,
∴ ar (ΔFBC) = (1/2)ar (ΔABC)
Now, ar (ΔABC) = ar (ΔEBC) + ar (ΔABE)
Also, ar (ΔABC) = 2 ar (ΔEBC)
∴ ar (ΔABC) = 2 ar (ΔDBC)


Q5. In the adjoining figure, ABCD is a quadrilateral in which diagonal BD = 12 cm. If AL ⊥ BD and CM ⊥ BD such that AL = 6 cm and CM = 4 cm, find the area of quadrilateral ABCD.

The diagonal BD divides the given quadrilateral into two triangles BDC and ABD.

Class 9 Maths Question Answers - Areas of Parallelograms

Since, area of a triangle = (1/2)x base x altitude
∴ Area of ΔABD = (1/2)x BD x AL
= (1/2)x 12 cm  x 6 cm
= 36 cm2
Area of ΔBCD = (1/2)x base x altitude
=(1/2)x BD x CM
= (1/2)x 12 cm x 4 cm
= 24 cm2.
Now, ar (quadrilateral ABCD) = ar (ΔABD) + ar (ΔBCD)
⇒ ar (quadrilateral ABCD) = 36 cm2 + 24 cm2
= 60 cm2
Thus, the required area of quadrilateral ABCD
= 60 cm2.


Q6. Find the area of the following quadrilateral.

Class 9 Maths Question Answers - Areas of Parallelograms

 ∵ APB is a right triangle.
∴ AB2 – BP= AP2
⇒ 102 – 8= AP2
⇒ 100 – 64 = AP
⇒ AP = 36 = 6 cm
Since, ar (rt ΔAPB) =(1/2)x base x altitude
∴ ar (ΔAPB) =(1/2)x 6 cm x 8 cm
= 24 cm2
Similarly, ar (rt ΔCQD) = 24 cm2 Area of rectangle BCQP
= length x breath = 6 cm x 8 cm = 48 cm2
Now, area of quadrilateral ABCD
= ar (rt ΔAPB) + ar (rectangle BCQP) + ar (rt ΔCQD)
= 24 cm2 + 48 cm2 + 24 cm2
= 96 cm2
Thus, the required area of the quadrilateral ABCD
= 96 cm2.

The document Class 9 Maths Question Answers - Areas of Parallelograms is a part of the Class 9 Course Mathematics (Maths) Class 9.
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FAQs on Class 9 Maths Question Answers - Areas of Parallelograms

1. What is the formula to calculate the area of a parallelogram?
Ans. The formula to calculate the area of a parallelogram is base multiplied by the height. So, the area of a parallelogram is given by the formula: Area = base × height.
2. How do I find the height of a parallelogram if only the base and area are given?
Ans. If you only have the base and area of a parallelogram, you can find the height by dividing the area by the length of the base. So, the height can be calculated using the formula: Height = Area / Base.
3. Can the base and height of a parallelogram be any two sides of the parallelogram?
Ans. No, the base and height of a parallelogram must be perpendicular to each other. The base is defined as the side of the parallelogram on which the height is measured. The height is the perpendicular distance between the base and the opposite side of the parallelogram.
4. How is the area of a triangle related to the area of a parallelogram?
Ans. The area of a triangle is half the area of the parallelogram having the same base and height. This means that if you have a parallelogram and you draw a diagonal to split it into two triangles, the sum of the areas of those triangles will be equal to the area of the original parallelogram.
5. What is the difference between a parallelogram and a triangle in terms of their areas?
Ans. The main difference between a parallelogram and a triangle in terms of their areas is that a parallelogram has a base and a height, whereas a triangle has a base and a height, but the height is perpendicular to the base. Additionally, the area of a parallelogram can be calculated using the formula base × height, while the area of a triangle can be calculated using the formula ½ × base × height.
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