Class 9 Exam  >  Class 9 Notes  >  Mathematics (Maths) Class 9  >  Short Answers Type Questions- Heron’s Formula

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

Q1. Find the area of a triangle whose sides are 8 cm, 10 cm, and 12 cm.

Sol: Let the semi-perimeter ss be:Class 9 Maths Chapter 10 Question Answers - Heron’s FormulaHeron’s formula for the area of the triangle:Class 9 Maths Chapter 10 Question Answers - Heron’s FormulaSubstituting the values:Class 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s Formula

Q2. Find the area of a triangle whose sides are 4.5 cm and 10 cm and perimeter 20.5 cm.

Sol:Given,

Side a = 4.5 cm

Side b = 10 cm

Perimeter of triangle = 20.5 cm

a+b+c = 20.5

4.5+10+c = 20.5

14.5+c = 20.5

c = 20.5 – 14.5

c = 6 cm

Semiperimeter, s = (4.5+10+6)/2 = 20.5/2 = 10.25 cm

Using Heron’s formula,

Area of the triangle = √[s (s-a) (s-b) (s-c)]

Area = √[10.25(10.25-4.5) (10.25-10) (10.25-6)]

Area = 7.91 cm2

Q3. If every side of a triangle is doubled, by what percentage is the area of the triangle increased?

Sol:Let a, b and c be the sides of a triangle.

Semiperimeter, s = (a+b+c)/2

Now, if each of the side is doubled, then the new sides of a triangle are:

A = 2a, B = 2b, C = 2c

Semiperimeter, S = (A+B+C)/2 = (2a + 2b + 2c)/2 = 2s

By Heron’s formula,

Area of triangle, A’ = √[S (S-A) (S-B) (S-C)]

A’ = √[2s(2s-2a)(2s-2b)(2s-2c)]

A’ = √[2s2(s-a)2(s-b)2(s-c)]

= 4√s(s-a)(s-b)(s-c)

A’ = 4A

Increase in Area = (4A – A)/A x 100% = 300%

Hence, the area is increased by 300%, if the sides of the triangle are doubled.

Q4.A triangular field has sides 150 m, 120 m, and 100 m. A gardener has to put a fence all around it and also plant grass inside. How much area does he need to plant grass?

Sol:Given,

Sides of triangular park are 120m, 80m and 50m.

Semiperimeter, s = (150+120+100)/2 = 185 m
Using Heron’s formula, we have;

Area of triangle = √(s(s-a)(s-b)(s-c))
Class 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaThe area that needs to be planted with grass is 2400m2.

Q5. Find the area of a triangle whose two sides are 16 cm and 20 cm, and the perimeter is 48 cm.

Sol:Assume that the third side of the triangle is xx.

Now, the three sides of the triangle are 16 cm, 20 cm, and xx cm.

It is given that the perimeter of the triangle is 48 cm:

x=48−(16+20) =48−36 =12cmClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s Formula


Q6. The sides of a triangle are in the ratio 8: 15: 17 and its perimeter is 680 cm. Find its area.

Sol: Given:The ratio of the sides of the triangle is given as 8: 15: 17.
Let the common ratio between the sides of the triangle be "x".

Thus, the sides are 8x, 15x,8x,15x, and 17x.

It is also given that the perimeter of the triangle is 680 cm:

 cm8x + 15x + 17x = 680 \, \text{cm}8x+15x+17x=680cm
40x=680cm
x = 17x=17
Now, the sides of the triangle are:
 cm8 \times 17 = 136 \, \text{cm}, \quad 15 \times 17 = 255 \, \text{cm}, \quad 17 \times 17 = 289 \, \text{cm}8×17=136cm, 15×17=255cm, 17×17=289cm
the semi-perimeter of the triangle s=6802=340 cms = \frac{680}{2} = 340 \, \text{cm}
Using Heron's formula:Class 9 Maths Chapter 10 Question Answers - Heron’s Formula
Class 9 Maths Chapter 10 Question Answers - Heron’s FormulaClass 9 Maths Chapter 10 Question Answers - Heron’s Formula Area = 4760cm2


Q7. The lengths of sides of a triangle are in the ratio 3 : 4 : 5 and its perimeter is 120 cm, find its area. 

The sides are in the ratio of 3 : 4 : 5.
Let the sides be 3x, 4x and 5x.
∴ Perimeter = 3x + 4x + 5x = 12x
Now 12x = 120                [Perimeter = 120 cm]
⇒   x =(120/12) = 10
∴ Lengths are: a = 3x = 3 x 10 = 30 cm
b = 4x = 4 x 10 = 40 cm
c = 5x = 5 x 10 = 50 cm
Now, semi-perimeter (s) = (120/12)
cm = 60 cm
∵ (s – a) = 60 – 30 = 30 cm
(s – b) = 60 – 40 = 20 cm
(s – c) = 60 – 50 = 10 cm

Using Heron’s formula, we have  

Area of the triangle =  Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

= 2 x 30 x 10 cm2 = 600 cm2 Thus, the required area of the triangle = 600 cm2.

Q8. Find the area of a quadrilateral ABCD in which AB = 8 cm, BC = 6 cm, CD = 8 cm, DA = 10 cm and AC = 10 cm.

In ΔABC, ∠B = 90°

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

∴ area of right (rt ΔABC) = (1/2) x 8 x 6 cm2 = 24 cm2
In ΔACD,
a = AC = 10 cm b = AD = 10 cm c = CD = 8 cm

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

∴Area of ΔACD 

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

= 2 x 4√21 = 8√21 cm2

= 8 x 4,58 cm2 = 36.64 cm2

Now, area of quadrilateral ABCD = ar (ΔABC) + ar (ΔACD)
= 24 cm2 + 8√21 cm
= 24 cm2 + 36.64 cm2
= 60.64 cm2


Q9. How much paper of each shade is needed to make a kite given in the figure, in which ABCD is a square of diagonal 44 cm.

∵ The diagonals of a square bisect each other at right angles

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

∴ OB = OD = OA = OC = (44/2) = 22 cm
Now, ar rt (Δ –I) = (1/2)× OB × OA
= (1/2) × 22 × 22 cm2 = 242 cm2
Similarly ar rt (Δ –II) = arrt(Δ–III) = ar rt (Δ –IV) = 242 cm2

∵ Sides of ΔCEF are 20 cm, 20 cm and 14 cm

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

⇒ Area of ΔCEF 

Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

Now, area of yellow paper = ar (Δ – I) + ar (Δ – II)
= 242 cm+ 242 cm2 = 484 cm2
Area of red paper = ar (Δ – IV) = 242 cm2
Area of green paper = ar (Δ – III) + ar ΔCEF
= 242 cm2 + 131.14 cm2
= 373.14 cm2

The document Class 9 Maths Chapter 10 Question Answers - Heron’s Formula is a part of the Class 9 Course Mathematics (Maths) Class 9.
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FAQs on Class 9 Maths Chapter 10 Question Answers - Heron’s Formula

1. What is Heron's Formula and how is it used to calculate the area of a triangle?
Ans.Heron's Formula is a mathematical formula that allows you to calculate the area of a triangle when you know the lengths of all three sides. The formula is given by: Area = √(s(s-a)(s-b)(s-c)), where 's' is the semi-perimeter of the triangle, calculated as s = (a + b + c)/2, and 'a', 'b', and 'c' are the lengths of the sides of the triangle.
2. Can Heron's Formula be used for all types of triangles?
Ans.Yes, Heron's Formula can be used for all types of triangles, including scalene, isosceles, and equilateral triangles, as long as you know the lengths of all three sides.
3. How do you find the semi-perimeter in Heron's Formula?
Ans.The semi-perimeter 's' in Heron's Formula is found by taking half of the sum of the lengths of the three sides of the triangle. It is calculated using the formula s = (a + b + c)/2, where 'a', 'b', and 'c' are the lengths of the triangle's sides.
4. What are the steps to apply Heron's Formula to find the area of a triangle?
Ans.To apply Heron's Formula, follow these steps: 1) Measure the lengths of the three sides of the triangle (a, b, c). 2) Calculate the semi-perimeter: s = (a + b + c)/2. 3) Use Heron's Formula: Area = √(s(s-a)(s-b)(s-c)). 4) Compute the area using the values obtained.
5. Are there any limitations or conditions when using Heron's Formula?
Ans.Heron's Formula requires that the lengths of the three sides must satisfy the triangle inequality theorem, which states that the sum of the lengths of any two sides must be greater than the length of the third side. If this condition is not met, the sides cannot form a triangle, and Heron's Formula cannot be applied.
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