RD Sharma Class 9 Solutions Chapter 12 Exercise 12.2: We have the perfect Maths guide for all the Class 9 students, i.e., RD Sharma Solutions Class 9 Maths. You can practice the questions and clear all your doubts. RD Sharma Class 9 Solutions Chapter 12 Exercise 12.2 solutions are designed as per the current CBSE Syllabus by our subject matter experts. To know more, read the whole blog.
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RD Sharma Class 9 Solutions Chapter 12 Exercise 12.2
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Question 1: Find the area of the quadrilateral ABCD in which AB = 3 cm, BC = 4 cm, CD = 4 cm, DA = 5 cm and AC = 5 cm.
Solution:
Area of the quadrilateral ABCD = Area of △ABC + Area of △ADC ….(1)
△ABC is a right-angled triangle, which is right-angled at B.
Area of △ABC = 1/2 x Base x Height
= 1/2×AB×BC
= 1/2×3×4
= 6
Area of △ABC = 6 cm2 ……(2)
Now, In △CAD,
Sides are given, apply Heron’s Formula.
Perimeter = 2s = AC + CD + DA
2s = 5 cm + 4 cm + 5 cm
2s = 14 cm
s = 7 cm
Area of the △CAD = 9.16 cm2 …(3)
Using equations (2) and (3) in (1), we get
Area of quadrilateral ABCD = (6 + 9.16) cm2
= 15.16 cm2.
Question 2: The sides of a quadrilateral field, taken in order, are 26 m, 27 m, 7 m, and 24 m, respectively. The angle contained by the last two sides is a right angle. Find its area.
Solution:
Here,
AB = 26 m, BC = 27 m, CD = 7 m, DA = 24 m
AC is the diagonal joined at A to C point.
Now, in △ADC,
From the Pythagoras theorem,
AC2 = AD2 + CD2
AC2 = 142 + 72
AC = 25
Now, the area of △ABC
All the sides are known, Apply Heron’s Formula.
Perimeter of △ABC= 2s = AB + BC + CA
2s = 26 m + 27 m + 25 m
s = 39 m
= 291.84
Area of a triangle ABC = 291.84 m2
Now, for the area of △ADC, (Right angle triangle)
Area = 1/2 x Base X Height
= 1/2 x 7 x 24
= 84
Thus, the area of a △ADC is 84 m2
Therefore, the area of rectangular field ABCD = Area of △ABC + Area of △ADC
= 291.84 m2 + 84 m2
= 375.8 m2
Question 3: The sides of a quadrilateral, taken in order as 5, 12, 14, and 15 meters, respectively, and the angle contained by the first two sides is a right angle. Find its area.
Solution:
Here, AB = 5 m, BC = 12 m, CD =14 m and DA = 15 m
Join the diagonal AC.
Now, the area of △ABC = 1/2 ×AB×BC
= 1/2×5×12 = 30
The area of △ABC is 30 m2
In △ABC (right triangle),
From the Pythagoras theorem,
AC2 = AB2 + BC2
AC2 = 52 + 122
AC2 = 25 + 144 = 169
or AC = 13
Now in △ADC,
All sides are known, apply Heron’s Formula:
Perimeter of △ADC = 2s = AD + DC + AC
2s = 15 m +14 m +13 m
s = 21 m
= 84
Area of △ADC = 84 m2
Area of quadrilateral ABCD = Area of △ABC + Area of △ADC
= (30 + 84) m2
= 114 m2
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