Worksheet on Area and Perimeter of Triangle | Area and Perimeter of Triangle Worksheet with Answers


Students looking for different problems on Perimeter and Area of the Triangle can get them in one place. Use the Worksheet on Area and Perimeter of Triangle and kick start your preparation. Students can assess their strengths and weaknesses by solving all questions from Triangle Area and Perimeter Worksheet. Make use of these worksheets and understand different formulas and ways of solving isosceles triangle, equilateral triangle, scalene, and right-angled triangle areas and perimeter.
The Questions covered in the Area and Perimeter of Triangle Worksheet include various triangles area and perimeter. Get those formulas and step by step process to solve all questions. Here, we are offering a detailed solution for each and every problem for a better understanding of concepts.
1. Find the Area, Perimeter of the following triangles:
(a)

(b)

(c)

Solution:

(a)
Sides of the triangle are a = 12, b = 16, c = 20
s = (a + b + c)/2
s = (12 + 16 + 20)/2 = 48/2
s = 24
Area of the triangle formula is A = ˆš[s (s – a) (s – b) (s – c)]
A = ˆš[24 (24 – 12) (24 – 16) (24 – 20)]
= ˆš[24 (12) (8) (4)]
= ˆš(9216) = 96 sq units.
Perimeter of the traingle = (a + b + c)
= 12 + 16 + 20 = 48 units
ˆ´ The area, perimeter of the given triangle is 96 sq units, 48 units.
(b)
The sides of the given triangle are a = 5, b = 13, c = 12
Semiperimeter of the traingle is s = (a + b + c)/2
s = (5 + 13 + 12)/2 = 30/2 = 15
Area of the triangle formula is A = ˆš[s (s – a) (s – b) (s – c)]
A = ˆš[15 (15 – 5) (15 – 13) (15 – 12)]
= ˆš[15 (10) (2) (3)]
= ˆš[900] = 30
Perimeter of the triangle formula is P = (a + b + c)
P = (5 + 13 + 12) = 30
ˆ´ The perimeter and area of the triangle is 30 units, 30 sq units.
(c)
Sides of the triangle are a = 30 cm, b = 35 cm, c = 55 cm
Perimeter of the triangle = (a + b + c)
= (30 + 35 + 55) = 120 cm
Semiperimeter of the triangle s = (a + b + c)/2
= (30 + 35 + 55) = 120/2 = 60 cm
Area of the triangle formula is A = ˆš[s (s – a) (s – b) (s – c)]
A = ˆš[60 (60 – 30) (60 – 35) (60 – 55)]
= ˆš[60 (30) (25) (5)]
= ˆš[225,000] = 474.34 sq. cm


2. Find the area of the triangle whose dimensions are:
(i) base = 20 cm, height = 5 cm
(ii) base = 6.5 m, height = 8 m
(iii) base = 28 m, height = 7 m

Solution:

(i)
Given that,
base = 20 cm, height = 5 cm
Area of the triangle formula is A = ½ x base x height
= ½ x 20 x 5
Area = 10 x 5 = 50 cm²
(ii)
Given that,
base = 6.5 m, height = 8 m
Area of the triangle formula is A = ½ x base x height
A = ½ x 6.5 x 8
Area = 6.5 x 4 = 26 m²
(iii)
Given that,
base = 28 m, height = 7 m
The area of the triangle formula is A = ½ x base x height
= ½ x 28 x 7 = 14 x 7
Area = 98 m²


3. Find the base of a triangle whose
(i) Area = 612 cm², height = 6.2 cm
(ii) Area = 528 cm², height = 10 cm
(iii) Area = 126 m², height = 8 m

Solution:

(i)
Given that,
Area = 612 cm², height = 6.2 cm
Area A = ½ x base x height
612 = ½ x base x 6.2
base = (2 x 612)/6.2 = 1224/6.2
base = 197.41 cm
(ii)
Given that,
Area = 528 cm², height = 10 cm
Area A = ½ x base x height
528 = ½ x base x 10
base = 528/5 = 105.6 cm
(iii)
Given that,
Area = 126 m², height = 8 m
Area A = ½ x base x height
126 = ½ x base x 8
base = 126/4 = 31.5 m


4. Find the height of the triangle, whose
(i) Area = 1500 m², Base = 7.5 m
(ii) Area = 480 cm², Base = 8 cm
(iii) Area = 2580 cm², Base = 12 cm

Solution:

(i) Given that,
Area = 1500 m², Base = 7.5 m
Area A = ½ x base x height
1500 = ½ x 7.5 x height
height = 3000/7.5
height = 400 m
(ii) Given that,
Area = 480 cm², Base = 8 cm
Area A = ½ x base x height
480 = ½ x 8 x height
height = 480/4
height = 120 cm
(iii) Given that,
Area = 2580 cm², Base = 12 cm
Area A = ½ x base x height
2580 = ½ x 12 x height
height = 2580/6
height = 430 cm.


5. The three sides of the triangle are 10 cm, 14 cm, 18 cm. Find its semi perimeter, perimeter, and area.

Solution:

Given that,
Sides of the triangle are a = 10 cm, b = 14 c, c = 18 cm
Perimeter = (a + b + c)
= 10 + 14 + 18 = 42 cm
Semi perimeter s = (a + b + c)/2
= (10 + 14 + 18)/2 = 42/2
= 21 cm
Area of the triangle = ˆš[s (s – a) (s – b) (s – c)]
= ˆš[21 (21 – 10) (21 – 14) (21 – 18]
= ˆš[21 (11) (7) (3)]
= ˆš[4851] = 69.64 cm²


6. Find the area, the perimeter of the triangle, whose sides are 12 m, 15 m, and the semiperimeter is 17.5 m.

Solution:

Given that,
The sides of the triangle are a = 12 m, b = 15 m
Triangle semiperimeter s = 17.5
s = (a + b + c)/2
17.5 = (12 + 15 + c)/2
35 = 27 + c
c = 35 – 27
c = 8 m
Perimeter of the triangle = (a + b + c)
= 12 + 15 + 8 = 35 m
Triangle area = ˆš[s (s – a) (s – b) (s – c)]
= ˆš[17.5 (17.5 – 12) (17.5 – 15) (17.5 – 8)]
= ˆš[17.5 (5.5) (2.5) (9.5)] = ˆš[2,285.9375]
= 47.81 m².
ˆ´ The Triangle perimeter is 35 m, another side is 8 m, and the area is 47.81 m².


7. The three sides of the triangle are in the ratio 5: 2: 6 and its perimeter is 78 units. Find its area?

Solution:

Given that,
The ratio of three sides of the triangle = 5: 2: 6
Triangle perimeter = 78 units
Let us take x as the side of the triangle.
Then, the three sides of a triangle are 5x, 2x, 6x.
Triangle perimeter = 78 units
5x + 2x + 6x = 78
13x = 78
x = 78/13
x = 6 units
So, three sides of the triangle are 30, 12, 36
Semi perimeter s = (30 + 12 + 36)/2 = 78/2 = 39
Triangle area = ˆš[s (s – a) (s – b) (s – c)]
= ˆš[39 (39 – 30) (39 – 12) (39 – 36)]
= ˆš[39 (9) (27) (3)]
= ˆš[28,431] = 168.61 sq units.


8. Find the base of the triangle, whose area is 120 m², altitude is 15 m?

Solution:

Given that,
Altitude = 15 m
Triangle area A = 120 m²
½ x base x height = 120
½ x base x 15 = 120
base = 240/15 = 16 m


9. Find the height of the triangle, whose base is 9 units, and the area is 144 sq units?

Solution:

Given that,
Base = 9 units
Triangle Area = 144 sq units
½ x base x height = 144
½ x 9 x height = 144
height = 288/9 = 32 units.


10. Find the area of an equilateral triangle, the length of whose sides is 11 cm?

Solution:

Given that,
Side of the equilateral triangle a = 11 cm
Area of triangle = (ˆš3/4) a²
Area = (ˆš3/4) 11² = (ˆš3/4) x 11 x 11
= 52.39 cm²
ˆ´ The area of an equilateral triangle is 52.39 cm².


11. The base and height of a triangle are in the ratio 15: 14 and its area is 320 m². Find the height and base of the triangle?

Solution:

Given that,
The ratio of base and height of triangle = 15: 14
Let us take 15x, 14x as the triangle base and height.
Area of triangle = 320
½ x base x height = 320
½ x 15x x 14x = 320
105x² = 320
x² = 320/105
x = ˆš(3.047) = 1.74 m
Height = 14 x 1.74 = 24.44 m
Base = 15 x 1.74 = 26.1 m


12. Find the area of an isosceles right-angled triangle of equal sides 15 cm each?

Solution:

Given that,
Right-angles triangle sides = 15 cm
Triangle area = ½ x side x side
= ½ x 15 x 15 = 225/2 = 112.5 cm
ˆ´ The area of the triangle is 112.5 cm.


13. Find the area of a triangle, whose sides are 5 m, 4 m and angle is 120°.

Solution:

Given that,
The sides of a triangle are a = 5 m, b = 4 m
Angle c = 180°.
Area of the triangle = ½ab sin (A)
= ½ x 5 x 4 x sin(120°)
= 10 x (ˆš3/2)
= 5ˆš3
ˆ´ Area of the triangle = 5ˆš3 sq units.


14. Find the other side and perimeter of the right-angled triangle, whose sides are 8 cm, 15 cm?

Solution:

Given that,
The sides of the triangle are a = 8 cm, b = 15 cm
As per the Pythagorean theorem,
c² = a² + b²
c² = 8² + 15²
c² = 64 + 225
c² = 289
c = ˆš289 = 17 cm
Perimeter = (8 + 15 + 17) = 40
ˆ´ Another side, the perimeter of the right-angled triangle is 17 cm, 40 cm.


15. Find the area of a right-angled triangle whose hypotenuse is 13 cm and one of its sides containing the right angle is 12 cm. Find the length of the other side and perimeter.

Solution:

Given that,
Hypotenuse = 13 cm
Side = 12 cm
Hypotenuse² = Side² + Side²
13² = 12² + Side²
Side² = 169 – 144
Side² = 25
Side = ˆš25 = 5 cm
Semi perimeter s = (13 + 5 + 12)/2 = 30/2 = 15
Perimeter = (13 + 5 + 12) = 30 cm
Triangle Area = ˆš[s (s – a) (s – b) (s – c)]
= ˆš[15 (15 – 5) (15 – 12) (15 – 13)]
= ˆš[15 (10) (3) (2)] = ˆš[900]
= 30 cm²
ˆ´ Area is 30 cm², other side is 5 cm.


16. The area of the triangle is equal to that of the square whose each side measures 30 cm. Find the side of the triangle whose corresponding altitude is 36 cm.

Solution:

Given that,
Area of Triangle = Area of square
Side of square = 30 cm
Altitude of triangle = 36 cm
Area of square = 30 x 30 = 900 cm²
Area of Triangle = Area of square
Area of Triangle = 900
½ x base x height = 900
½ x base x 36 = 900
base = 1800/36 = 50 cm
ˆ´ Side of the triangle is 50 cm.


17. The length of one of the diagonals of a field in the form of a quadrilateral is 52 m. The perpendicular distance of the other two vertices from the diagonal is 15 m and 10 m, find the area of the field.

Solution:

Given that,
Diagonal = 52 m
Altitudes h1 = 15, h2 = 10
Area of quadrilateral = ½ x diagonal (h1 + h2)
= ½ x 52 x (15 + 10)
= 26(25)
= 650 m²
Therefore, the quadrilateral area is 650 m².


18. The area of a right triangle is 156 sq units and one of its legs is 13 units, find the other leg?

Solution:

Given that,
Base = 13 units
Area of triangle = 156 sq units
½ x base x height = 156
½ x 13 x height = 156
height = 312/13 = 24.


19. ˆ† ABC is isosceles with AB = AC = 18 cm, BC = 12 cm. The height AD from A to BC is 7 cm. Find the area, perimeter of ˆ†ABC.

Solution:

Given that,
Sides of the triangle are AB = AC = 18 cm, BC = 12 cm
Height AD = 7 cm
ˆ†ABD + ˆ†ADC = ˆ†ABC
Area of ˆ†ABD = ½bh
= ½ x 18 x 7
= 9 x 7 = 63 cm²
Area of ˆ†ABC = Area of ˆ†ABD + ˆ†ADC
= 2 x 63 = 126 cm².


20. ˆ† ABC is an equilateral triangle with sides 28 cm, Find its perimeter and area?

Solution:

Given that,
Side of triangle = 28 cm
Perimeter = (28 + 28 + 28) = 84 cm
Area = (ˆš3/4)a²
= (ˆš3/4) x 28² = (ˆš3/4) x 784
= ˆš3 x 196 = 339.4
Therefore, perimeter, area of the equilateral trinagle is 84 cm, 339.4 cm².