PSEB 7th Class Maths Solutions Chapter 6 Triangles Ex 6.3

Punjab State Board PSEB 7th Class Maths Book Solutions Chapter 6 Triangles Ex 6.3 Textbook Exercise Questions and Answers.

PSEB Solutions for Class 7 Maths Chapter 6 Triangles Ex 6.3

1. Find the length of the unknown side in each of following figures

Question (i).

Answer:
Take a = 3 cm, b = 4 cm and unknown side = c
By Pythagoras Theorem
c² = a² + b²
c² = (3)² + (4)²
c² = 9 + 16
c² = 25
∴ c = \(\sqrt{25}\)
c = 5
Thus, the length of unknown side = 5 cm.

Question (ii).

Answer:
Take a = 15 cm, b = 20 cm
By Pythagoras Theorem
c² = a² + b²
∴ c² = (15)² + (20)²
c² = 225 + 400
c² = 625
∴ c = \(\sqrt{625}\)
c = 25
Thus, the length of unknown side = 5 cm

2. Which of the following can be the sides of a right triangle ?
(i) 4 cm, 5 cm, 7 cm
(ii) 1.5 cm, 2 cm, 2.5 cm
(iii) 2 cm, 2 cm, 5 cm
In the case of right angled triangles, identify the right angles.
Solutions:
(i) Let in ΔABC, the longest side is AB = 7 cm

(BC)² + (AC)²
= (4)² + (5)²
= 16 + 25 = 41
(BC)² + (AC)² = 41
Also AB² = (7)² = 49
Since AB² ≠ (BC)² + (AC)²
∴ The triangles with the given sides is not a right triangle.

(ii) Let in ΔABC, the longest side is AB = 2.5 cm

(AB)² = (2.5)² = 6.25 ….(1)
(BC)² + (AC)²
= (1.5)² + (2)²
= 2.25 + 4
= 6.25
∴ (BC)² + (AC)² = 6.25 ….(2)
From (1) and (2)
(AB)² = (BC)² + (AC)²
Therefore, the given triangle is a right triangle.
The angle opposite to the longest side is right angle.

(iii) Let in ΔABC, the longest side is AB = 5 cm

(AB)² = (5)²
(AB)² = 25 ….(1)
(BC)² + (AC)² = (2)² + (2)²
(BC)² + (AC)² = 4 + 4
(BC)² + (AC)² = 8 …..(2)
From (1) and (2)
(AB)² ≠ (BC)² + (AC)²
Therefore the triangle whose sides are 5 cm, 2 cm and 2 cm is not a right triangle.

3. Find the area and the perimeter of the rectangle whose length is 15 cm and the length of one diagonal is 17 cm.
Solution:
Let ABCD be a rectangle with length AB = 15 cm and diagonal AC = 17 cm.
In ΔABC, ∠B = 90° (Each angle of a rectangle)

By Pythagoras Theorem,
(AC)² = (AB)² + (BC)²
(17)² = (15)² + (BC)²
289 = 225 + (BC)²
(BC)² = 289 – 225 = 64
BC = 8 cm
Area of rectangle ABCD
= AB × BC
= 15 cm × 8 cm
= 120 cm²
Perimeter of rectangle ABCD = 2(AB + BC)
= 2(15 cm + 8 cm)
= 2(23 cm) = 46 cm²

4. A 15 m long ladder reached a window 12 m high from the ground on placing it against a wall at a distance, find the distance of the foot of the ladder from the wall.

Solution:
Let AB be the ladder and BC be the distance of the foot of the ladder from the wall then AB = 15 m and AC = 12 m

By Pythagoras Theorem,
AB² = BC² + AC²
(15)² = BC² + (12)²
225 = BC² + 144
BC² = 225 – 144
BC² = 81
BC =9
Hence the distance of the foot of the ladder from the wall is 9 m.

5. The side of a rhombus is 5 cm. If the length of one of the diagonals of the rhombus is 8 cm, then find the length of the other diagonal.
Solution:
Let ABCD be a rhombus with side AB = 5 cm and diagonal AC = 8 cm
Let diagonal AC and BD bisect each other at O.
Then OA = OC = \(\frac {8}{2}\) cm = 4 cm
The diagonals of a rhombus bisect each other at right angle

∴ In right angled ΔAOB,
AO = 4 cm, AB = 5 cm
By Pythagoras Theorem,
OA² + OB² = AB²
(4)² + OB² = (5)²
16 + OB² = 25
OB² = 25 – 16 = 9
OB = 3 cm
Diagonal BD = 2 × OB = 2 × 3cm = 6cm
Therefore other diagonal of rhombus = 6 cm.

6. A right triangle is isosceles. If the square of the hypotenuse is 50 m, what is length of each of its sides ?
Solution:
Let ΔABC is a right isosceles triangle in which (AC)² = 50 m and AB = AC

∴ By Pythagoras Theorem
AB² + BC² = AC²
∴ AB² + AB² = AC²
2AB² = 50
AB² = 25
AB = 5
Therefore length of each equal side = 5m.

7. ΔABC is a triangle right angled at C if AC = 8 cm and BC = 6 cm, find AB.
Solution:
In right angled triangle ABC right angle at C
AC = 8 cm and BC = 6 cm

By Pythagoras Theorem
AB² = AC² + BC²
AB² = (8)² + (6)²
AB² = 100
AB = 10 cm.

8. State whether the following triplets are Pythagorean or not.

Question (i).
(5, 7, 12)
Solution:
Let a = 5, b = 1, c = 12
∴ c² = (12)² = 144
a² + b² = (5)² + (7)²
= 25 + 49 = 74
∴ a² + b² ≠ c²
∴ (5, 7, 12) is not a pythagorean triplet.

Question (ii).
(3, 4, 5)
Solution:
Let a = 3, b = 4, c = 5
∴ a² + b² = (3)² + (4)²
= 9 + 16 = 25
c² = (5)² = 25
∴ c² = a² + b²
∴ (3, 4, 5) is a pythagorean triplet

Question (iii).
(8, 9, 10)
Solution:
Let a = 8, b = 9, c = 10
∴ a² + b² = (8)² + (9)²
= 64 + 81 = 145
c² = (10)² = 100
c² ≠ a² + b²
Therefore (8, 9, 10) is not a pythagorean triplet.

Question (iv).
(5, 12, 13)
Solution:
Let a = 5, b = 12, c = 13
∴ a² + b² = (5)² + (12)²
= 25 + 144 = 169
c² = (13)² = 169
a² + b² ≠ c²
Therefore (5, 12, 13) is a pythagorean triplet.

9. Multiple Choice Questions :

Question (i).
In a ΔABC, if ∠A = 40° and ∠B = 55° then ∠C is
(a) 75°
(b) 80°
(c) 95°
(d) 85°
Answer:
(d) 85°

Question (ii).
If the angles of a triangle are 35°, 35° and 110°, then it is
(a) an isosceles triangle
(b) an equilateral triangle
(c) a scalene triangle
(d) right angled triangle
Answer:
(a) an isosceles triangle

Question (iii).
A triangle can have two
(a) right angles
(b) obtuse angles
(c) acute angles
(d) straight angles
Answer:
(c) acute angles

Question (iv).
A triangle whose angles measure 35°, 55° and 90° is
(a) acute angled
(b) right angled
(c) obtuse angled
(d) isosceles
Answer:
(b) right angled

Question (v).
A triangle is not possible whose angles measure
(a) 40°, 65°, 75°
(b) 50°, 56°, 74°
(c) 72°, 63°, 45°
(d) 67°, 42°, 81°
Answer:
(d) 67°, 42°, 81°

Question (vi).
A triangle is not possible with sides of lengths (in cm)
(a) 6, 4, 10
(b) 5, 3, 7
(c) 7, 8, 9
(d) 3.6, 5.4, 8
Answer:
(a) 6, 4, 10

Question (vii).
In a right angled triangle, the length of two legs are 6 cm and 8 cm. The length of the hypotenuse is
(a) 14 cm
(b) 10 cm
(c) 11 cm
(d) 12 cm
Answer:
(b) 10 cm