Q 1 – What is the difference between a triangle and triangular region ?
The triangle is defined as a plane figure which is formed by three line segments which are non-parallel whereas a triangular region is the region which is inside a triangle.
Q 2 – If the angles of a triangle are in the ratio 1: 2: 3 determine three angles.
Ratio in three angles of a triangle = 1 : 2 : 3
Let first angle = x
Then second angle = 2x
and third angle = 3x
∴ x+2x + 3x = 180º ( sum of angles of a triangle)
⇒6x = 180º ⇒ x 180º/6 =30º
∴ First angle = x=30º
Second angle = 2x = 2 × 30º =60º
and third angle = 3x = 3 × 30º=90º
∴ Angles are 30º,60º,90º
Q 3 – Two angles of a triangle are measures 75 and 35 find the measures of the third angle.
→ ∠ A =75
→ ∠ B = 35
→ ∠ c = x
As we know that Sum of all the angles of a triangle is 180°.So ,
→ ∠ A +∠ B +∠ c = 180
→ 75 + 35 + x = 180
→ 110 + x = 180
→ x = 180 – 110
→ x = 70
Q 4 – Each of the two equals angles of a triangle is twice the third angle. Find the angles of the triangles.
As per the fact, the sum of all angles of triangle is 180°. Also, the two angles of isosceles triangle are equal.
Let the angle be x. So, the mathematical expression will be –
2x + 2x + x = 180°
5x = 180°
x = 36°
The two same angles of is osceles triangle = 2x
Two same angles = 2*36°
Two same angles = 72°
Angle of isosceles triangle = x
Angle of isosceles triangle = 36°
Thus, angles of is osceles triangle are 36°, 72° and 72°
Q 5 – One of the angles of a triangle is 130 and the other two angles are equals. What is the measures of each of those equal angles ?
Ans. Given one of the angles of a triangle is 130o
Also given that remaining two angles are equal
So let the second and third angle be x
We know that sum of all the angles of a triangle = 180o
130o + x + x = 180o
130o + 2x = 180o
2x = 180o – 130o
2x = 50o
x = 50/2
x = 25o
Therefore the two other angles are 25o each
Q 6 – The angles of a triangle are arranged in ascending order of magnitude. If the difference between two consecutive angles is 10o. Find the three angles.
. Given that angles of a triangle are arranged in ascending order of magnitude
Also given that difference between two consecutive angles is 10o
Let the first angle be x
Second angle be x + 10o
Third angle be x + 10o + 10o
We know that sum of all the angles of a triangle = 180o
x + x + 10o + x + 10o +10o = 180o
3x + 30 = 180
3x = 180 – 30
3x = 150
x = 150/3
x = 50o
First angle is 50o
Second angle x + 10o = 50 + 10 = 60o
Third angle x + 10o +10o = 50 + 10 + 10 = 70o
Q 7 – If one angle of a triangle is equal to the sum of the other two, show that the triangle is a right triangle.
Given that one angle of a triangle is equal to the sum of the other two
Let the measure of angles be x, y, z
Therefore we can write above statement as x = y + z
x + y + z = 180o
Substituting the above value we get
x + x = 180o
2x = 180o
x = 180/2
x = 90o
Q 8 – If one angle is 90o then the given triangle is a right angled triangle If one angle of a triangle is 60o and the other two angles are in the ratio 1: 2, find the angles.
Given that one of the angles of the given triangle is 60o.
Also given that the other two angles of the triangle are in the ratio 1: 2.
Let one of the other two angles be x.
Therefore, the second one will be 2x.
We know that the sum of all the three angles of a triangle is equal to 180o.
60o + x + 2x = 180o
3x = 180o – 60o
3x = 120o
x = 120o/3
x = 40o
2x = 2 × 40o
2x = 80o
Hence, we can conclude that the required angles are 40o and 80o.
Q 9 – In △ABC, ∠A = 100 , AD bisects ∠A and AD BC. Find ∠B.
Q 10 – In △ABC, if 3∠A = 4∠B = 6∠C, calculate the angles.
. We know that for the given triangle, 3∠A = 6∠C
∠A = 2∠C ……. (i)
We also know that for the same triangle, 4∠B = 6∠C
∠B = (6/4) ∠C …… (ii)
We know that the sum of all three angles of a triangle is 180o.
Therefore, we can say that:
∠A + ∠B + ∠C = 180o (Angles of △ABC)…… (iii)
On putting the values of ∠A and ∠B in equation (iii), we get:
2∠C + (6/4) ∠C + ∠C = 180o
(18/4) ∠C = 180o
∠C = 40o
From equation (i), we have:
∠A = 2∠C = 2 × 40
∠A = 80o
From equation (ii), we have:
∠B = (6/4) ∠C = (6/4) × 40o
∠B = 60o
∠A = 80o, ∠B = 60o, ∠C = 40o
Therefore, the three angles of the given triangle are 80o, 60o, and 40o
Q 11 – In Fig., ∆ABC is right angled at A, Q and R are points on line BC and P is a point such that QP ∥ AC and RP ∥ AB. Find ∠P
In the given triangle, AC parallel to QP and BR cuts AC and QP at C and Q, respectively.
∠QCA = ∠CQP (Alternate interior angles)
Because RP parallel to AB and BR cuts AB and RP at B and R, respectively,
∠ABC = ∠PRQ (alternate interior angles).
We know that the sum of all three angles of a triangle is 180o.
Hence, for ∆ABC, we can say that:
∠ABC + ∠ACB + ∠BAC = 180o
∠ABC + ∠ACB + 90o = 180o (Right angled at A)
∠ABC + ∠ACB = 90o
Using the same logic for △PQR, we can say that:
∠PQR + ∠PRQ + ∠QPR = 180o
∠ABC + ∠ACB + ∠QPR = 180o (∠ACB = ∠PQR and ∠ABC = ∠PRQ)
Or,
90o+ ∠QPR =180o (∠ABC+ ∠ACB = 90o)
∠QPR = 90o
Q 12 – In the six cornered figure, AC, AD and AE are joined. Find ∠FAB + ∠ABC + ∠BCD + ∠CDE + ∠DEF + ∠EFA.
Therefore in ∆ABC, we have
∠CAB + ∠ABC + ∠BCA = 180° …….. (i)
In△ ACD, we have
∠DAC + ∠ACD + ∠CDA = 180° …….. (ii)
In △ADE, we have
∠EAD + ∠ADE + ∠DEA =180° ………. (iii)
In △AEF, we have
∠FAE + ∠AEF + ∠EFA = 180° ………. (iv)
Adding (i), (ii), (iii), (iv) we get
∠CAB + ∠ABC + ∠BCA + ∠DAC + ∠ACD + ∠CDA + ∠EAD +
∠ADE + ∠DEA + ∠FAE +
∠AEF +∠EFA = 720°
Therefore ∠FAB + ∠ABC + ∠BCD + ∠CDE + ∠DEF + ∠EFA =
720°
Q 13 – One of the exterior angles of a triangle is 80 and the interior opposite angles are on the ratio 3 : 5 find the angles of the triangle.
Given: Exterior angle =80∘
Ratio of opposite interior angles =3:5
Let the interior angles be 3x and 5x
⇒80=3x+5x [Exterior angle is equal to the sum of interior opposite angles.]
⇒80=8x
⇒x=10
The two interior angles are 3×10=30∘, and 5×10=50∘
The other angle =180−(30+50)=100 [Angle sum Property]
Hence, all three angles of the given triangle are 30∘,50∘,100∘
Q 14 – Two poles of height 6m and 11m stands on a plane ground, if the distance between their feet is 12m. Find the distance between their tops. (Hint: Find the hypotenuse of a right triangle having the sides (11 – 6) m = 5 and 12 m)
Let AB and CD be the poles of height 6m and 11m.
Therefore, CP = 11 – 6 = 5m
From the figure, it can be observed that AP = 12m
By Pythagoras theorem for ΔAPC, we get,
AP2 = PC2 + AC2
(12m)2 + (5m)2 = (AC)2
AC2 = (144+25) m2 = 169 m2
AC = 13m
Therefore, the distance between their tops is 13 m.
Q 15 – In Fig. AD and CF are respectively perpendiculars to sides BC and AB of ABC. If ∠FCD = 50 , Find ∠BAD.
As we know the total of all three angle of a triangle = 180
FCB
∠ FCB + ∠ CBF + ∠ BFC = 180
50 + ∠ CBF + 90 =180
∠ CBF = 180 – 50 – 90 = 40
Applying same way for ABD,
∠ ABD + ∠ BDA + ∠ BAD = 180
∠ BAD = 180 – 90 – 40 = 50
Q 16 – An exterior angle of a triangle is 110 and one of the interior opposite angles is 30 . Find the other two angles of the triangles.
In the diagram, PQR is a Triangle.
∴ ∠a + 110° = 180° ❪Linear pair❫
⇒ ∠a = 180° – 110°
⇒ ∠a = 70°
Hence, ∠a = 70°.
∴ ∠P + ∠Q + ∠R = 180°
❪Sum of ∠s of a Triangle = 180°❫
⇒ ∠P + 30° + ∠a = 180°
⇒ ∠P + 30° + 70° = 180°
⇒ ∠P + 100° = 180°
⇒ ∠P = 180° – 100°
⇒ ∠P = 80°
Hence, ∠P = 80°.
Therefore, the other two angles of the triangle are 70° and 80°.
Q 17 – In a ABC, AD is the altitude from A such that AD = 12 cm, BD = 9 cm and DC = 16 cm. Examine if ABC is right angled at A.
Consider △ADC,
∠ADC = 90o (AD is an altitude on BC) Using the Pythagoras theorem, we get
122 + 162 = AC2
AC2 = 144 + 256
= 400
AC = 20 cm
Again consider △ADB,
∠ADB = 90o (AD is an altitude on BC) Using the Pythagoras theorem, we get
122 + 92 = AB2
AB2 = 144 + 81 = 225
AB = 15 cm
Consider △ABC,
BC2 = 252 = 625
AB2 + AC2 = 152 + 202 = 625
AB2 + AC2 = BC2
Because it satisfies the Pythagoras theorem, therefore △ABC is right angled at A.
Q 18 – One of the exterior angles of a triangle is 80 and the interior opposite angles are equal to each other. What is the measure of these two angles?
Let us assume that A and B are the two interior opposite angles.
We know that ∠A is equal to ∠B.
We also know that the sum of interior opposite angles is equal to the exterior angle.
Therefore from the figure we have,
∠A + ∠B = 80
∠A +∠A = 80 (because ∠A = ∠B)
2∠A = 80
∠A = 40/2 =40
∠A= ∠B = 40
Thus, each of the required angles is of 40.
Q 19 – A student when asked to measure two exterior angles of ABC observed that the exterior angles at A and B are of 103 and 74 respectively. Is this possible? Why or why not?
We know that sum of internal and external angle is equal to 180
Internal angle at A + External angle at A = 180
Internal angle at A + 103 =180
Internal angle at A = 77
Internal angle at B + External angle at B = 180
Internal angle at B + 74 = 180
Internal angle at B = 106
Sum of internal angles at A and B = 77 + 106 = 183
It means that the sum of internal angles at A and B is greater than 180, which cannot be possible.