Choose the correct answer:
Which of the following will be the angles of a triangle?
A. 35°, 45°, 90°
B. 26°, 58°, 96°
C. 38°, 56°, 96°
D. 30°, 55°, 90°
Formula used: Angle Sum Property = ∠A + ∠B + ∠C = 180°
Option A: 35° + 45° + 90° = 170°. Hence, this cannot be correct because sum of all the angles of triangle.
Option B: 26° + 58° + 96° = 180°. Hence, this is correct because sum of all the angles of triangle.
Option C: 38° + 56° + 96° = 190°. Hence, this cannot be correct because sum of all the angles of triangle.
Option D: 35° + 45° + 90° = 175°. Hence, this cannot be correct because sum of all the angles of triangle.
Choose the correct answer:
Which of the following statement is correct?
A. Equilateral triangle is equiangular.
B. Isosceles triangle is equiangular.
C. Equiangular triangle is not equilateral.
D. Scalene triangle is equiangular
Reason: All angles of an equilateral triangle are equal.
Choose the correct answer:
The three exterior angles of a triangle are 130°, 140°, x° then x° is
A. 90°
B. 100°
C. 110°
D. 120°
Angle Sum Property = ∠A + ∠B + ∠C = 180°[T1]
∠ DAC = 130° and ∠ ABE = 140°
∠ DAC + ∠ DAB = 180° (sum of the angle on a straight line at point is 180°)
∴ ∠DAB = 180° - ∠ DAC
⇒ ∠ DAB = 180° - 130° = 50°
Similarly,
∠ ABE + ∠ ABD = 180° (sum of the angle on a straight line at point is 180°)
∴ ∠ABD = 180° - ∠ ABE
⇒ ∠ DAB = 180° - 140° = 60°
∠ BDB’ = ∠ DAB + ∠ DBA
(if a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two interior opposite angles)
∠ x° = 50° + 60° = 110°
Hence, option C is correct.
Choose the correct answer:
Which of the following set of measurements will form a triangle?
A. 11 cm, 4 cm, 6 cm
B. 13 cm, 14 cm, 25 cm
C. 8 cm, 4 cm, 3 cm
D. 5 cm, 16 cm, 5 cm
Any Two sides of triangle together are greater than the third side.
Option A: AB + BC > AC = 11 + 4 > 6 = 15 > 6true
BC + AC > AB = 4 + 6 > 11 = 10 > 11not true
AC + AB > BC = 11 + 6 > 4 = 17 > 4 true.
∴, this cannot be true because only condition is satisfied.
Option B: AB + BC > AC = 13 + 14 > 25 = 27 > 25 true
BC + AC > AB = 14 + 25 > 13 = 39 > 13 true
AC + AB > BC = 25 + 13 > 14 = 38 > 13 true.
∴, this is true because all condition is satisfied.
Option C: AB + BC > AC = 8 + 4 > 3 = 12 > 3 true
BC + AC > AB = 4 + 3 > 8 = 7 > 8 not true
AC + AB > BC = 8 + 3 > 4 = 11 > 4 true.
∴, this cannot be true because only condition is satisfied.
Option D: AB + BC > AC = 5 + 16 > 5 = 21 > 5true
BC + AC > AB = 16 + 5 > 11 = 21 > 5 true
AC + AB > BC = 5 + 5 > 16 = 10 > 16 not true.
∴, this cannot be true because only condition is satisfied.
Choose the correct answer:
Which of the following will form a right-angled triangle, given that the two angles are
A. 24°, 66°
B. 36°, 64°
C. 62°, 48°
D. 68°, 32°
For the triangle to be right-angled triangle one angle is 90° and sum of the two angles should be 90°
Option A: 24° + 66° = 90°. This option is correct.
Option B: 36° + 64° = 100°. This option is not correct.
Option C: 62° + 48° = 110°. This option is not correct.
Option D: 68° + 32° = 100°. This option is not correct.
The angles of a triangle are (x – 35) °, (x – 20) ° and (x + 40) °.
Find the three angles.
Theorem 1: The sum of three angles is 180°.
i.e. ∠A + ∠B + ∠C = 180°
⇒ (x – 35)° + (x – 20)° + (x + 40)° = 180°
⇒ x – 35 + x – 20 + x + 40 = 180
⇒ 3x – 55 + 40 = 180
⇒ 3x – 15 = 180
⇒ 3x = 180 + 15
⇒ 3x = 195
⇒
⇒ x = 15
In Δ ABC, the measure of ∠A is greater than the measure of ∠ B by 24° . If exterior angle ∠C is 108°. Find the angles of the Δ ABC.
Theorem 2:
If a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two interior angle.
Let the ∠B be x.
∴ ∠ B = x
∴ ∠ A = ∠ B + 24°
Ext. [T2] ∠ C = ∠ B + ∠ A
⇒ 108° = x + x + 24°
⇒ 108° = 2x + 24°
⇒ 2x = 108° - 24°
⇒ 2x = 84°
⇒
⇒ x = 42°
The bisectors of ∠ B and ∠ C of a Δ ABC meet at O.
Show that BOC = 90o +
Theorem 1:
The sum of all three angles is 180°.
Let the ∠ B and ∠ C be 2x and 2y respectively.
In Δ ABC
∠A + ∠B + ∠C = 180° (Angle Sum Property)
⇒ ∠ A + 2x + 2y = 180°
⇒ 2x + 2y = 180° - ∠A
⇒ 2(x + y) = 180° - ∠ A
⇒
⇒ …(1)
In Δ OBC
∠OBC + ∠ OCB + ∠ BOC = 180° (Angle Sum Property)
⇒ x + y + ∠ BOC = 180°
⇒
⇒
⇒
Hence Proved.
Find the value of x° and y° from the following figures:
Theorem 2:
If a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two-interior angle.
Ext. ∠ B = ∠ A + ∠ C
⇒ y° = x° + 50° …(1)
Ext. ∠ B + 72° = 180°
⇒ Ext. ∠ B = 180° - 72°
⇒ Ext. ∠ B = 108°
⇒ y° = 108°
Put y = 108° in (1)
⇒ 108° = x° + 50°
⇒ x° = 108° - 50°
⇒ x° = 58°
Find the value of x° and y° from the following figures:
theorem 1: Sum of all the angles of triangle is 180°
∠ ACD + ∠ ACB = 180°
⇒ 5y° + y° = 180°
⇒ 6y° = 180°
⇒
⇒ y° = 30°
In Δ ABC
∠ A + ∠ B + ∠ C = 180°
⇒ x° + 4y° + y° = 180°
⇒ x° + 4 × 30° + 30° = 180°
⇒ x° + 120° + 30° = 180°
⇒ x° + 150° = 180°
⇒ x° = 180° - 150°
⇒ x° = 30°
Find the value of x° and y° from the following figures:
Theorem 2:
If a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two interior angle.
∠ C = ∠ B (Alternate interior angles)
⇒ x° = 42°
In Δ CDE
Ext. ∠ E = ∠ C + ∠ D
⇒ 82° = 42° + y°
⇒ y° = 82° - 42°
⇒ y° = 40°
Find the angles x°, y° and z° from the given figure.
Theorem 1: Sum of all the angles of triangles is 180°
If a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two interior angle.
In Δ ABC
∠ A + ∠ B + ∠ C = 180° (Angle Sum Property)
⇒ 101° + 26° + z° = 180°
⇒ 127° + z° = 180°
⇒ z° = 180° - 127°
⇒ z° = 53°
In Δ FBG
Ext. ∠ G = ∠ B + ∠ F
⇒ y° = 26° + 106°
⇒ y° = 132°
∠ AED + ∠ DEC = 180°
⇒ ∠ AED + 128° = 180°
⇒ ∠ AED = 180° - 128°
⇒ ∠ AED = 52°
In AED
Ext. ∠ D = ∠ A + ∠ C
⇒ x° = 101° + 52°
⇒ x° = 153°
Choose the correct answer:
In the isosceles ∆XYZ, given XY = YZ then which of the following angles are equal?
A. ∠X and ∠Y
B. ∠Y and ∠Z
C. ∠Z and ∠X
D. ∠X, ∠Y and ∠Z
Reason: Angles opposite XY and YZ are angle X and Z respectively.[T3]
Choose the correct answer:
In Δ ABC and ∆DEF, ∠B = ∠E, AB = DE, BC = EF. The two triangles are congruent under _____ axiom
A. SSS
B. AAA
C. SAS
D. ASA
option C.
If any two sides and the included angle of a triangle are respectively equal to any two sides and the included angles of another triangle then the two triangles are congruent.
Choose the correct answer:
Two plane figures are said to be congruent if they have
A. the same size
B. the same shape
C. the same size and the same shape
D. the same size but not same shape
Reason: If two geometrical figures are identical in shape and size then they are said to be congruent.
Choose the correct answer:
In a triangle ABC, ∠A = 40o and AB = AC, then ABC is _____ triangle.
A. a right angled
B. an equilateral
C. an isosceles
D. a scalene
In a triangle, When two sides are equal then triangle are said to be an isosceles triangle.
Choose the correct answer:
In the triangle ABC, when ∠A = 90o the hypotenuse is ______
A. AB
B. BC
C. CA
D. None of these
Choose the correct answer:
In the Δ PQR the angle included by the sides PQ and PR is
A. ∠P
B. ∠Q
C. ∠R
D. None of these
Choose the correct answer:
In the figure, the value of x° is_______
A. 80o
B. 100o
C. 120o
D. 200o
In Δ ABD and Δ CBD
AB = CB = 2cm
AD = CD = 3cm
BD = BD = common
∴ Δ ABD ≅ Δ CBD
∴ ∠ A = ∠ C
⇒ 100° = x°
Hence, option B is correct.
In the figure, ABC is a triangle in which AB = AC. Find x° and y°.
Theorem 2:
If a side of a triangle is produced, the exterior angle so formed, is equal to the sum of the two interior angle.
∠ ACE + ∠ ACB = 180°
⇒ x + 48° + x° = 180°
⇒ 2x + 48° = 180°
⇒ 2x = 180° - 48°
⇒ 2x = 132°
⇒
⇒ x = 66°
Ext. ∠ A = ∠ B + ∠ C
⇒ y° = x° + x°
⇒ y° = 2x°
⇒ y° = 2 × 66°
⇒ y° = 132°
In the figure, Find x°.
Theorem 1: Sum of all the angles of the triangles is 180°
In Δ COB
OD = DC
∴ ∠ COD = ∠DCO = 40°
In Δ AOB
OA = OB (Given)
∴ ∠ OAB = ∠ OBA = x°
∠ OAB + ∠ OBA + ∠ AOB = 180° (Angle Sum Property)
⇒ x° + x° + ∠ AOB = 180°
⇒ 2x° + ∠ AOB = 180°
⇒ ∠ AOB = 180° - 2x°
∠ AOB = ∠ COD (opposite angles are equal)
180 – 2x° = 40°
⇒ 180° = 40 + 2x°
⇒ 180° - 40° = 2x°
⇒ 140° = 2x°
⇒
⇒ x = 70°
In the figure ∆PQR and ∆SQR are isosceles triangles. Find x°.
Theorem 1: Sum of all the angles of triangles is 180°
Let ∠ PQR be y
In Δ SQR,
SQ = SR
∴ ∠ SQR = ∠ SRQ
∠ SQR + ∠ SRQ + ∠ QSR = 180° (Angle Sum Property)
⇒ 2 ∠ SQR + 70° = 180°
⇒ 2 ∠ SQR = 180° - 70°
⇒ 2 ∠ SQR = 110°
⇒
⇒ ∠ SQR = 55° = ∠ SRQ
In Δ PQR,
∠ PQR + ∠ PRQ + ∠ RPQ = 180°
⇒ y + y + 40° = 180°
⇒ 2y + 40° = 180°
⇒ 2y = 180° - 40°
⇒ 2y = 140°
⇒
⇒ y = 70°
∠ PQR = ∠ PQS + ∠ SQR
⇒ 70° = x° + 55°
⇒ x° = 70° - 55°
⇒ x° = 15°
In the figure, it is given that BR = PC and ∠ACB= ∠QRP and AB ∥ PQ. Prove that
AC = QR.
Given: BR = PC and ∠ ACB = ∠ QRP , AB || PQ
To Prove: AC = QR
Proof:
In Δ ABC, we have
BC = BR + RC
In Δ PQR
PR = PC + RC
But , BR = PC [Given]
So, BC = PC + RC and PR = BR + RC
⇒ BC = PR
So, in Δ ABC and Δ PQR, we have
∠ ACB = ∠ QRP [Given]
BC = PR [Proved Above]
∠ ABC = ∠ QPR [AB || PQ, alternate interior angles]
Thus, Δ ABC ≅ Δ PQR [Angle – Side – Angle]
∴ AC = QR [C. P. C. T]
In the figure, AB = BC = CD, ∠A = xo. Prove that ∠DCF = 3∠A.
Given: AB = BC = CD and ∠ A = x°
To Prove: ∠ DCF = 3 ∠ A
Proof:
In Δ ABC
AB = BC [Given]
∴ ∠ A = ∠ C = x°
Now,
∴ ext. ∠ B = ∠ A + ∠ C
⇒ Ext. ∠ B = x° + x°
⇒ Ext. ∠ B = 2x°
In Δ CBD
BC = CD [Given]
∴ ∠ B = ∠ D = 2x°
Now,
In Δ ADC,
Ext. ∠ DCF = ∠ CDA + ∠ CAD
⇒ ∠ DCF = 2x + x
⇒ ∠ DCF = 3x
⇒ ∠ DCF = 3 ∠ A [ ∠ A = x°, Given]
Hence Proved.
Find x°, y°, z° from the figure, where AB = BD, BC = DC and ∠DAC 30o.
Theorem 1: Sum of all the angles in the triangle is 180°.
In Δ ABD,
We know that, AB = BD
∴ ∠ A = ∠ D
⇒ 30° = x°
Hence, ∠ A + ∠ B + ∠ C = 180°
⇒ 30° + ∠ B + 30° = 180°
⇒ ∠ B + 60° = 180°
⇒ ∠ B = 180° - 60°
⇒ ∠ B = 120°
∠ DBA + ∠ DBC = 180° (Sum of adjacent angles is 180°)
⇒ 120° + y° = 180°
⇒ y° = 180° - 120°
⇒ y° = 60°
In Δ DBC
We know that, BC = DC
∴ ∠ B = ∠ D
⇒ y° = z°
⇒ 60° = z°
In the figure, ABCD is a parallelogram. AB is produced to E such that AB = BE. AD produced to F such that AD = DF. Show that ∆FDC ≡ ∆CBE.
Given: Parallelogram ABCD and AB = BE and AD = FD
To prove: Δ FDC ≡ ΔCBE
Construction: Join DB
Proof:
We know that,
AB = DC [ opposite sides of parallelogram]
BE = DC [AB = BE, because B is the midpoint of AE]
Similarly,
AD = BC [ opposite sides of parallelogram]
DF = BC [ AD = DF, because B is the midpoint of AE]
Now, AD||BC and AB
∠ A = ∠ B [corresponding angles] …(1)
Now, AB||CD and AD
∠ A = ∠ D [corresponding angles] …(2)
∴ ∠ B = ∠ D (From 1 and 2)
In Δ FDC and Δ CBE
FD = CB [Proved Above]
DC = BE [Proved Above]
∠ D = ∠ B [Proved Above]
Thus, Δ FDC ≡ Δ CBE
Hence Proved.
In figure, BO bisects ∠ABC of ∆ABC. P is any point on BO. Prove that the perpendicular drawn from P to BA and BC are equal.
Given: A Δ ABC in which BO is bisector of ∠ABC
Also, we have PD ⊥ AB and PE ⊥ BC
To Prove: PD = PE
Proof:
In Δ PBD and Δ PBE
PB = PB [common]
∠ PBD = ∠ PBE [ given]
∠ PDB = ∠ PEB = 90° [Given]
Thus, Δ PBD ≅ Δ PBE [Angle – Angle – Side]
∴ PD = PE
Hence Proved.
The Indian Navy flights fly in a formation that can be viewed as two triangles with common side. Prove that ∆SRT ≡ ∆QRT, if T is the midpoint of SQ and SR = RQ.
Given: T is the mid-point of SQ and SR = RQ
To Prove: Δ SRT ≅ Δ QRT
Proof
In Δ SRT and QRT
RT = RT [common]
ST = QT [T is the mid-point of SQ]
SR = RQ [Given]
Thus, Δ SRT ≅ Δ QRT [Side – Side – Side]
Hence Proved.