If ΔABC and ΔDEF are so related that , then which of the following is true? 1. ∠A = ∠E and ∠B = ∠D 2. ∠B = ∠F and ∠C = ∠D 3. ∠A = ∠F and ∠B = ∠D 4. ∠C = ∠F and ∠A = ∠D

Question

KnowledgeBoat · Accepted Answer

Given, ΔABC ΔDEF BY SSS theorem. Side AB corresponds to side FD. Therefore, vertex A corresponds to vertex F and vertex B corresponds to vertex D. Side BC corresponds to side DE. Therefore, vertex B corresponding to D. It also implies vertex C corresponds to vertex E. Since the triangles are similar, the corresponding angles are also similar, ∠A = ∠F and ∠B = ∠D Hence, option 3 is the correct option.

Mathematics

If ΔABC and ΔDEF are so related that $\dfrac{AB}{FD} = \dfrac{BC}{DE} = \dfrac{CA}{EF}$ , then which of the following is true?
∠A = ∠E and ∠B = ∠D
∠B = ∠F and ∠C = ∠D
∠A = ∠F and ∠B = ∠D
∠C = ∠F and ∠A = ∠D

Similarity

Answer

Related Questions

If in ΔABC and ΔPQR, we have $\dfrac{AB}{QR} = \dfrac{BC}{PR} = \dfrac{CA}{PQ}$ , then:
ΔPQR ∼ ΔCAB
ΔPQR ∼ ΔABC
ΔBCA ∼ ΔPQR
ΔCBA ∼ ΔPQR

In the given figure, AB = 24 cm, AC = 18 cm, DE = 12 cm, DF = 9 cm and ∠BAC = ∠EDF. Then ΔABC ∼ ΔEDF by the condition :
AAA
SAS
SSS
AAS

In the given figure, PQ is parallel to TR, then by using condition of similarity:
$\dfrac{PQ}{RT} = \dfrac{OP}{OT} = \dfrac{OQ}{OR}$
$\dfrac{PQ}{RT} = \dfrac{OP}{OR} = \dfrac{OQ}{OT}$
$\dfrac{PQ}{RT} = \dfrac{OR}{OP} = \dfrac{OQ}{OT}$
$\dfrac{PQ}{RT} = \dfrac{OP}{OR} = \dfrac{OT}{OQ}$

D and E are points on the sides AB and AC respectively of ΔABC. In which of the following cases DE ∥ BC?
AD = 3 cm, BD = 8 cm, AC = 8 cm, AE = 3 cm
AD = 5 cm, BD = 6 cm, AE = 6 cm, CE = 5 cm
AB = 18 cm, AD = 8 cm, AE = 12 cm, EC = 15 cm
none of these

Mathematics

If ΔABC and ΔDEF are so related that ABFD=BCDE=CAEF\dfrac{AB}{FD} = \dfrac{BC}{DE} = \dfrac{CA}{EF}FDAB​=DEBC​=EFCA​, then which of the following is true?∠A = ∠E and ∠B = ∠D∠B = ∠F and ∠C = ∠D∠A = ∠F and ∠B = ∠D∠C = ∠F and ∠A = ∠D