Question

R={( a,b) : triangle A equal B is an equivalence relation ,prove that​

Answer 1

Step-by-step explanation:

R={(T

1

,T

2

):T

1

is similar toT

2

}

R is reflexive since every triangle is similar to itself.

Further, if (T

1

,T

2

)∈R, then T

1

is similar to T

2

.

⇒T

2

is similar to T

1

.

⇒(T

2

,T

1

)∈R

∴R is symmetric.

Now,

Let (T

1

,T

2

),(T

2

,T

3

)∈R.

⇒T

1

is similar to T

2

and T

2

is similar to T

3

.

⇒T

1

is similar to T

3

.

⇒(T

1

,T

3

)∈R

∴R is transitive.

Thus, R is an equivalence relation.

Now, we can observe that:

6

3

=

8

4

=

10

5

(=

2

1

)

∴ The corresponding sides of triangles T

1

and T

3

are in the same ratio.

Then, triangle T

1

is similar to triangle T

3

.

Hence, T

1

is related to T

3

.