Let L be the set of all lines in XY plane and R be the relation in L defined as R = {(L 1 , L 2 ): L 1 is parallel to L 2 }. Show that R is an equivalence relation. Find the set of all lines related to the line y = 2x + 4.

Question

Philoid · Accepted Answer

It is given that the relation in L defined as

R = {(L₁, L₂): L₁ is parallel to L₂}

R is reflexive as any line L₁ is parallel to itself

⇒ (L₁, L₂) ϵ R

Now, Let (L₁, L₂) ϵ R

⇒ L₁ is parallel to L₂.

⇒ L₂ is parallel to L₁.

⇒ (L₂, L₁) ϵ R

Therefore, R is symmetric.

Now, Let (L₁, L₂), (L₂, L₃) ϵ R

⇒ L₁ is parallel to L₂. Also, L₂ is parallel to L₃.

⇒ L₁ is parallel to L₃.

⇒ (L₁, L₃) ϵ R

Therefore, R is transitive.

Therefore, R is an equivalence relation.

The set of all lines related to the line y = 2x + 4 is the set of all lines that are parallel to the line

y = 2x + 4

Slope of line y = 2x + 4 is m = 2

We know that parallel lines have the same slopes.

The line parallel to the given line is of the form y = 2x + c where, c ϵ R.

Therefore, the set of all lines related to the given line by y = 2x + c, where c ϵ R.

Let L be the set of all lines in XY plane and R be the relation in L defined asR = {(L1, L2): L1 is parallel to L2}. Show that R is an equivalence relation. Find the set of all lines related to the line y = 2x + 4.

Let L be the set of all lines in XY plane and R be the relation in L defined as
R = {(L₁, L₂): L₁ is parallel to L₂}. Show that R is an equivalence relation. Find the set of all lines related to the line y = 2x + 4.