Home
Class 12
MATHS
Let O be the origin. We define a relatio...

Let `O` be the origin. We define a relation between two points `P` and `Q` in a plane if `O P=O Q` . Show that the relation, so defined is an equivalence relation.

Promotional Banner

Similar Questions

Explore conceptually related problems

Let O be the origin. We define a relation between two points P and Q in a plane if O P=O Qdot Show that the relation, so defined is an equivalence relation.

Let O be the origin. We define a relation between two points P and Q in a plane if O P=O Qdot Show that the relation, so defined is an equivalence relation.

Let O be the origin.We define a relation between two points P and Q in a plane if OP=OQ. Show that the relation,so defined is an equivalence relation.

Let O be the origin.We define a relation between two points P and Q in a plane if OP=OQ. Show that the relation,so defined is an equivalence relation.

Define an equivalence relation.

Define an equivalence relation.

Define an equivalence relation.

Let O be the origin. We define a relation S between two points P and Q in a plane such that OP=OQ. Show that the relation S is an equivalence relation.

If relation R defined on set A is an equivalence relation, then R is

Two points P and Q in a plane are related if OP=OQ, where is a fixed point.This relation is :