For any two real numbers a and b, we define a R b if and only if `sin^2a+cos^2b=1`. The relation R is

For any two real numbers a and b,we define a R b if and only if sin^(2)a+cos^(2)b=1. The relation R is

For any real numbers theta and phi we define theta R phi if and only if sec^(2) theta - tan^(2) phi =1 the relation R is

On R,the set of real numbers,a relation rho is defined as a rho b if and only if 1+ab>0 Then

On the set R of real numbers we defined xPyi and only if xy<0. Then the relation P is Reflexive but not symmetric

Let S be set of all real numbers and let R be relation on S , defined by a R b hArr |a-b|le 1. then R is

Let S be set of all numbers and let R be a relation on S defined by a R b hArr a^(2)+b^(2)=1 then, R is

Let A =[-1,1] . Define a relation R on A as follows: a, b in A, aRb if and only if sin^(-1)(a) + cos^(-1)(b) = pi//2 , Then