If `B={x |x` is an even number},
`C={x|` x is an odd numbers}, then `B nn C=`

If C={x:x is an odd number}, D = {x:x is a prime number}, then C nn D =

If A = {x|x is natural number}, B={x| is an even number}, A nnB=

Which of the following sets are equal? : P = {x | x in W, x is a multiple of 2} : Q = {x | x is an even number, x > 1} : R = {x | 2x = n, n in N}

If A = {x| x is a multiple of 2, x in N} B = {x| x is a multiple of 5, x in N }, C= {x| x is multiple of 10, x in N}, then (A nn B) nn C=

If X sube Y, then (X nn Y) nn X =

Decide which of the following are equal sets and which are not? Justify your answer. A = {x |3x - 1 =2} B = {x |x is a natural number but x is neither prime nor composite} C= {x |x in N, x < 2} .

If A = {x//x is a multiple of 2,x in N }, B={x| x is a multiple of 5,x in N}, C= {x|x is multiple of 10, x in N}, then A nn(B nn C)=

Let A = {6, 8}, B = {1, 3, 5} Show that R1 = {(a, b) / a in A, b in B, a - b is an even number } is a null relation. R2 = { (a, b) / a in A, b in B, a - b is odd number } is an universal relation

Decide whether set A and set B are equal sets.A={x|x in N,x<2},B={x|x is a natural number but x is neither prime nor composite}.