Let `A = {x in Z:|x| <= 3}, B={y in Z : |y| <= 3}`. The number of relations from A to B is

Let sets R and T be defined as R = {x in Z|x is divisible by 2} T = {x in Z |x is divisible by 6}. Then, T subset R

Let sets R and T be defined as R = {x in Z|x is divisible by 2} T = {x in Z |x is divisible by 6}. Then, T subset R

Let A = {x: x in Z^(+)}, B = { x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : A nn B .

Let A = {x: x in Z^(+) } , B = {x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : A nn C .

Let A = {x: x in Z^(+) } , B = {x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : A nn D .

Let A = {x: x in Z^(+) } , B = {x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : B nn C .

Let A = {x: x in Z^(+) } , B = {x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : C nn D .

Let A = {x: x in Z^(+) } , B = {x:x is a multiple of 3, x in Z} , C = {x:x is a negative integer} , D = {x:x is an odd integer} . Find : B nn D .

Let A={x in Z:0<=x<=12}. show that R={(a,b):a,b inbar(A),|a-b|is-:isib<=by4} is an equivalence relation.Find the set of all elements related to 1. Also write the equivalence class [2]

Let sets R and T be defined as R= {x in Z|x is divisible by 2} T= {x in Z| x is divisible by 6}. Then T sub R .