Q10

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(i) [BB] A = R?; R = {((x, y), (u, v)) | x+y <u+v}. (i) A = N; (a, b) e R if and only if is an integer. (k) A = Z; (a, b) e R if and only if 4 is an integer. %3D %3D %3D %3D 10. Define R on R by (x, y) € R if and only if 1 < |x|+lyl < 2. (a) Make a sketch in the Cartesian plane showing the region of R2 defined by R. (b) Show that R is neither reflexive nor transitive. (c) Is R symmetric? Is it antisymmetric? Explain. 11. Let S be a set that contains at least two elements a and b. Let A be the power set of S. Determine which of the properties-reflexivity, symmetry, antisymmetry, transitivity-each of the following binary relations R on A possesses. Give a proof or counterexample as appro- priate