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More Functions and Sets Rosen 1.8 B A S f(a) a Inverse Image Let f be an invertible function from set A to set B. Let S be a subset of B. We define the inverse image of S to be the subset of A containing all pre-images of all elements of S. f -1 (S) = {a A | f(a) S} B f f A -1
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More Functions and Sets Rosen 1.8
B A S f(a) a Inverse Image • Let f be an invertible function from set A to set B. Let S be a subset of B. We define the inverse image of S to be the subset of A containing all pre-images of all elements of S. • f-1(S) = {aA | f(a) S}
B f f A -1 a2 b1 b2 a1 S f-1(S) Let f be an invertible function from A to B. Let S be a subset of B. Show that f-1(S) = f-1(S) What do we know? f must be 1-to-1 and onto
Let f be an invertible function from A to B. Let S be a subset of B. Show that f-1(S) = f-1(S) Proof: We must show that f-1(S) f-1(S) and that f-1(S) f-1(S) . Let x f-1(S). Then xA and f(x) S. Since f(x) S, x f-1(S). Therefore x f-1(S). Now let x f-1(S). Then x f-1(S) which implies that f(x) S. Therefore f(x) S and x f-1(S)
Let f be an invertible function from A to B. Let S be a subset of B. Show that f-1(S) = f-1(S) Proof: f-1(S) = {xA | f(x) S} Set builder notation = {xA | f(x) S} Def of Complement = f-1(S) Def of Complement
Floor and Ceiling Functions • The floor function assigns to the real number x the largest integer that is less than or equal to x. x • x = n iff n x < n+1, nZ • x = n iff x-1 < n x, nZ • The ceiling function assigns to the real number x the smallest integer that is greater than or equal to x. x • x = n iff n-1 < x n, nZ • x = n iff x n < x+1, nZ
Examples 0.5 = 1 0.5 = 0 -0.3 = 0 -0.3 = -1 6 = 6 6 = 6 -3.4 = -3 3.9 = 3
Prove that x+m = x + m when m is an integer. Proof: Assume that x = n, nZ. Therefore n x < n+1. Next we add m to each term in the inequality to get n+m x+m < n+m+1. Therefore x+m = n+m = x + m x = n iff n x < n+1, nZ
n n+1 Let xR. Show that 2x = x + x+1/2 Proof: Let nZ such that x = n. Therefore n x < n+1. We will look at the two cases: x n + 1/2 and x < n + 1/2. Case 1: x n + 1/2 Then 2n+1 2x < 2n+2, so 2x = 2n+1 Also n+1 x + 1/2 < n+2, so x + 1/2 = n+1 2x = 2n+1 = n + n+1 = x + x+1/2
Let xR. Show that 2x = x + x+1/2 Case 2: x < n + 1/2 Then 2n 2x < 2n+1, so 2x = 2n Also n x + 1/2 < n+1, so x + 1/2 = n 2x = 2n = n + n = x + x+1/2
Characteristic Function Let S be a subset of a universal set U. The characteristic function fS of S is the function from U to {0,1}such that fS(x) = 1 if xS and fS(x) = 0 if xS. Example: Let U = Z and S = {2,4,6,8}. fS(4) = 1 fS(10) = 0
Let A and B be sets. Show that for all x, fAB(x) = fA(x)fB(x) Proof: fAB(x) must equal either 0 or 1. Suppose that fAB(x) = 1. Then x must be in the intersection of A and B. Since x AB, then xA and xB. Since xA, fA(x)=1 and since xB fB(x) = 1. Therefore fAB = fA(x)fB(x) = 1. If fAB(x) = 0. Then x AB. Since x is not in the intersection of A and B, either xA or xB or x is not in either A or B. If xA, then fA(x)=0. If xB, then fB(x) = 0. In either case fAB = fA(x)fB(x) = 0.
Let A and B be sets. Show that for all x, fAB(x) = fA(x) + fB(x) - fA(x)fB(x) Proof: fAB(x) must equal either 0 or 1. Suppose that fAB(x) = 1. Then xA or xB or x is in both A and B. If x is in one set but not the other, then fA(x) + fB(x) - fA(x)fB(x)= 1+0+(1)(0) = 1. If x is in both A and B, then fA(x) + fB(x) - fA(x)fB(x) = 1+1 – (1)(1) = 1. If fAB(x) = 0. Then xA and xB. Then fA(x) + fB(x) - fA(x)fB(x)= 0 + 0 – (0)(0) = 0.
Let A and B be sets. Show that for all x, fAB(x) = fA(x) + fB(x) - fA(x)fB(x) A B AB fAB(x) fA(x) + fB(x) - fA(x)fB(x) 1 1 1 1 1+1-(1)(1) = 1 1 0 1 1 1+0-(1)(0) = 1 0 1 1 1 0+1-(0)(1) = 1 0 0 0 0 0+)-(0)(0) = 0