Let DEIR, xn be a sequence in [DEIR+correction Proof: Suppose D is closed. To prove xn ED 6-t xnxx Let xED = XEDC Since D is closed = Dc open. → =TE 76 s.t (x-E₂x+E) CDC- equation 1 Since xnx for given t>OTNE INS.t - 1xn-21²E +n²N = XVE (X-E₁ x + E) NEIN using equation 1 xn EDC #HEIN = E =XED. Conversely, Let xnxs.t. xtd. Let D is not closed = De → not open Thus, we have TXE DC sit. (1-E₂x +E) DC for X E70 any = (x-Ex+E) has atleast one pt in (DC)C= D. Choosing E=Yn For each nEIN, We enumerate such x as x₁, X₂, st x n = ( x ² + ₂ x + h) 00 nj = xn is a sequence in D v.t. xnx but =Du closed XEDC = E
Let DEIR, xn be a sequence in [DEIR+correction Proof: Suppose D is closed. To prove xn ED 6-t xnxx Let xED = XEDC Since D is closed = Dc open. → =TE 76 s.t (x-E₂x+E) CDC- equation 1 Since xnx for given t>OTNE INS.t - 1xn-21²E +n²N = XVE (X-E₁ x + E) NEIN using equation 1 xn EDC #HEIN = E =XED. Conversely, Let xnxs.t. xtd. Let D is not closed = De → not open Thus, we have TXE DC sit. (1-E₂x +E) DC for X E70 any = (x-Ex+E) has atleast one pt in (DC)C= D. Choosing E=Yn For each nEIN, We enumerate such x as x₁, X₂, st x n = ( x ² + ₂ x + h) 00 nj = xn is a sequence in D v.t. xnx but =Du closed XEDC = E
Chapter9: Sequences, Probability And Counting Theory
Section9.1: Sequences And Their Notations
Problem 63SE: Follow these steps to evaluate a finite sequence defined by an explicit formula. Using a Tl-84, do...
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