1 sophie mariolys but actually it is just the same to

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Unformatted text preview: he same to minimize the squared distance 11 12 A.3/ C 18 IX.1 Limit Laws and Comb IX.2 2 s(t Discrete y, z ) 4, 0) 2 Random Structures ) = ||(x, Limit Laws (2, Sophie || = 2t 20 Introduction to Prob. and Limit Laws FS: Part C (rotating presentations) Marni 8t + 17. Combinatorial 23 Mariolys instances discrete The benefitIX.3 using the latter formula isofthat it has no square root. of 12 25 IX.4 You can now proceed in two ways.Continuous Limit Laws Marni to complete the square to see that the squared The first way is 2 + 9. The term 2(t Quasi-Powers and distance atIX.5 time t is s(t) = 2(t 2) Gaussian limit laws 2)2 can...
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