Search
Search Funnelback University
41 -
50 of
60
search results for tj KaKaotalk:PC53 |u:www.maths.cam.ac.uk
where 0
match all words and 60
match some words.
Results that match 1 of 2 words
-
MATHEMATICAL TRIPOS Part III Friday 28 May, 2004 9:00 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2004/Paper38.pdf30 Aug 2019: Xj = min(Tj , cj ), for 1 j n. extending the notation of (b) in the natural way. -
MATHEMATICAL TRIPOS Part III Tuesday 3 June 2003 9 ...
https://www.maths.cam.ac.uk/postgrad/mphil/files/stats/2003/Paper38.pdf19 Jun 2019: The variable tj (j = 1,. , 3) records the time interval under observationand takes the values 2, 4 or 6 months. ... logE(Yij|zi; xi; tj ). 1 E(Yij|zi; xi; tj )= α φZi βT xi δtj , (i = 1,. , -
MATHEMATICAL TRIPOS Part III Friday 9 June 2006 9 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2006/Paper45.pdf30 Aug 2019: Theeffects of recombination in the segment may be ignored. The time for which the samplehas j distinct ancestors is denoted by Tj , j = 2, 3,. , -
MATHEMATICAL TRIPOS Part III Friday 10 June, 2005 9 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2005/Paper48.pdf30 Aug 2019: Let uji be the approximation at xi and tj ,i = 1,. , -
MATHEMATICAL TRIPOS Part III Friday, 8 June, 2018 1:30 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2018/paper_139.pdf30 Aug 2019: Show that for any j > 1there exists there exists a positive real number Tj such that. -
MATHEMATICAL TRIPOS Part IA Friday, 3 June, 2011 1:30 ...
https://www.maths.cam.ac.uk/undergrad/pastpapers/files/2011/PaperIA_2.pdf17 Jun 2019: Find the probability-generating functions of the random variables Hj and Tj. -
MATHEMATICAL TRIPOS Part III Monday, 13 June, 2022 9:00 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2022/paper_219.pdf4 Aug 2022: Denote the kernel valuesfor indexed times as Rij k(ti, tj) and let R k(0,0). -
PaperIB_2.dvi
https://www.maths.cam.ac.uk/undergrad/pastpapers/files/2009/PaperIB_2.pdf17 Jun 2019: for j 6= i. Prove that the random vectors Yj AjX are independent, and thatY (Y T1 ,. ,Y TJ )T has a multivariate normal distribution.[ Hint: Random vectors are independent if -
MATHEMATICAL TRIPOS Part III Friday, 3 June, 2022 9:00 ...
https://www.maths.cam.ac.uk/postgrad/part-iii/files/pastpapers/2022/paper_319.pdf4 Aug 2022: Writedown operators which are a finite product. N. j=1. exp[sjA(tj)] (for appropriate {sj} and {tj}). -
MATHEMATICAL TRIPOS Part IB 2012 List of Courses Analysis ...
https://www.maths.cam.ac.uk/undergrad/pastpapers/files/2012/List_IB.pdf17 Jun 2019: Assume p > q. Let Tj = inf{n > 1 : Xn = j} if this is finite, and Tj = otherwise. ... Let Ti = inf{n > 1 : Xn = i}. For each i 6= j letqij = P(Tj < Ti | X0 = i) and mij = E(Tj | X0 = i).
Refine your results
Date
- 49 2019
- 8 Past year
- 6 Past 3 months
- 6 Past month
- 6 Past 6 months
- 6 2024
- 5 Yesterday
- 5 Past fortnight
- 5 Past week
- 3 2022
- 2 2023
Search history
Recently clicked results
Recently clicked results
Your click history is empty.
Recent searches
Recent searches
Your search history is empty.