Ryssland Tadzjikistan Turkmenistan Ukraina Uzbekistan Vitryssland
Sovjetunionen deltog med 62 idrottare: 49 män och 13 kvinnor i de olympiska vinterspelen 1960 i Squaw Valley i Kalifornien. Totalt vann de sju guldmedaljer, fem silvermedaljer och nio bronsmedaljer.
Innehåll
1Medaljer
1.1Guld
1.2Silver
1.3Brons
2Källor
Medaljer |
Guld |
Hastighetsåkning på skridskor Hastighetsåkning på skridskor
500 m herrar: Jevgenij Grisjin
1 500 m herrar: Jurij Michajlov (delad med Jevgenij Grisjin)
5 000 m herrar: Viktor Kositjkin
1 000 m damer: Klara Guseva
1 500 m damer: Lidija Skoblikova
3 000 m damer: Lidija Skoblikova
Längdskidåkning Längdskidåkning
10 km damer: Marija Gusakova
Silver |
Hastighetsåkning på skridskor Hastighetsåkning på skridskor
500 m damer: Natalja Dontjenko
3 000 m damer: Valentina Stenina
10 000 m herrar: Viktor Kositjkin
Längdskidåkning Längdskidåkning
10 km damer: Ljubov Baranova
3x5 km stafett damer: Radja Jerosjina, Marija Gusakova, Ljubov Baranova
Skidskytte Skidskytte
20 km herrar: Vladimir Melanin
Brons |
Hastighetsåkning på skridskor Hastighetsåkning på skridskor
Bulgarien •
Danmark •
Finland •
Frankrike •
Island •
Italien •
Liechtenstein •
Nederländerna •
Norge •
Polen •
Schweiz •
Sovjetunionen •
Spanien •
Storbritannien •
Sverige •
Tjeckoslovakien •
Turkiet •
Tyskland •
Ungern •
Österrike
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This problem from IMO 1988 is said to be one of the most elegant ones in functional equations. Problem : The function $f$ is defined on the set of all positive integers as follows: begin{align} f(1) = 1, f(3) &= 3, f(2n) = f(n), \ f(4n+1) &= 2f(2n+1) - f(n), \ f(4n+3) &= 3 f(2n+1) - 2f(n) end{align} Find the number of $n$ with $f(n) = n, 1 leq n leq 1988$. The main idea towards the solution is realizing that these conditions stand for the fact that $f(n)$ just reverses the digits in the binary representation of the number $n$. So, essentially the solution is finding the number of binary pallindromes $leq 1988_{10}$. My question is the following : How to reformulate the problem so that $f(n)$ reverses the digits of $n$ in its ternary representation. Or even better, can we reformulate it for a
Management From Wikipedia, the free encyclopedia Jump to navigation Jump to search "Manager" redirects here. For other uses, see Management (disambiguation) and Manager (disambiguation). An organization chart for the United States Coast Guard shows the hierarchy of managerial roles in that organization. Business administration Management of a business Accounting Management accounting Financial accounting Financial audit Business entities Cooperative Corporation Limited liability company Partnership Sole proprietorship State-owned enterprise Corporate governance Annual general meeting Board of directors Supervisory board Advisory board Audit committee Corporate law Commercial law Constitutional documents Contract Corporate crime Corporate liability Insolvency law International trade law Mergers and acquisitions Economics Commodity Pu
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The question Has there ever been a military combat going on around an active (running or in outage but not decommissioned) commercial nuclear power plant? Or dangerously near it? If yes, how did the plant and its personnel fare in such situation? Why I ask Let's assume for the scope of this question modern commercial nuclear power plants (CANDU, PWR, BWR of generation II plus all of gen III and newer) are usually reasonably safe to operate given that the engineering has been done right and there is a whole cohort of very well trained personnel on-site at all times, well rested and with considerable resources on their hands. Things hard to get with an armed conflict like the recent Syrian war raging around. I can't seem to find any reference or a comprehensive article about this, hence this question.