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CROSSWORD
ANSWER

yules

Searching in Crosswords ...

The answer YULES has 40 possible clue(s) in existing crosswords.

Searching in Word Games ...

The word YULES is VALID in some board games. Check YULES in word games in Scrabble, Words With Friends, see scores, anagrams etc.

Searching in Dictionaries ...

Definitions of yules in various dictionaries:

noun - period extending from Dec. 24 to Jan. 6

noun - Christmas time

Word Research / Anagrams and more ...

Keep reading for additional results and analysis below.

Possible Crossword Clues
Present times?
End-of-year celebrations
Wassailers' times
Seasons to be merry
Holiday times
Christmases
Xmas seasons
Seasons for carolers
Christmas seasons
December holidays

Last Seen in these Crosswords & Puzzles
May 6 2019 Newsday.com
Dec 29 2018 USA Today
Sep 9 2018 Newsday.com
Jun 5 2018 Universal
Mar 19 2018 USA Today
Jan 5 2018 The Washington Post
Jan 5 2018 L.A. Times Daily
Nov 26 2017 Universal
Nov 7 2017 The Washington Post
Nov 7 2017 L.A. Times Daily

Yules might refer to
In probability and statistics, the Yule–Simon distribution is a discrete probability distribution named after Udny Yule and Herbert A. Simon. Simon originally called it the Yule distribution.The probability mass function (pmf) of the Yule–Simon (ρ) distribution is* * * * f * ( * k * ; * ρ * ) * = * ρ * B * ⁡ * ( * k * , * ρ * + * 1 * ) * , * * * {\displaystyle f(k;\rho )=\rho \operatorname {B} (k,\rho +1),} * for integer * * * * k * ≥ * 1 * * * {\displaystyle k\geq 1} * and real * * * * ρ * > * 0 * * * {\displaystyle \rho >0} * , where * * * * B * * * {\displaystyle \operatorname {B} } * is the beta function. Equivalently the pmf can be written in terms of the falling factorial as * * * * * f * ( * k * ; * ρ * ) * = * * * * ρ * Γ * ( * ρ * + * 1 * ) * * * ( * k * + * ρ * * ) * * * * ρ * + * 1 * * _ * * * * * * * , * * * {\displaystyle f(k;\rho )={\frac {\rho \Gamma (\rho +1)}{(k+\rho )^{\underline {\rho +1}}}},} * where * * * * Γ * * * {\displaystyle \Gamma } * is the gamma function. Thus, if * * * * ρ * * * {\displaystyle \rho } * is an integer, * * * * * f * ( * k * ; * ρ * ) * = * * * * ρ * * ρ * ! * * ( * k * − * 1 * ) * ! * * * ( * k * + * ρ * ) * ! * * * * . * * * {\displaystyle f(k;\rho )={\frac {\rho \,\rho !\,(k-1)!}{(k+\rho )!}}.} * The parameter * * * * ρ * * * {\displaystyle \rho } * can be estimated using a fixed point algorithm.The probability mass function f has the property that for sufficiently large k we have * * * * * f * ( * k * ; * ρ * ) * ≈ * * * * ρ * Γ * ( * ρ * + * 1 * ) * * * k * * ρ * + * 1 * ...

Yules might refer to

In probability and statistics, the Yule–Simon distribution is a discrete probability distribution named after Udny Yule and Herbert A. Simon. Simon originally called it the Yule distribution.The probability mass function (pmf) of the Yule–Simon (ρ) distribution is*
*
*
* f
* (
* k
* ;
* ρ
* )
* =
* ρ
* B
* ⁡
* (
* k
* ,
* ρ
* +
* 1
* )
* ,
*
*
* {\displaystyle f(k;\rho )=\rho \operatorname {B} (k,\rho +1),}
* for integer
*
*
*
* k
* ≥
* 1
*
*
* {\displaystyle k\geq 1}
* and real
*
*
*
* ρ
* >
* 0
*
*
* {\displaystyle \rho >0}
* , where
*
*
*
* B
*
*
* {\displaystyle \operatorname {B} }
* is the beta function. Equivalently the pmf can be written in terms of the falling factorial as
*
*
*
*
* f
* (
* k
* ;
* ρ
* )
* =
*
*
*
* ρ
* Γ
* (
* ρ
* +
* 1
* )
*
*
* (
* k
* +
* ρ
*
* )
*
*
*
* ρ
* +
* 1
*
* _
*
*
*
*
*
*
* ,
*
*
* {\displaystyle f(k;\rho )={\frac {\rho \Gamma (\rho +1)}{(k+\rho )^{\underline {\rho +1}}}},}
* where
*
*
*
* Γ
*
*
* {\displaystyle \Gamma }
* is the gamma function. Thus, if
*
*
*
* ρ
*
*
* {\displaystyle \rho }
* is an integer,
*
*
*
*
* f
* (
* k
* ;
* ρ
* )
* =
*
*
*
* ρ
*
* ρ
* !
*
* (
* k
* −
* 1
* )
* !
*
*
* (
* k
* +
* ρ
* )
* !
*
*
*
* .
*
*
* {\displaystyle f(k;\rho )={\frac {\rho \,\rho !\,(k-1)!}{(k+\rho )!}}.}
* The parameter
*
*
*
* ρ
*
*
* {\displaystyle \rho }
* can be estimated using a fixed point algorithm.The probability mass function f has the property that for sufficiently large k we have
*
*
*
*
* f
* (
* k
* ;
* ρ
* )
* ≈
*
*
*
* ρ
* Γ
* (
* ρ
* +
* 1
* )
*
*
* k
*
* ρ
* +
* 1
* ...

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