********** Caenagnathidae ( C. collinsi > O. philoceratops )

********** Oviraptoridae ( O. philoceratops > C. collinsi )

********** Deinonychosauria ( D. antirrhopus > P. domesticus or Dromaeosaurus albertensis + Troodon formosus )

********** Cavies ( caviids ): incl.

********** Mary of Lusignan ( c. 1370-1381 )

********** Guy of Lusignan ( d. 1405 ) ( illegitimate )

********** Hugh of Lusignan ( 1335 – 1385 / 1386 ) m. Maria of Morphou

********** Peter II of Cyprus ( c. 1357 – 1382 ) m. Valentina Visconti

********** Margaret or Mary of Lusignan ( c. 1360 – c. 1397 ) m. Jacques de Lusignan

********** Eschiva of Lusignan ( d. before 1369 )

********** James of Lusignan ( d. 1395 / 1397 ) m. Margaret or Mary of Lusignan

********** Janus of Cyprus ( 1375 – 1432 ) m. 1.

********** Philip of Lusignan ( d. c. 1430 )

********** Henry of Lusignan ( d. 1427 ) m. Eleanor of Lusignan

********** Marie of Lusignan ( 1381 – 1404 ), married Ladislaus of Naples

During his stay, he created characters such as comedienne Belma Buttons ( co-host of fictional BET show " Reality Check "), Dollar Bill Montgomery ( a host of an urban parody of Politically Incorrect called " Real ********** ing Talk with Dollar Bill Montgomery "), James Brown Jr. ( co-host of Cabana Chat ), and controversial rapper Emcee Esher.

********** Louis of Egmont ( 1600 – 1654 ), 8th Count of Egmont, Prince of Gavere and Steenhuyze

********** Tole Buqa ( died 1291 ), Khan of Golden Horde 1287-1292

********** Tarmashirin ( died 1334 ), Khan of Chagatai Khanate 1327-1334

********** Ghazan Khan ( 1271 – 1304 ), Khan of the Ilkhanate 1295-1304

********** Öljaitü Khan ( 1280 – 1316 ), Khan of the Ilkhanate 1304-1316

********** son Charles II of England ( see also his descendants )

********** Octodonts ( octodontids ): Andean rock-rats, degus and viscacha-rats

Each performance of an n-trial binomial experiment results in some whole number from 0 through N as the value of the random variable X, where Af.

The outcome of the experiment is X successes.

The random variable X takes the values Af with probabilities Af or, more briefly Af.

We shall find a formula for the probability of exactly X successes for given values of P and N.

When each number of successes X is paired with its probability of occurrence Af, the set of pairs Af, is a probability function called a binomial distribution.

The several trials of a binomial experiment produce a new random variable X, the total number of successes, which is just the sum of the random variables associated with the single trials.

Their sum is X, the total number of successes, which in this experiment has the value Af.

The list of text forms in the W-region of memory and the contents of the information cells in the X and Y-regions are no longer required.

For the case of a purely inertial autonavigator consisting of three restrained gyros, a coordinate system is used where the sensitive axis of the X accelerometer is parallel to the east-west direction at the base point, and the Y accelerometer sensitive axis is parallel to the north-south direction at the base point.

The input axis of the X gyro, when pointing in the east-west direction, is always perpendicular to the spin axis of earth.

The sensing of this rotation by the X gyro can be utilized to direct the platform into proper heading.

The Greek evidently fell for her, `` Monsieur X '' recounted, and to clinch what he thought was an affair in the making he gave her 100,000 francs ( about $300 ) and led her to the roulette tables.

* If numbers have mean X, then.

* If it is required to use a single number X as an estimate for the value of numbers, then the arithmetic mean does this best, in the sense of minimizing the sum of squares ( x < sub > i </ sub > − X )< sup > 2 </ sup > of the residuals.

The groove marked I indicates units, X tens, and so on up to millions.

A choice function is a function f, defined on a collection X of nonempty sets, such that for every set s in X, f ( s ) is an element of s. With this concept, the axiom can be stated:

: For any set X of nonempty sets, there exists a choice function f defined on X.

Each choice function on a collection X of nonempty sets is an element of the Cartesian product of the sets in X.

: Given any set X of pairwise disjoint non-empty sets, there exists at least one set C that contains exactly one element in common with each of the sets in X.

This guarantees for any partition of a set X the existence of a subset C of X containing exactly one element from each part of the partition.