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CROSSWORD
ANSWER

uncorse

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The answer UNCORSE has 0 possible clue(s) in existing crosswords.

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There are 7 letters in UNCORSE ( C³E¹N¹O¹R¹S¹U¹ )

To search all scrabble anagrams of UNCORSE, to go: UNCORSE?

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Scrabble results that can be created with an extra letter added to UNCORSE

6 letters out of UNCORSE

CENSOR CEROUS CORNUS COURSE CRONES CROUSE OUNCES RECONS ROUENS SOURCE

5 letters out of UNCORSE

4 letters out of UNCORSE

3 letters out of UNCORSE

CON COR COS CRU CUE CUR ECU ENS EON ERN ERS NOR NOS NUS OES ONE ONS ORC ORE ORS OSE OUR REC RES ROC ROE RUE RUN SEC SEN SER SON SOU SUE SUN UNS URN USE

2 letters out of UNCORSE

EN ER ES NE NO NU OE ON OR OS RE SO UN US

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Uncorse might refer to
In probability theory and statistics, two real-valued random variables, X,Y, are said to be uncorrelated if their covariance, E(XY) − E(X)E(Y), is zero. A set of two or more random variables is called uncorrelated if each pair of them are uncorrelated. If two variables are uncorrelated, there is no linear relationship between them. * Uncorrelated random variables have a Pearson correlation coefficient of zero, except in the trivial case when either variable has zero variance (is a constant). In this case the correlation is undefined. * In general, uncorrelatedness is not the same as orthogonality, except in the special case where at least one of the two random variables has an expected value of 0. In this case, the covariance is the expectation of the product, and X and Y are uncorrelated if and only if E(XY) = 0. * If X and Y are independent, with finite second moments, then they are uncorrelated. However, not all uncorrelated variables are independent. For example, if X is a continuous random variable uniformly distributed on [−1, 1] and Y = X2, then X and Y are uncorrelated even though X determines Y and a particular value of Y can be produced by only one or two values of X.

Uncorse might refer to

In probability theory and statistics, two real-valued random variables, X,Y, are said to be uncorrelated if their covariance, E(XY) − E(X)E(Y), is zero. A set of two or more random variables is called uncorrelated if each pair of them are uncorrelated. If two variables are uncorrelated, there is no linear relationship between them.
* Uncorrelated random variables have a Pearson correlation coefficient of zero, except in the trivial case when either variable has zero variance (is a constant). In this case the correlation is undefined.
* In general, uncorrelatedness is not the same as orthogonality, except in the special case where at least one of the two random variables has an expected value of 0. In this case, the covariance is the expectation of the product, and X and Y are uncorrelated if and only if E(XY) = 0.
* If X and Y are independent, with finite second moments, then they are uncorrelated. However, not all uncorrelated variables are independent. For example, if X is a continuous random variable uniformly distributed on [−1, 1] and Y = X2, then X and Y are uncorrelated even though X determines Y and a particular value of Y can be produced by only one or two values of X.

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