Lexic.us

Definition of Multinomial

1. Noun. A mathematical function that is the sum of a number of terms.

2. Adjective. Having the character of a polynomial. "A polynomial expression"

Definition of Multinomial

1. n. & a. Same as Polynomial.

Definition of Multinomial

1. Adjective. (mathematics) polynomial ¹

2. Noun. (mathematics) polynomial ¹

¹ Source: wiktionary.com

Definition of Multinomial

1. [n -S]

Medical Definition of Multinomial

1. Same as Polynomial. Origin: Multi- + -nomial, as in binomial. See Binomial. Source: Websters Dictionary (01 Mar 1998)

Lexicographical Neighbors of Multinomial

multimutated multinarrative multination multinational multinationals multinetwork multinetworked multinight multinitrogen multinodal

multinodate multinode multinodous multinodular multinodular goiter multinomial (current term) multinomial distribution multinomials multinominal multinominous

multinuclear multinuclear leukocyte multinucleate multinucleated multinucleation multinucleolate multinucleon multinucleosis multinumber multinumbers

Literary usage of Multinomial

Below you will find example usage of this term as found in modern and/or classical literature:

1. A Treatise on Algebra by Charles Smith (1893)
"Highest common factor of multinomial expressions whose factors are known. When the factors of two or more multinomial expressions are known, their HCF can ..."

2. Inequalities in Statistics and Probability: Proceedings of the Symposium on by Yung Liang Tong (1984)
"One of the important applications of ranking and selection techniques is to select (without respect to order) the t best cells of a multinomial distribution ..."

3. Mixture Models: Theory, Geometry, and Applications by Bruce G. Lindsay (1995)
"Application to the multinomial. This modeling scheme leads directly to a method of estimation if we are in a contingency table setting. ..."

4. Algebra: An Elementary Text-book for the Higher Classes of Secondary Schools by George Chrystal (1893)
"BINOMIAL AND multinomial THEOREMS. § 11.] It has already been shown, ... to the expansion of an integral power of any multinomial Consider («, + «, + . ..."

5. Miscellanea Curiosa: Being a Collection of Some of the Principal Phaenomena by Royal Society (Great Britain), Edmond Halley (1706)
"cz} -\--dz* -Vf*.5, &c. m is the Index of the Power, to which this multinomial ought to be Rais'd, or if you will, 'tis the Index of the Root which is to be ..."

6. Elementary Algebra by Henry Sinclair Hall, Samuel Ratcliffe Knight (1895)
"To CUBE ANY multinomial. 176. Consider a trinomial : z) + Зх(у + z)2 + (у + ... To cube a multinomial: take the cube of each term, three times the square of ..."

7. Miscellanea Curiosa: Containing a Collection of Some of the Principal by James Hodgson, William Derham, Richard Mead, Royal Society (Great Britain) (1708)
"cx,J -~\- dz* -\- e*.5, &C. m is the Index of the Power, to which this multinomial ought to be Rais'd, or if you will, 'tis the Index of the Root which is ..."

8. A College Algebra by Henry Burchard Fine (1904)
"THE multinomial THEOREM 775 multinomial theorem. Let a + b + • •• + k denote any polynomial, and na positive integer. ..."

9. A Treatise on Algebra by Charles Smith (1893)
"Highest common factor of multinomial expressions whose factors are known. When the factors of two or more multinomial expressions are known, their HCF can ..."

10. Inequalities in Statistics and Probability: Proceedings of the Symposium on by Yung Liang Tong (1984)
"One of the important applications of ranking and selection techniques is to select (without respect to order) the t best cells of a multinomial distribution ..."

11. Mixture Models: Theory, Geometry, and Applications by Bruce G. Lindsay (1995)
"Application to the multinomial. This modeling scheme leads directly to a method of estimation if we are in a contingency table setting. ..."

12. Algebra: An Elementary Text-book for the Higher Classes of Secondary Schools by George Chrystal (1893)
"BINOMIAL AND multinomial THEOREMS. § 11.] It has already been shown, ... to the expansion of an integral power of any multinomial Consider («, + «, + . ..."

13. Miscellanea Curiosa: Being a Collection of Some of the Principal Phaenomena by Royal Society (Great Britain), Edmond Halley (1706)
"cz} -\--dz* -Vf*.5, &c. m is the Index of the Power, to which this multinomial ought to be Rais'd, or if you will, 'tis the Index of the Root which is to be ..."

14. Elementary Algebra by Henry Sinclair Hall, Samuel Ratcliffe Knight (1895)
"To CUBE ANY multinomial. 176. Consider a trinomial : z) + Зх(у + z)2 + (у + ... To cube a multinomial: take the cube of each term, three times the square of ..."

15. Miscellanea Curiosa: Containing a Collection of Some of the Principal by James Hodgson, William Derham, Richard Mead, Royal Society (Great Britain) (1708)
"cx,J -~\- dz* -\- e*.5, &C. m is the Index of the Power, to which this multinomial ought to be Rais'd, or if you will, 'tis the Index of the Root which is ..."

16. A College Algebra by Henry Burchard Fine (1904)
"THE multinomial THEOREM 775 multinomial theorem. Let a + b + • •• + k denote any polynomial, and na positive integer. ..."

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