Advances in Bioscience and Biotechnology

Advances in Bioscience and Biotechnology

ISSN Print: 2156-8456
ISSN Online: 2156-8502
www.scirp.org/journal/abb
E-mail: abb@scirp.org
"Applications of exponential decay and geometric series in effective medicine dosage"
written by Chinnaraji Annamalai,
published by Advances in Bioscience and Biotechnology, Vol.1 No.1, 2010
has been cited by the following article(s):
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[2] Computation Method for Combinatorial Geometric Series and its Applications
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[3] Factorials, Integers and Multinomial Coefficients and its Computing Techniques for Machine Learning and Cybersecurity
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[4] Computation of Geometric Series in Different Ways
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[6] Sum of the Summations of Binomial Expansions with Geometric Series
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[7] Computation and combinatorial Techniques for Binomial Coefficients and Geometric Series
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[8] Computing Method for Binomial Expansions and Geometric Series
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[9] Algorithmic and Numerical Techniques for Computation of Binomial and Geometric Series
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[10] Numerical Computational Method for Computation of Binomial Expansions and Geometric Series
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[11] Computational Method for Summation of Binomial Expansions equal to Sum of Geometric Series with Exponents of 2
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[12] Computation Method for Summation of Binomial Expansions equal to Sum of Geometric Series with Exponents of Two
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[13] Annamalai's Binomial Identity and Theorem
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[14] Computation and Numerical Method for Summations of Binomial and Geometric Series
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[15] Combinatorial and Algorithmic Technique for Computation of Binomial Expansions and Geometric Series with its Derivatives
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[16] Computation and Calculus for Combinatorial Geometric Series and Binomial Identities and Expansions
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[17] Novel Binomial Series and its Summations
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[18] Computational Technique and Differential Calculus for the Summation of Geometric Series and Binomial Expansions
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[19] Computation Method for the Summation of Series of Binomial Expansions and Geometric Series with its Derivatives
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[20] Combinatorial and Multinomial Coefficients and its Computing Techniques for Machine Learning and Cybersecurity
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[21] Computation and Calculus for the Summation of Geometric Series and Binomial Expansions
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[22] Computational Techniques and Calculus for the Summation of Geometric Series and Binomial Expansions
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[23] Computation of Summations of Annamalai's Binomial Expansions
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[24] Calculus and Computation for Geometric Series with Binomial Coefficients
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[25] Computational and Numerical Methods for Combinatorial Geometric Series and its Applications
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[26] Computational Method and Calculus for the Summation of Geometric Series and Binomial Expansions
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[27] Combinatorial Geometric Series and Binomial Theorems
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[28] Factorial of Sum of Nonnegative Integers for Computing and Algorithms
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[29] Multinomial Computation and Factorial Theorems for Cryptographic Algorithm and Machine Learning
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[30] Numerical Method and Computation for Combinatorial Geometric Series and Binomial Theorems
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[31] Computational Method for Combinatorial Geometric Series and Binomial Theorems
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[32] Application of Factorial and Binomial identities in Computing and Cybersecurity
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[33] Multinomial Computation and Factorial Theorems for Artificial Intelligence and Cybersecurity
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[34] Computation for the Summation of Integers and Geometric Progression of Powers of Two
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[35] Combinatorial Techniques and Multinomial Theorems with Factorials for Machine Learning and Cybersecurity
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[36] Factorial of Sum of Nonnegative Integers
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[37] A Binomial Expansion equal to Multiple of 2 with Non-Negative Exponents
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[38] Combinatorial Theorem for Multiple of Two with Exponents
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[39] Factorial of Sum of Two nonnegative Integers is equal to Multiple of the Product of Factorial of the Two Nonnegative Integers
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[40] Computation and Summation of Binomial Series and Combinatorial Geometric Series
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[41] Computation for the Summation of Binomial Expansions and Geometric Series of Multiples of Powers of Two
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[42] New Idea to compute the Geometric Series and its Derivative
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[43] Ascending and Descending Orders of Annamalai's Binomial Coefficient
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[44] Summations of Single Terms and Successive Terms of Geometric Series
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[45] Differentiation and Integration of Annamalai's Binomial Expansion
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[46] A Theorem on Binomial Series
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[47] Analysis and Computation of Extended Geometric Series and Summability
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[48] Computation of Derivative of Geometric Series without Differentiation
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[49] Computation of Binomial Expansions and Application in Science and Engineering
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[50] Intuitionistic Fuzzy sets and Combinatorial Techniques in Computation and Weather Analysis
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[51] Binomial Expansion with Optimized Combination of Combinatorics
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[52] Analysis of the Relationship between Integers and Factorial Functions
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[53] Sum of Summations of Annamalai's Binomial Expansions
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[54] Factorials and Integers for Applications in Computing and Cryptography
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[55] Computation of Geometric Series with Negative Exponents
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[56] A Theorem on the Annamalai's Binomial Identities
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[57] Computation and Analysis of Combinatorial Geometric Series and Binomial Series
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[58] Computation and Analysis of Binomial Series
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[59] Algorithmic Approach for Computation of Binomial Expansions
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[60] Computing Method for the Summation of Series of Binomial Coefficients
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[61] Computation of Sum of Optimized Binomial Coefficients and Application in Computational Science and Engineering
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[62] Differentiation and Computational Method for Derivative of Geometric Series
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[63] Relation between the Results of Binomial Expansions with Multiple of 2
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[64] Sum of Binomial Coefficients and its Lemma
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[65] Differential Calculus for the Summation of Geometric Series with Binomial Expansions
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[66] Sum of the Summation of Binomial Expansions with Optimized Binomial Coefficient
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[67] Lemma on the Binomial Coefficients of Combinatorial Geometric Series
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[68] Combinatorial Techniques for Binomial Expansions with Multiples of 2
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[69] Two Different and Equal Coefficients of Combinatorial Geometric Series
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[70] Algorithmic Technique for Computation of Binomial Expansions and Geometric Series of Multiples of Powers of Two
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[71] Computational modelling for the formation of geometric series using Annamalai computing
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[72] Analysis of the Relationship between Factorials and Integers
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[73] Recursive Computations and Differential and Integral Equations for Summability of Binomial Coefficients with Combinatorial Expressions
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[74] A Model of Iterative Computations for Recursive Summability
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[75] Computing for Development of A New Summability on Multiple Geometric Series
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[76] Computation of Series of Series using Annamalai's Computing Model
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[77] Annamalai's Computing Model for Algorithmic Geometric Series and Its Mathematical Structures
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[78] COMPUTATIONAL MODELLING FOR THE FORMATION OF GEOMETRIC SERIES USING ANNAMALAI COMPUTING METHOD
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[79] Annamalai Computing Method for Formation of Geometric Series using in Science and Technology
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[80] Analysis and Modelling of Annamalai Computing Geometric Series and Summability
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[81] Modelling Exponential Decay to predict Half-Life of Radioactive Substance
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[82] Computational model to study the dose concentration in bloodstream of patients
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[83] Relation between Integers and Factorial Functions and its Applications
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