Binomial series

This book presents the basic concepts of probability in a simple, straightforward, easy-to-understand way. It does require, however, a knowledge of arithmetic (fractions, decimals, and percents) and a knowledge of basic algebra (formulas, exponents, order of operations, etc.). If you need a review of these concepts, you can consult another of my books in this series entitled Pre-Algebra Demystified.

267p zizaybay1103 29-05-2024 3 2   Download

Part 1 of ebook "Higher engineering mathematics (Sixth edition)" has presents the following content: algebra; partial fractions; logarithms; exponential functions; hyperbolic functions; arithmetic and geometric progressions; the binomial series; maclaurin’s series; solving equations by iterative methods; binary, octal and hexadecimal; introduction to trigonometry; cartesian and polar co-ordinates; the circle and its properties; trigonometric waveforms;...

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Ebook Business Statistics: Part 2 presents the following content: Index numbers; time series analysis; theory of probability; random variable, probability distributions and mathematical expectation; theoretical distributions. Please refer to the documentation for more details.

395p trankora06 19-07-2023 5 3   Download

Ebook Quantitative Techniques-I: Part 2 presents the following content: Correlation Analysis; Regression Analysis; Analysis of Time Series; Probability and Expected Value; Binomial Probability Distribution; Poisson Probability Distribution;...Please refer to the documentation for more details.

150p chankora 16-06-2023 5 1   Download

Inference of gene regulatory network structures from RNA-Seq data is challenging due to the nature of the data, as measurements take the form of counts of reads mapped to a given gene. Here we present a model for RNA-Seq time series data that applies a negative binomial distribution for the observations, and uses sparse regression with a horseshoe prior to learn a dynamic Bayesian network of interactions between genes.

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By means of the hypergeometric series approach, we present a new proof of Sun’s conjecture on trigonometric series, which is simpler than the original one due to Sun and Meng. Several further infinite series identities are shown as examples.

7p danhdanh27 08-01-2019 26 2   Download

(bq) part 1 book "higher engineering mathematics" has contents: algebra, inequalities, hyperbolic functions, arithmetic and geometric progressions, partial fractions, the binomial series, logarithms and exponential functions, the binomial series,...and other contents.

332p bautroibinhyen21 14-03-2017 60 7   Download

The discovery of infinite products byWallis and infinite series by Newton marked the beginning of the modern mathematical era. The use of series allowed Newton to find the area under a curve defined by any algebraic equation, an achievement completely beyond the earlier methods ofTorricelli, Fermat, and Pascal. The work of Newton and his contemporaries, including Leibniz and the Bernoullis, was concentrated in mathematical analysis and physics.

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This is the fifth book of examples from the Theory of Probability. This topic is not my favourite, however, thanks to my former colleague, Ole Jørsboe, I somehow managed to get an idea of what it is all about. The way I have treated the topic will often diverge from the more professional treatment. On the other hand, it will probably also be closer to the way of thinking which is more common among many readers, because I also had to start from scratch. The prerequisites for the topics can e.g. be found in the Ventus: Calculus 2 series, so I shall refer the reader to...

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An alternating series is a series whose terms are alternately positive and negative. By the Monotonic Sequence Theorem, the increasing bounded above sequence s2 s3 s5 … converges to a limit s‘  s.

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We can add the terms of a sequence {an } and get an expression of the form: a1+ a2+ a3+ …+ an + … which is called a series and denoted by However what does it mean by the sum of infinitely many terms? Example. We can try to add the terms of the series 1+2+3+…+n+… and get the cumulative sums 1, 3, 6, 10, …, The nth sum n(n+1)/2 becomes very large as n increases

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5.1.1 Limits of Sequences - A sequence is an infinite ordered list of numbers where each term is obtained according to a fixed rule. - Symbolically the terms of a sequence are represented with indexed letters a1, a2, a3, …, an , … a1 is the first term, a2 is the second term,… an is the nth term…

39p phuoctla16 08-06-2012 90 9   Download