Havil's book "Gamma" page 57, formula

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Thread starter Lapidus
Start date Jun 9, 2017
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Book Formula Gamma

In summary, Page 57 in Havil's book "Gamma" contains a formula that relates the Euler-Mascheroni constant to the gamma function. This formula is important in understanding the properties and applications of the gamma function in mathematics and physics. Havil, the author of "Gamma," is a mathematician who has written several books on mathematical topics and his book specifically focuses on the gamma function. The formula on page 57 explains the relationship between the Euler-Mascheroni constant and the gamma function in simple terms. The gamma function is important in mathematics because it extends the concept of factorial to non-integer values and has numerous applications in various fields. In real-world applications, the formula on page 57 is used in fields such as

Jun 9, 2017

Lapidus

Where does the 1 in the last line come from?

Thank you!

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Jun 9, 2017

fresh_42

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Looks like the last sum should start at ##1##, which I guess would be important when integration by parts is used. The term for ##r=0## is somehow special and can be treated separately. Probably a copy+paste error.

Related to Havil's book "Gamma" page 57, formula

1. What is the significance of page 57 in Havil's book "Gamma"?

Page 57 in Havil's book "Gamma" contains a formula that demonstrates the relationship between the Euler-Mascheroni constant and the gamma function. This formula is important in understanding the properties of the gamma function and its applications in mathematics and physics.

2. Who is Havil and why is his book "Gamma" significant?

Havil is a mathematician and author who has written several books on various mathematical topics. His book "Gamma" specifically focuses on the history and applications of the gamma function, a mathematical concept that has numerous applications in fields such as statistics, physics, and number theory.

3. Can you explain the formula on page 57 in simple terms?

The formula on page 57 relates the Euler-Mascheroni constant (represented by the Greek letter gamma) to the gamma function, which is a special type of mathematical function. Essentially, the formula shows how the Euler-Mascheroni constant is related to the values of the gamma function at different points.

4. Why is the gamma function important in mathematics?

The gamma function is important in mathematics because it extends the concept of factorial to non-integer values. This allows for the calculation of values like 1.5!, which is not possible using the traditional factorial function. The gamma function also has many applications in fields such as probability, number theory, and complex analysis.

5. How is the formula on page 57 used in real-world applications?

The formula on page 57 is used in various real-world applications, particularly in fields such as physics, statistics, and engineering. It can be used to calculate values related to probability distributions, series expansions, and other mathematical concepts. Additionally, the formula is used in the evaluation of integrals and other complex mathematical operations.