Value of Log e - Introduction, Properties, Log Table, Application & Values | CollegeSearch

Home  >  Articles  >  Value of Log e - Introduction, Properties, Log Table, Application & Values

Value of Log e - Introduction, Properties, Log Table, Application & Values

Kasturi Talukdar

Updated on 16th June, 2023 , 11 min read

Value of Log e Overview

When it comes to mathematical functions, the logarithm is one that holds great significance. Logarithms help us solve complex problems with ease and precision. In this blog, we will start by discussing the definition of logarithms and then dive into the value of Log e, or the natural logarithm. We will explore how to calculate logarithms, the properties of logarithms, and their applications in real life. We will also discuss the natural logarithms and exponential functions and their derivatives and integrals. Lastly, we will touch on how decimal digits can be represented as logarithms. 

Definition of Logarithm

A mathematical concept that helps simplify complex calculations is Logarithm. It acts as an inverse function of exponential functions and defines the power to which a fixed base must elevate to produce a given number. Logarithmic functions follow particular rules and laws with extensive applications in various fields such as calculus, geometry, and probability. One such logarithmic function is the natural logarithm (ln), which has Euler's number (e) as its base. The value of log e or the natural logarithm plays a significant role in mathematical and scientific calculations where continuous compounding comes into play; it also finds its use in compound interest over time with annual interest rates among other things.

Value of Log e

The base of the natural logarithm is Euler's number or 'e.' A Swiss mathematician named Leonhard Euler discovered it, and its value is approximately 2.71828. The logarithm of a number is the exponent to which a given base must be raised to obtain that number. For instance, if we take the logarithm of 1000 to the base 10, it equals 3 because 10 raised to the power of 3 is equal to 1000. The logarithmic function is the inverse of the exponential function, meaning that if logₐ(x) = y, then a raised to the power of y is equal to x.

There are two commonly used types of logarithms in mathematics: common logarithms and natural logarithms.

  1. A common logarithm is any logarithmic function with a base of 10. It is typically denoted as y = log(x) or y = log₁₀(x).
  2. On the other hand, natural logarithms are logarithmic functions with a base equal to 'e', where 'e' is an irrational constant widely used in mathematical calculations. Natural logarithms are usually represented as y = logₑ(x) or y = ln(x). The value of 'e' is approximately 2.718281828... and is extensively used in various mathematical contexts.

Related Articles:

Value of ‘e'

The constant 'e' is an irrational mathematical value and serves as the base for natural logarithms. It is the unique number that has a natural logarithm equal to 1. Jacob Bernoulli calculated the value of 'e' in 1683. These mathematical constant holds significance in various mathematical fields, including compound interest, Bernoulli trials, standard normal distribution, derangements, optimal planning problems, asymptotic, and calculus.

There are two scenarios for calculating the value of log e: finding the natural logarithm of 'e' and determining the common logarithm of 'e'.

Case 1: Calculating the Natural Logarithm of 'e' (logₑ 'e')

By definition, a logarithmic function is the inverse function of an exponential function.

If we consider logₑ 'e' as y, it can be written as e = e^y.

Since the bases of both exponential functions on both sides are the same, the powers should also be identical according to the properties of exponential functions. Therefore, it can be concluded that the value of 'y' is equal to 1.

Initially, we assumed logₑ 'e' = y, so we can conclude that logₑ 'e' = 1. The natural logarithm of 'e' is equal to 1.

Case 2: Calculating the Common Logarithm of 'e' (log₁₀ 'e')

It is a known fact that the common logarithm of a function, whose natural logarithm value is known, can be determined by dividing the natural logarithm value by 2.303. This is because the natural logarithm of 10 (log 10 base 'e') is approximately equal to 2.303.

In Case 1, the natural logarithm of 'e' was calculated to be 1. To find log₁₀'e', we divide 1 by 2.303.

log₁₀x = ln x / 2.303

log₁₀'e' = ln 'e' / 2.303

log₁₀'e' = 1 / 2.303

log₁₀'e' ≈ 0.43421

Therefore, the value of log₁₀'e' is approximately 0.43421, rounded to five decimal places.

Calculating Logarithms

To calculate logarithms, you need to know the base of the logarithm and the number you want to take the logarithm of. Here are the steps to calculate logarithms:

  1. Determine the base of the logarithm: Logarithms can have different bases, such as base 10 (common logarithm) or base e (natural logarithm). The base is typically indicated by a subscript. For example, log₁₀is the base 10 logarithm, and logₑ (or ln) is the natural logarithm.
  2. Identify the number you want to take the logarithm of: Let's call this number "x."
  3. Write the logarithmic expression: The general form is logₐ(x), where "a" is the base and "x" is the number, you want to take the logarithm of.
  4. Use a calculator or logarithm tables: Calculating logarithms can be done using a calculator or by referring to logarithm tables. Most scientific calculators have built-in logarithm functions. If you're using a calculator, enter the base, followed by the number, and press the logarithm button. For example, to calculate log₃(9), you would enter "3", "9", and then press the logarithm button.
  5. Obtain the result: The calculator will provide the result of the logarithm calculation.

It's important to note that the natural logarithm (base e) is often denoted as "ln" rather than "logₑ." So, ln(x) refers to the natural logarithm of x.

Properties of Logarithms

Logarithms are essential in a wide range of mathematical calculations thanks to their many useful properties. For example, the natural logarithm has a base of Euler's number (e), an irrational number whose value is approximately equal to 2.71828. 

  • By using logarithms, we can express compound interest rates for continuous compounding or annual interest with simple fractions. 
  • The use of logarithmic scales provides us with easy representation and visualization in fields such as probability and geometry. 
  • Applying the power rule for logarithms enables us to solve polynomial expressions with multiplication or division quickly.

Logarithms have several important properties that are useful in various mathematical calculations. Here are the key properties of logarithms:

  1. Product Rule: logₐ(M * N) = logₐ(M) + logₐ(N) This property states that the logarithm of a product of two numbers is equal to the sum of their individual logarithms.
  2. Quotient Rule:logₐ(M / N) = logₐ(M) - logₐ(N) This property states that the logarithm of a quotient of two numbers is equal to the difference of their individual logarithms.
  3. Power Rule:logₐ(M^p) = p * logₐ(M) This property states that the logarithm of a number raised to a power is equal to the product of the exponent and the logarithm of the base.
  4. Change of Base Rule: logₐ(M) = logᵦ(M) / logᵦ(a) This property allows you to calculate the logarithm of a number with any desired base by using logarithms with a known base.
  5. Inverse Property:If logₐ(M) = N, then a^N = M This property states that if the logarithm of a number with base "a" is "N," then raising "a" to the power of "N" will result in the original number "M."
  6. Logarithm of 1: logₐ(1) = 0 This property states that the logarithm of 1 to any base is always 0.
  7. Logarithm of the Base:logₐ(a) = 1 This property states that the logarithm of the base "a" to the same base is always equal to 1.

Logarithmic Identities

Equations involving logarithmic expressions are called Logarithmic identities. These identities find their application in complex mathematical calculations where we need to simplify expressions before solving them. Common identities include the Product Rule, Quotient Rule, Power Rule, and Change of Base Formula. The Product Rule states that when multiplying two numbers with the same base, we can simply add their exponents together instead of multiplying them separately. Similarly, when dividing two numbers with the same base, we can subtract their exponents rather than dividing them separately (Quotient Rule). Moreover, if a number has an exponent, we can bring it down to multiplication (Power Rule). For instance- log x^3=3(log x).

Logarithmic Inequalities

Logarithmic inequalities involve the comparison of logarithmic expressions using inequality signs, and it's important to remember that the domain of a logarithmic function must always be positive. 

  1. To solve logarithmic inequalities, you can apply the same rules used in solving algebraic inequalities with a few extra considerations.
  2.  Logarithmic inequalities are useful in solving real-world problems, such as determining the minimum or maximum value of a variable. 
  3. Mastery over understanding logarithmic inequalities is crucial not only for advanced mathematics and scientific applications but also for everyday arithmetic calculations involving compound interest, probability, decay, exponential growth, etc.
  4.  Additionally, knowing the value of log e or Euler's constant (e) unlocks access to calculus derivations and integrals, making mathematical calculations more accessible across a wide range of applications.

Applications of Logarithms

Logarithms have a wide range of applications that span several industries, like finance and science. They have proven instrumental in simplifying mathematical calculations involving processes like exponential growth or decay and in computing metrics like probability and interest rates through continuous compounding. Logarithmic functions with base e (Euler's number) or the natural logarithm are particularly useful in calculus. Their use helps compute derivatives and integrals faster without tedious arithmetic or polynomial operations. Whether it is determining the value of an infinite series or calculating the limit of a complex number as n times infinity approaches zero, logarithms have a significant impact on how we understand numbers and their relationships. Logarithms have numerous applications across various fields. Here are some common applications of logarithms:

  1. Exponential Growth and Decay:Logarithms are often used to model exponential growth and decay processes. In fields such as finance, population dynamics, biology, and physics, logarithmic functions help describe phenomena where a quantity increases or decreases exponentially over time.
  2. Logarithmic Scales:Logarithmic scales are commonly used in scientific measurements and data representation. Examples include the Richter scale for measuring earthquake magnitudes, the pH scale for measuring acidity, and the decibel scale for measuring sound intensity. Logarithmic scales compress large ranges of values into more manageable representations.
  3. Compounding Interest:Logarithms play a crucial role in finance, particularly in compound interest calculations. The compound interest formula involves logarithms and is used to determine the future value of an investment or loan with compounded interest.
  4. Signal Processing:Logarithms are used in signal processing and telecommunications. In these applications, logarithmic transformations help convert signals from linear to logarithmic scales, making them easier to analyze and process.
  5. Data Compression:Logarithmic functions are used in data compression algorithms, such as the Huffman coding technique. Logarithms help reduce the size of data by encoding more frequently occurring symbols with shorter codes, improving storage efficiency.
  6. Probability and Statistics:Logarithms are used in statistical analysis and probability theory, especially when dealing with very small or large numbers. Logarithmic transformations help normalize data and simplify calculations in areas like regression analysis and hypothesis testing.
  7. Music and Sound:Logarithmic scales are employed in music and audio engineering. The musical pitch system is based on a logarithmic scale, where each octave represents a doubling or halving of frequency.
  8. pH Calculation:The pH scale, which measures the acidity or alkalinity of a solution, is based on logarithms. pH is defined as the negative logarithm (base 10) of the hydrogen ion concentration in a solution.

Logarithmic Scales

Logarithmic scales are an essential tool in various fields like science and finance. They make it easier to visualize and compare data that spans a wide range of values. Additionally, logarithmic scales can help convert exponential growth or decay into linear relationships, making it much simpler to analyze trends over time. Understanding logarithmic scales is fundamental for anyone working on complex calculations or dealing with large datasets. These scales have wide-ranging applications in fields such as geometry and probability, and they play an important role in mathematical calculations. From compound interest to derivatives, logarithms have been extensively studied by mathematicians such as Leonhard Euler and John Napier.

Decibel Scale

The Decibel Scale is an essential tool for measuring the intensity of sound. This logarithmic scale is commonly used in the music and audio engineering industries to measure the loudness of sound. However, it has wide-ranging applications in other fields like science and finance. The Decibel Scale is based on logarithms because human perception of sound is not linear. This means that a change of just 10 decibels represents a tenfold increase or decrease in sound intensity. Logarithms are also widely used in mathematical calculations, ranging from compound interest to calculus, thanks to Leonhard Euler's discovery of the natural logarithm and its base e. With this knowledge, we can convert exponential growth or decay into linear relationships for better analysis over time using formulas like pv =FV/(1+r)^n. Therefore, understanding logarithms and their wide range of applications is essential for anyone working with complex calculations or large datasets.

Natural Logarithms and Exponential Functions

Natural logarithms are an incredibly useful mathematical tool with a wide range of applications in various fields. Defined as the logarithm to the base 'e', the natural logarithm plays a significant role in calculus, including differentiation and integration. The value of log e or euler's number is an irrational number with infinite decimal places that has been extensively studied by famous mathematicians like John Napier, Jacob Bernoulli, and Leonhard Euler. One of its essential properties includes the fact that its own derivative is equal to itself. Natural logarithms are used extensively in compound interest calculations where continuous compounding is necessary. Additionally, they play a crucial role in probability theory and exponential growth or decay analysis.

Derivatives and Integrals of Logarithmic Functions

Derivatives and integrals of logarithmic functions are critical concepts in calculus and have many practical applications. 

  1. The natural logarithm (ln) has a base e, which is also known as Euler's number. 
  2. The derivative of ln(x) is commonly denoted as d/dx[ln(x)] = 1/x. It follows that the slope of the tangent line to the natural logarithm function at any point x equals 1/x. 
  3. Similarly, the integral of 1/x is ln|x| + C (where C is an arbitrary constant), making it a powerful tool for solving complex mathematical calculations involving logarithms.
  4. In addition to calculus and mathematics, logarithmic functions are used in other fields such as science, engineering, probability theory, and finance to model exponential growth and decay processes or calculate interest rates from continuous compounding or annual interest rates using FRAC{ln(PV/FV)}{t}.
  5. Natural logarithms also play an essential role in defining Euler's constant e (2.718281828...), discovered by Swiss mathematician Leonhard Euler while investigating compound interest with continuously varying rates. With its infinite series expansion ex = lim(n -> infinity) [(1+x/n)^n], e is a ubiquitous mathematical constant, finding applications in everything from geometry to probability theory.

How to Represent Decimal Digits as Logarithms

  1. To represent decimal digits as logarithms, one must first grasp the concept of logarithms and their base. 
  2. Logarithms are crucial in simplifying mathematical calculations that involve multiplication, division, and exponentiation. 
  3. Converting decimal digits into scientific notation is a prerequisite for finding their logarithmic value. 
  4. The properties of logarithms, such as the product rule and quotient rule, are then employed to further simplify expressions.
  5. Logarithms find applications in diverse fields like probability theory, geometry, compound interest problems in finance, calculus (including integrals and derivatives), exponential growth and decay scenarios (such as population growth), etc.

Conclusion

In conclusion, logarithms are an essential mathematical concept that find application in various fields. The natural logarithm with base e has unique properties and is used extensively in calculus and mathematical modelling. Understanding the logarithmic identities, inequalities, and scales, including the decibel scale, can help solve complex problems and make calculations more manageable. To learn more about how to use logarithms to represent decimal digits or calculate derivatives and integrals of logarithmic functions, check out our comprehensive guide on the value of Log e, including log tables and values.

Similar Articles

JoSAA Counselling 2023

By - Avantika Bhardwaj 2023-07-13 13:34:07 , 19 min read
Read More
Check Eligibility   Free 1:1 Counselling