Logarithm is the exponent to which a given base must be raised to produce a certain number. In other words, it is the inverse operation of exponentiation.

What are the common bases for logarithms?

The most common bases for logarithms are base 10 (common logarithm, denoted as log), base e (natural logarithm, denoted as ln), and base 2. However, logarithms can have any positive base other than 1.

What are the properties of logarithms?

The properties of logarithms include the product property, quotient property, power property, change of base formula, inverse property, zero property, and negative property.

How do I solve equations involving logarithms?

To solve equations involving logarithms, you can use properties of logarithms to simplify expressions and isolate the logarithmic term. Then, you can apply the definition of logarithms to find the value of the variable.

What are some real-world applications of logarithms?

Logarithms are used in various fields such as finance (e.g., calculating interest rates), physics (e.g., modeling exponential decay), biology (e.g., measuring acidity with pH), engineering (e.g., analyzing signals in electronics), and computer science (e.g., analyzing algorithm complexity).

What is a logarithm table?

A logarithm table is a reference table that lists the logarithms of numbers to a specific base, commonly base 10. It provides a quick way to find the logarithm of a number without the need for complex calculations.

Where can I find a logarithm table PDF?

Logarithm table PDFs can be found online on educational websites, digital libraries, and math resource platforms. Additionally, they may be available for download from academic institutions' websites or math-related forums.

What is a logarithm book, and why is it useful?

A logarithm book is a reference book that provides tables of logarithmic values for various numbers. It is useful because logarithms simplify complex calculations, especially in fields like Mathematics, Engineering, Physics, and Astronomy. By consulting a logarithm book, users can quickly find logarithmic values, aiding in computations involving multiplication, division, exponentiation, and root extraction.

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Logarithm

A logarithm is a mathematical operation that represents the inverse of exponentiation. If b^x = y, then log_b (y) =x

Here, b is the base, y is the result of raising the base to the power of x, and x is the logarithm.

log_by is the power by which b must be raised to obtain y.

1.0Logarithm Definition

A logarithm is a mathematical function that yields the exponent to which a fixed number, termed the base, must be raised to obtain a specified number. In other words, if you have a logarithm of a number "y" with base "b", it is denoted as “log_b(y)” and it represents the power to which the base "b" must be raised to yield the value "y".

For example, in base 10 logarithms, if you have log₁₀(1000) = 3, it means 10 raised to the power of 3 equals 1000 (10³= 1000).

Logarithms are widely used in various fields, such as mathematics, engineering, science, economics, and computer science for simplifying calculations involving large numbers, expressing exponential growth or decay, solving equations, and more.

Note: For log_by to be defined, y > 0, b > 0, b ≠ 1.

Exponential Form	Logarithmic Form
3⁵= 243	log₃ (243) = 5
4²=16	log₄ (16) = 2
2⁵=32	log₂ (32) =5
$2^{- 3} = \frac{1}{8}$	$lo g_{2} (\frac{1}{8}) = - 3$
8⁰ = 1	log₈ (1) = 0

There are several common bases for logarithms

Natural logarithm (base e)

Denoted as ln y, where the base e is called natural logarithm, (e approximately equal to 2.71828). The natural logarithm function is defined for positive real numbers y, and it represents the power to which e must be raised to obtain y.

Mathematically, the natural logarithm function satisfies the equation: ln y = x

If and only if: e^x = y

The natural logarithm function is widely used in various fields of mathematics, including calculus, differential equations, probability, and statistics, as well as in sciences such as physics, chemistry, and biology. It has numerous applications in modeling exponential growth and decay, solving equations involving exponential functions, calculating compound interest, and more.

Base 10 logarithm:

Denoted as log₁₀ (y), is a logarithm with base 10. It represents the power to which 10 must be raised to obtain y.

Mathematically, the base 10 logarithm function satisfies the equation: log₁₀ (y)=x

If and only if: 10^x = y

The base 10 logarithm is commonly used in various fields, especially in science, engineering, and technology. It is often used for practical purposes because of its easy conversion to and from the common logarithm. For example, the pH scale in chemistry and the Richter scale in seismology are both based on base 10 logarithms.

Other bases:

Logarithms can be taken with any positive base other than 1, though natural logarithms (base e) and base 10 logarithms are most common.

2.0Logarithm Graph

3.0Logarithm Properties

Product Rule:

log_b (xy)=log_b (x)+log_b (y)

This property states that the sum of the logarithms of the individual factors is equal to the logarithm of a product.

Quotient Rule:

$lo g_{b} (\frac{x}{y}) = lo g_{b} (x) - lo g_{b} (y)$

This property states that the logarithm of the quotient is equal to the difference of the logarithms of the numerator and denominator.

Power Rule:

log_b (x^a) = a. log_b (x)

This property states that the logarithm of a power is equal to the exponent times the logarithm of the base.

Change of Base Formula:

$lo g_{b} (x) = \frac{l o g _{c} ( x )}{l o g _{c} ( b )}$

This formula allows us to change the base of a logarithm

Inverse Property:

log_b (b^x) = x

This property states that applying a logarithm with base b to a number raised to the same base b yields the original exponent.

Zero Property:

log_b (1) = 0

The logarithm of 1 w.r.t any base other than 1 remains constant at zero.

Negative Property:

$lo g_{b} (\frac{1}{x}) = - lo g_{b} (x)$

This property states that the logarithm of the reciprocal of a number equals the negative of the logarithm of the number itself.

Some More Important Properties of Logarithm

$a^{l o g^{b}} = b$
$a^{l o g c^{b}} = b^{l o g c^{a}}$

provided log are defined.

4.0Logarithm Solved Questions

Evaluate: – log₂(256)

⇒ 2⁸ = 256

⇒ log₂(256) = 8

Simplify log₃(81) – log₃ (9)

= $lo g_{3} (\frac{81}{9})$ (by Division Rule)

= log₃ (9)

= 2 (3² =9)

Find the value of $2 lo g (\frac{2}{5}) + 3 lo g (\frac{25}{8}) + lo g (\frac{128}{625})$

= $lo g \frac{2 ^{2}}{5 ^{2}} + lo g (\frac{5 ^{2}}{2 ^{3}})^{3} + lo g \frac{2 ^{7}}{5 ^{4}}$

= $lo g \frac{2 ^{2}}{5 ^{2}} \cdot \frac{5 ^{6}}{2 ^{9}} \cdot \frac{2 ^{7}}{5 ^{4}} = lo g 1 = 0$

log₃ (x) = log₃ (8) + log₃ (5)

= log ₃ (8 × 5)

= log₃ (40)

thus, x = 40

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