Tips and Tricks to Logarithm Question

Last Updated : 11 Nov, 2024

Logarithms are a crucial topic to master for the Quantitative Aptitude section of competitive exams, which requires not only understanding but also speed and accuracy.

This article provides essential tips and tricks for tackling logarithm questions effectively, covering key concepts, formulas, and rules that every learner should grasp before diving into practice.

Types of Logarithms

There are two main types of logarithms you’ll encounter: common logs and natural logs.

Common Logarithm: Written as log ⁡(x), this log has a base of 10.
- It answers the question, “To what power must 10 be raised to equal x?”
- Common logs are often used in scales like pH, sound (decibels), and earthquake magnitudes.
- Example: log⁡(100) = 2 (because 10²= 100).

Natural Logarithm: Written as ln⁡(x), this log has a base of e (approximately 2.718).
- It answers the question, “To what power must e be raised to equal x?”
- Natural logs are used in natural growth and decay models, like population growth and radioactive decay.
- Example: ln⁡(e³) = 3.

Tips and Tricks for Logarithm

Below is a detailed table with Rules, equations, samples, and quick tricks to solve logarithm questions, remember the table below to quickly solve the questions.

Rule	Equation	Example	Quick Trick
Product Rule	log_b(x ⋅ y) = log_b(x) + log_b(y)	log₂(8⋅4) = log₂(8) + log₂(4) = 3 + 2 = 5	Think "product" means "plus"
Quotient Rule	log_⁡b(x/y) = log_⁡b(x) − log⁡_b(y)	log₃(27/3) = log₃(27) − log₃(3) = 3 − 1 = 2	Think "quotient" means "minus"
Power Rule	log⁡_b(x^k) = k⋅log⁡_b(x)	log₂(4³) = 3⋅log₂(4) = 3⋅2 = 6	Exponent becomes a "coefficient"
Change of Base Formula	log⁡_b(x) = log_⁡k(x)/log_⁡k(b)	log₂(8) = log₁₀(8)/log₁₀(2) ≈ 3	Use when the base needs to be changed
Zero Rule	log⁡_b(1) = 0	log₅(1) = 0	A log of 1 is always 0
Identity Rule	log⁡_b(b) = 1	log₇(7) = 1	Base and number match = 1
Inverse Rule	log⁡_b(b^x) = x	log₂(2⁵) = 5	Base matches inside power, use exponent
Negative Log Rule	log_b(1/x) = −log_b(x)	log₂(1/4) = −2	Flip fraction for a negative result

Common Logarithmic Values for Base 10 (log⁡₁₀) Table

Value	Approximate Logarithm log⁡₁₀
log₁₀(0)	Undefined
log₁₀(1)	0
log₁₀(2)	0.301
log₁₀(3)	0.477
log₁₀(4)	0.602
log₁₀(5)	0.699
log₁₀(6)	0.778
log₁₀(7)	0.845
log₁₀(8)	0.903
log₁₀(9)	0.954
log₁₀(10)	1

Tips for Solving Logarithmic Equations

Basic Logarithmic Equation

When you have a simple equation of the form log_⁡b(x) = y, you can rewrite it in its exponential form to solve for x: x = b^y

Example: Solve for x in log⁡₃(x) = 4.

Solution:

Rewrite the equation in exponential form: x = 3⁴
Calculate 3⁴: x = 81
So, x = 81

Equations with Logarithms on Both Sides

When you have an equation with logarithms on both sides and the same base, you can set the insides equal to each other.

Example: Solve for x in log₄(x + 3) = log₄(7)

Solution:

Set the insides equal to each other, since both sides have the same base (4), we can set the expressions inside the logarithms equal to each other:
x + 3 = 7
x = 4
so the value of x = 4.

Using Logarithmic Properties to Simplify

Sometimes, you’ll need to use logarithmic properties (product, quotient, or power rule) to simplify an equation before solving it.

Example: Solve for x in log⁡₂(4x) = 5

Solution:

Use the product rule to separate the terms:
log⁡₂(4) + log_⁡2(x) = 5
Simplify log⁡₂(4) (since 2²= 4, so log_⁡2(4) = 2):
2 + log_⁡2(x) = 5
Subtract 2 from both sides:
log_⁡2(x) = 3
Rewrite in exponential form: x = 2³= 8
So, x = 8.

Handling Logarithmic Equations with Different Bases

If you encounter logarithmic equations with different bases, use the change of base formula to convert one or both sides to a common base.

Example: Solve log⁡₂(x) = log_⁡3(9)

Solution:

Convert log⁡₃(9), using change of base, the change of base formula states:
log₃(9) = log₂(9)/log_⁡2(3)
Substitute into the Equation:
log₂(x) = log₂(9)/log₂(3)
Simplify the Right Side:
Calculate log⁡₂(9) and log⁡₂(3) in terms of powers of 2:
Since 9=3², we can use the power rule: log⁡₂(9) = log_⁡2(3²) = 2⋅log⁡₂(3).
Thus the equation becomes: log₂(x) = 2⋅log₂(3)/log₂(3)
Cancel log⁡₂(3) on the Right Side: log₂(x) = 2
Rewrite in Exponential Form
Convert log⁡₂(x) = 2 to exponential form: x = 2² = 4
So, x = 4