List 4 values of the natural log function
The natural logarithm function is denoted as ln(x), where x is a positive real number
The natural logarithm function is denoted as ln(x), where x is a positive real number. Here are four values of the natural log function:
1. ln(1) = 0: The natural log of 1 is always equal to 0. This property holds true for any logarithm base.
2. ln(e) = 1: The natural log of the mathematical constant e (approximately equal to 2.71828) is equal to 1. This special property connects the natural logarithm function with exponential functions.
3. ln(10) ≈ 2.30259: The natural log of 10 is approximately equal to 2.30259. This value is often used in logarithmic scales and calculations.
4. ln(2) ≈ 0.69315: The natural log of 2 is approximately equal to 0.69315. This value is used in various mathematical and scientific contexts, especially in exponential growth or decay calculations.
It’s important to note that the natural logarithm is a continuous function, meaning it can take any positive real number greater than zero as input. These four values are just examples to illustrate the behavior of the function at specific points.
More Answers:
Derivative of Tan(x): The Formula Explained and DerivedHow to Find the Derivative of tan(x) with Respect to x | A Step-by-Step Guide
Understanding How to Find the Derivative of Cot(x) Using the Quotient Rule and Trigonometric Identities