Euler's Formula Calculator

The Euler's Formula Calculator is a tool designed for calculating values derived from Euler's formula, which connects complex exponentials and trigonometric functions. Euler's formula is given by \( e^ix = \cos(x) + i\sin(x) \), where \( i \) is the imaginary unit and \( x \) is a real number. This formula is fundamental in fields such as engineering, physics, and applied mathematics.

For calculating using Euler's formula, follow the steps below -

Step 1: Input: Enter the angle \( x \) in radians.

Step 2: Click: Calculate Values. By doing so, the angle you have given as input will get processed.

Step 3: You will see the real and imaginary parts, \(\cos(x)\) and \(\sin(x)\), in the output column.

Here are some tips to help you get the right answer using the Euler’s Formula Calculator:

• Know the formula: The formula is e^(ix) = cos(x) + i·sin(x). Understand how both parts, cos(x) and sin(x), contribute to the result.

• Use the right units: Make sure the angle x is in radians, as Euler’s formula works with radians. Convert degrees to radians if needed.

• Enter correct numbers: When inputting the angle, ensure the values are accurate. Small mistakes can lead to incorrect or imprecise results.

• Euler's Formula: The relation \( e^ix = \cos(x) + i\sin(x) \) connects exponentials and trigonometric functions.

• Imaginary Unit (\(i\)): A mathematical constant that satisfies \( i²= -1 \).

• Radians: A unit of angle measure where \( \pi \) radians equal 180 degrees.

• Complex Number: A number of the form \( a + bi \), where \( a \) and \( b \) are real numbers, and \( i \) is the imaginary unit.

• Trigonometric Functions: Functions \(\cos(x)\) and \(\sin(x)\) used in Euler's formula to represent the real and imaginary parts of a complex exponential.