Complex Numbers Calculator

The Complex Numbers Calculator allows users to perform arithmetic operations (addition, subtraction, multiplication, and division) on two complex numbers and provides the resulting real and imaginary parts along with the magnitude and phase in radians.

Use Our Complex Numbers Calculator

Complex Numbers Calculator Guide

This calculator allows you to perform various operations on complex numbers and displays the result along with its magnitude and phase. Follow these steps to use the calculator:

Step 1: Enter the First Complex Number

Start by filling in the fields for the first complex number:

  • First Complex Number – Real Part: Enter the real part of the first complex number. This field is required and you can input any number.
  • First Complex Number – Imaginary Part: Enter the imaginary part of the first complex number. This field is required and also accepts any number.

Step 2: Enter the Second Complex Number

Proceed to input the values for the second complex number:

  • Second Complex Number – Real Part: Input the real part of the second complex number. This is a mandatory field.
  • Second Complex Number – Imaginary Part: Input the imaginary part of the second complex number. This is a required field as well.

Step 3: Select an Operation

Choose the operation you want to perform on the complex numbers:

  • Addition: Compute the sum of the two complex numbers.
  • Subtraction: Calculate the difference by subtracting the second complex number from the first.
  • Multiplication: Determine the product of the two complex numbers.
  • Division: Calculate the quotient where the first complex number is divided by the second.

It is necessary to select an operation to proceed.

Step 4: View the Results

After selecting the operation and inputting the numbers, the calculator will display your results:

  • Result – Real Part: This shows the real component of your result, accurate to four decimal places.
  • Result – Imaginary Part: This displays the imaginary component of your result, also precise to four decimal places.
  • Result – Magnitude: The magnitude of the resulting complex number is calculated and presented with four decimal points of accuracy.
  • Result – Phase (radians): The phase of the complex number, given in radians, is provided with four decimal places of precision.

By following these steps, you will be able to compute operations on complex numbers and gain insightful information such as magnitude and phase using this calculator.