Create Date: July 22, 2024
Last Modified Date: December 19, 2024
Complex conjugate is a concept in mathematics involving complex numbers. A complex number has both a real and an imaginary part. The complex conjugate of a number has the same real part, but the imaginary part is negated (its sign is flipped).
For example, if the complex number is \( 5 - 3i \), its conjugate is \( 5 + 3i \).
The complex conjugate of \( 5 - 3i \) is \( 5 + 3i \).
The main rule is that the imaginary part of the conjugate has the opposite sign compared to the original complex number.
A complex conjugate is a modification of a complex number where the real part remains unchanged, and the imaginary part's sign is flipped. It is commonly represented as \( a - bi \) for a complex number \( a + bi \).