conjugate of a complex number
The conjugate of a complex number is obtained by changing the sign of its imaginary part while keeping its real part unchanged.
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Related Concepts (18)
- argand diagram
- complex conjugate
- complex numbers
- complex plane
- conjugate pairs
- conjugate root theorem
- conjugate symmetry
- conjugate transpose
- euler's formula
- exponential form of a complex number
- imaginary part
- modulus of a complex number
- multiplication of complex conjugates
- normal form of a complex number
- polar form of a complex number
- real part
- rectangular coordinates
- trigonometric form of a complex number
Similar Concepts
- absolute value/modulus of a complex number
- algebraic equations involving complex numbers
- argument of a complex number
- complex analysis
- complex conjugate roots
- complex logarithm
- conjugacy theorem
- conjugate complex numbers
- conjugate gradient descent
- conjugation
- hermitian operators
- imaginary numbers
- mapping functions in the complex plane
- topological conjugacy
- trigonometric functions of complex numbers