Respuesta :
5 + 8i
given a complex number a ± bi then the complex conjugate is a ∓ bi
note the real part remains unchanged while the sign of the imaginary part reverses.
The conjugate of 5 - 8i is 5 + 8i
The conjugate of a complex number is the number that has the same real part but the opposite of its imaginary part
The given complex number is:
5 - 8i
The conjugate of a complex number of the form x + iy is given as:
x - iy
Comparing 5 - 8i with x + iy:
x = 5, y = -8
Applying similar rule for finding the conjugate of x + iy to 5 - 8i:
The conjugate of 5 - 8i is 5 + 8i
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