Here you will learn how to find the conjugate of a complex number and properties of conjugate with examples.
Letโs begin โย
How to Find the Conjugate of a Complex Number
Let z = a + ib be a complex number. Then the conjugate of z is denoted by \(\bar{z}\) and is equal to a โ ib.
Thus, z = a + ib \(\implies\) \(\bar{z}\) = a โ ib
It follows from this definition that the conjugate of a complex number is obtained by replacing i by -i.
For Example : If z = 3 + 4i, then \(\bar{z}\) = 3 โ 4i.
Properties of Conjugate
If \(z\), \(z_1\), \(z_2\) are complex numbers, then
(i) \(\bar{\bar{z}}\) = z
(ii) z + \(\bar{z}\) = 2 Re (z)
(iii) z โ \(\bar{z}\) = 2i Im (z)
(iv) z = \(\bar{z}\) \(\iff\) z is purely real
(v) z + \(\bar{z}\) = 0 \(\implies\) z is purely imaginary
(vi) z\(\bar{z}\) = \([Re (z)]^2\) + \([Im (z)]^2\)
(vii) \(\bar{z_1 + z_2}\) =ย \(\bar{z_1}\) + \(\bar{z_2}\)
(viii) \(\bar{z_1 โ z_2}\) =ย \(\bar{z_1}\) โ \(\bar{z_2}\)
(ix) \(\bar{z_1z_2}\) =ย \(\bar{z_1}\) \(\bar{z_2}\)
(x) \(\bar{z_1\over z_2}\) =ย \(\bar{z_1}\over \bar{z_2}\)
Example : Multiply 3 โ 2i by its conjugate.
Solution : The conjugate of 3 โ 2i is 3 + 2i.
Hence, required product is = (3 โ 2i)(3 + 2i) = \(9 โ 4i^2\) = 9 + 4 = 13
Example : Find the conjugate of \(1\over 3 + 4i\).
Solution : Let z = \(1\over 3 + 4i\). Then,
z = \(1\over 3 + 4i\) \(\times\) \(3 โ 4i\over 3 โ 4i\) = \(3 โ 4i\over 9 + 16\) = \({3\over 25} โ {4\over 25}i\)
\(\therefore\) Conjugate of z is \(\bar{z}\) = \({3\over 25} โ {4\over 25}i\).ย