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Find the complex conjugate bar(z_(1)) of z_(1)=6+i. bar(z_(1))=◻

Find the complex conjugate z1 \overline{z_{1}} of z1=6+i z_{1}=6+i .\newlinez1= \overline{z_{1}}=\square

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Full solution

Q. Find the complex conjugate z1 \overline{z_{1}} of z1=6+i z_{1}=6+i .\newlinez1= \overline{z_{1}}=\square
  1. Identify real and imaginary parts: Identify the real and imaginary parts of the complex number z1=6+iz_{1} = 6 + i. In this case, the real part is 66 and the imaginary part is the coefficient of ii, which is 11. Real part: 66 Imaginary part: 11
  2. Determine complex conjugate: Determine the complex conjugate of z1=6+iz_{1} = 6 + i. The complex conjugate of a complex number is formed by changing the sign of the imaginary part. Therefore, the complex conjugate of 6+i6 + i is 6i6 - i. Complex conjugate: 6i6 - i

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