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Find the complex conjugate bar(z_(1)) of {:[z_(1)=-7i+6.],[ bar(z_(1))=◻]:}

Find the complex conjugate z1 \overline{z_{1}} of z1=7i+6z1= \begin{array}{l} z_{1}=-7 i+6 \\ \overline{z_{1}}=\square \end{array}

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Full solution

Q. Find the complex conjugate z1 \overline{z_{1}} of z1=7i+6z1= \begin{array}{l} z_{1}=-7 i+6 \\ \overline{z_{1}}=\square \end{array}
  1. Identify Parts of z1z_1: Identify the real and imaginary parts of the complex number z1z_1. In 7i+6-7i + 6, 66 is the real part and 7-7 is the coefficient of the imaginary part ii. Real part: 66 Imaginary part: 7-7
  2. Complex Conjugate of z1z_1: Determine the complex conjugate of z1=7i+6z_1 = -7i + 6. The complex conjugate of a complex number is obtained by changing the sign of the imaginary part. Therefore, the complex conjugate of 7i+6-7i + 6 is 7i+67i + 6. Complex conjugate: 7i+67i + 6

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