{:[z=14 i+12.1],[Re(z)=],[Im(z)=]:}

Identifying Real Part: To find the real and imaginary parts of the complex number z, we need to identify the terms associated with the real part (Re(z)) and the imaginary part (Im(z)) from the given complex number z = 14i + 12.1.Finding Imaginary Part: The real part of the complex number is the term without the imaginary unit i, which in this case is 12.1. So, Re(z) = 12.1.The imaginary part of the complex number is the coefficient of the term with the imaginary unit i, which in this case is 14. So, Im(z) = 14.

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$\begin{array}{l}z=14 i+12.1 \\ \operatorname{Re}(z)= \\ \operatorname{Im}(z)=\end{array}$

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Grade 6

Multiply using the distributive property

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\begin{array}{l}z=14 i+12.1 \\ \operatorname{Re}(z)= \\ \operatorname{Im}(z)=\end{array}

Identifying Real Part: To find the real and imaginary parts of the complex number $z$ , we need to identify the terms associated with the real part ( $\text{Re}(z)$ ) and the imaginary part ( $\text{Im}(z)$ ) from the given complex number $z = 14i + 12.1$ .
Finding Imaginary Part: The real part of the complex number is the term without the imaginary unit $i$ , which in this case is $12.1$ . So, $\text{Re}(z) = 12.1$ .
Finding Imaginary Part: The real part of the complex number is the term without the imaginary unit $i$ , which in this case is $12.1$ . So, $\text{Re}(z) = 12.1$ . The imaginary part of the complex number is the coefficient of the term with the imaginary unit $i$ , which in this case is $14$ . So, $\text{Im}(z) = 14$ .