How Do You Convert \( e^{1+j2} \) to Cartesian Form?

AI Thread Summary
To convert \( 2.91 e^{1+j2} \) to Cartesian form, first separate the components into \( 2.91 e^{1} e^{j2} \). Then, apply Euler's formula to the \( e^{j2} \) term, which expresses it in terms of sine and cosine. This will allow for the conversion from polar to Cartesian coordinates. The user expressed gratitude for the guidance and indicated they would attempt the solution. The discussion emphasizes the importance of breaking down the complex exponential for easier conversion.
Silmax
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complex numbers problem...need help

Hi all
Could anyone out there please help me with the solution to this problem.

Express 2.91e to the power of 1+j2 in Cartesian form (x+jy)

Sorry writing it out, but I don't know how to set it out on the computer.


I have tried solving the 1+j2 first then adding this to the real number then working it out in polar form then converting it to Cartesian, but I don't know if this is right.

Any help would be much appreciated.
Thank you
 
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Thank you

I shall give it a go.
Thank you for your help
 

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