Us to Rand Exchange - Richter Guitar

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📰 z^4 + 4z^2 + 4 = (z^2 + 2)^2 = 0 📰 So indeed, \( (z^2 + 2)^2 = 0 \), so roots are \( z = \pm i\sqrt{2} \), each with multiplicity 2. But the **set of distinct roots** is still two: \( i\sqrt{2}, -i\sqrt{2} \), each included twice. But the problem asks for **the sum of the real parts of all complex numbers \( z \)** satisfying the equation. Since real part is 0 for each, even with multiplicity, the sum is still \( 0 + 0 = 0 \). 📰 Alternatively, interpret as sum over all **solutions** (with multiplicity or not)? But in algebraic contexts like this, unless specified, we consider distinct roots or with multiplicity. But multiplicity doesn't affect real part — each root contributes its real part once in evaluation, but the real part function is defined per root. However, in such symmetric cases, we sum over distinct roots unless told otherwise. 📰 Best 3Rd Person Shooting Games 8793097 📰 Best Futures Trading Platforms 5580205 📰 This Hidden Table Transforms Your Console Setup Youll Never Look At Gamers The Same Way 5361598 📰 Youll Never Look Back The Ultimate Boho Dress Thats Taken The Fashion World By Storm 9469643 📰 Linear Approximation Formula 2037625 📰 Kamchatka Russia 6418534 📰 Unlock Digital Signature Power How Code Signing Certificate Authenticode Transforms Security 9130973 📰 Hurry Buy Genuine Windows 10 License Now Enjoy Seamless Performance 2874170 📰 Best Av Receiver For Home Cinema 4377032 📰 Golden Ratio 2610664 📰 How To Buy Crypto 6102045 📰 Tamil Magic At Work The Secret Behind Mastering This Phrase Forever 1556236 📰 Master Excel Concatenate Combine Text Like A Data Whiz Overnight 8661675 📰 Latest Macintosh Os 1770534 📰 All Is Lost Movie 9348215