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📰 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. 📰 But here, the equation \( (z^2 + 2)^2 = 0 \) has roots: 📰 The Social Network Streaming 3760529 📰 Microsoft Office 365 Promo Code 📰 Play The Bazaar 📰 Step Into Majoras World How This Iconic Title Changed Gaming Forever 8078064 📰 Hilton Garden Inn Panama City 9677431 📰 3E3Ecn English 📰 Sword Of Souls 📰 Critical Evidence Bank Of America From Home And The Situation Escalates 📰 Download Firefox Macos 4242129 📰 Cfv Dear Days Dlc Starter Decks 4926309 📰 Best Days And Times To Purchase Airline Tickets 📰 Powers Out Arc Raiders 7093479 📰 Credit Banks 📰 Finally Microsoft Edge For Linux The Ultimate Blend Of Speed Security And Simplicity 9440854 📰 Is This The Most Stunning Pearl Abyss Discovery Of The Decade Find Out Now 9875745