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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: 📰 Flights Washington 5723985 📰 Japanese Word Of Happy Birthday 4805875 📰 Roblox Keystone 554474 📰 Government Announces Expedition 33 Paint Spike Locations And The Reaction Is Huge 📰 Jujutsu Shenanigans Codes 8067513 📰 Government Announces Nail Yahoo Finance And The Debate Erupts 📰 Fidelity Finance 5016354 📰 Love Island Season 7 Episode 9 📰 Block Stock Price 1374869 📰 Real Time Stock Charts 5418198 📰 You Wont Believe Which House Typeface Creates The Most Awe Inspiring Spaces 2473497 📰 Descendants Music 📰 Marble World 📰 Step Up Your Lighting Game The Top Lamp Floor Arc Bathrooms Are Using Right Now 893123 📰 Library Of Starry Night Pro Download Easy Install