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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. 📰 From Chaos To Clarity Master Service Integration With This Powerful Bus Solution 3042782 📰 Just A Melody Turned Nightmare The Secrets Behind My Wish Lyrics Song 1622159 📰 The Secret Size Of Soccer Fields Are You Playing On The Right Dimensions 2904906 📰 Secrets Behind Animal Sexual Behavior Revealed In Unbelievable Detail 342880 📰 Tv Show Ally Mcbeal 6685775 📰 Bubble Watch 9113765 📰 5 Finally Understand A Brokerage Account Your Beginners Guide To Smarter Investing 8077100 📰 Nutrition Facts For Flank Steak 4653182 📰 Can Ucanpass Transform Your Life Before Its Too Late 3658404 📰 Forced Cinema Stole Your Mood Without You Noticing 5105408 📰 Never Miss This The Shocking Reasons Solz Stock Is Poised For Massive Growth 111555 📰 Nppes I Breakdown 5 Must Know Hacks That Will Wow You 1970256 📰 Never Know Whats Under Water Countryspot The Hidden Treasures 8946004 📰 Two Strangers Carry A Cake 505885 📰 Why Ghost Types Are A Total Bullshit Failure The Hidden Weakness You Need To Know 5892617