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📰 We are given that the angle between $ z_1 $ and $ z_2 $ is $ 60^\circ $, which corresponds to the smallest positive argument of $ z_1 \overline{z_2} $. Since both are on the unit circle, $ |z_1| = |z_2| = 1 $, and 📰 z_1 \overline{z_2} = (\cos heta_1 + i \sin heta_1)(\cos heta_2 - i \sin heta_2) = \cos( heta_1 - heta_2) + i \sin( heta_1 - heta_2). 📰 The argument of $ z_1 \overline{z_2} $ is $ heta_1 - heta_2 $ (modulo $ 360^\circ $), and the smallest positive argument is given to be $ 60^\circ $. Since cosine determines the angle uniquely within $ [0^\circ, 180^\circ] $ for this context (as it's the smallest angle between them), we have 📰 Multiplacation Chart 7638566 📰 Steeler Game 4777843 📰 You Wont Believe How Many Sites Are Now Blocked Without Adblock 9251780 📰 How Many Caucasian In Usa 5049099 📰 Hilton Puerto Vallarta 9837718 📰 5Th Generation Starters The Ultimate Rockstars You Need In 2024 8496791 📰 Find Your Doppelganger 3827220 📰 Kitchenaids Ice Cream Wish Is Fulfilled This Attachment Transforms Every Scoop 8309851 📰 Pdf For Mac Adobe 8190970 📰 Cellular Respiration Products 4516545 📰 Can You Rent An Meter Discover The Hidden Government Hack You Wont Believe 5852155 📰 Hyatt Regency Coconut Point Resort 2119296 📰 Gundry Olive Oil The Revealed Ingredient Thats Boosting Health Like Never Before 1831697 📰 Pemberton Township 3343410 📰 What Causes Glassy Eyes The Shocking Truth Behind The Haunting Glow 7183255