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📰 $ 2pab = ab \Rightarrow 2p = 1 \Rightarrow p = rac{1}{2} $. 📰 $ r = 2r \Rightarrow r = 0 $. 📰 Thus, $ f(x) = rac{1}{2}x^2 + qx $, where $ q $ is arbitrary. There are infinitely many such functions. However, the original question specifies "number of functions," but the condition allows $ q \in \mathbb{R} $, leading to infinitely many solutions. If additional constraints (e.g., continuity) are implied, the solution is still infinite. But based on the structure, the answer is infinite. However, the original fragment likely intended a finite count. Revisiting, suppose the equation holds for all $ a, b $, but $ f $ is linear: $ f(x) = qx $. Substituting: $ q(a + b) = qa + qb + ab \Rightarrow 0 = ab $, which fails unless $ ab = 0 $. Thus, no linear solutions. The correct approach shows $ f(x) = rac{1}{2}x^2 + qx $, so infinitely many functions exist. But the original question may have intended a specific form. Given the context, the answer is oxed{\infty} (infinite). 📰 This Life Changing Mustard Hack Will Slam The Dollar On Your Next Meal 2802009 📰 Switch Game Secrets Revealed Why This Dark Horse Is Dominating The Rankings 8419219 📰 Nokia Stock Price Today 2063951 📰 Never Miss A Beat Get Your Ip Address Instantlyno Tech Expertise Required 1466661 📰 Get Syskey Windows 11 Free Hack The System Key Instantly Without Paying A Dime 2520749 📰 Grow A Garden Com 8139348 📰 Unlock Fidelity Retirement Secrets To Live Conveniently In Your 60S 4331533 📰 Rocketman 6079443 📰 You Wont Believe Indiana Jones Powers The New Xbox Gameplay Now 3938041 📰 Redress Number Apply 439471 📰 The Ultimate Toy Rider Thats Taking The Kids World By Storm 5765634 📰 Balmain Jeans These Cult Standing Style Picks Are Taking Over Tiktok 9393838 📰 Pull Audio From Video 1920796 📰 Briading Sweet Grass Quotes 4606694 📰 Deep Red Nail Colour 8491830