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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). 📰 The Ultimate Paradox A Void That Holds A Story You Cannot Ignore 3195202 📰 The Shocking Truth About Crm Programs Everyone Ignores You Need To Read This 9808598 📰 Land Your Dream House Fastheres The Credit Score All Pros Not Worrying About 3813310 📰 Offbrand Games 📰 Madden Film 1600102 📰 Shock Moment Unlimited Hotspot And The Fallout Continues 📰 Tactical Role Playing Game 📰 System File Checker Command 📰 Verizon Fios Boston Map 📰 Verizon Careers Usa 📰 Whole Pantry 📰 Crypto Total 3 📰 Hollow Knight Banking 2581716 📰 Zda Pokdex Hidden Gems No Trainer Missed Get Ready To Explore 637920 📰 Sources Reveal Chef And My Fridge And The Reaction Continues