Suppose that for infinitely many primes p the polynomial pf g has a rational root Prove that f has a rational root A5 Find all functions f R→ Rthat satisfy the conditions f(1xy)− f(xy) = f(x)f(y) for all x,y ∈ R and f(−1) 6= 0 A6 Let f N → N be a function, and let fm be fC b ` ` Z a ` _ ^ \ Z Z Y X W V d g ^ f e hY v a u f a Y t W s Z l q r ` q l ` p Y o n m l k j i 0 4 3 2 1 7 7 , 5 ( 6 5 * ( , 6 / (116 = H > B R G B D g Z F b g g h _ h e h ` d b y m g b \ _ j k b l _ l " K \ B \ Z g J b e k d b", L h f 53, K \I 1 1, F _ o Z g b a Z p b y, _ e _ d l j b n
Ypfb Distribuira Glp Y Gas Domiciliario En Peru
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