Subcontests
(4)integral inequality with integral condition, [0,1]->R
Let n be a positive integer and f:[0,1]→R be a continuous function such that
∫01xkf(x)dx=1for every k∈{0,1,…,n−1}. Prove that
∫01f(x)2dx≥n2. FE Mn(R)->[n], inequality f(XY)≤min{f(X),f(Y)}
Let Mn(R) denote the set of all real n×n matrices. Find all surjective functions f:Mn(R)→{0,1,…,n} which satisfy
f(XY)≤min{f(X),f(Y)}for all X,Y∈Mn(R). sequences of polygons, vertices are midpoints of sides, convergence
Let P0,P1,P2,… be a sequence of convex polygons such that, for each k≥0, the vertices of Pk+1 are the midpoints of all sides of Pk. Prove that there exists a unique point lying inside all these polygons. function analysis, f(x)=ax has ≥1 solution for each a>0
Let f:[1,∞)→(0,∞) be a continuous function. Assume that for every a>0, the equation f(x)=ax has at least one solution in the interval [1,∞).
(a) Prove that for every a>0, the equation f(x)=ax has infinitely many solutions.
(b) Give an example of a strictly increasing continuous function f with these properties.