azztech77
Nov2-11, 10:39 PM
Need help with this - just had this on a test and this is driving me crazy - PLEASE HELP!!
Let {f_{n}} be a sequence of MEASURABLE real valued functions. Prove that there exists a sequence of positive real numbers {c_{n}} such that \sum c_{n}f_{n} converges for almost every x \in \Re
How is it possible for this to be true??? Please help!!
Let {f_{n}} be a sequence of MEASURABLE real valued functions. Prove that there exists a sequence of positive real numbers {c_{n}} such that \sum c_{n}f_{n} converges for almost every x \in \Re
How is it possible for this to be true??? Please help!!