Whether you are already used to working with RPT or managing this format the very first time, editing it should not feel like a challenge. Different formats might require specific apps to open and edit them properly. Nevertheless, if you have to quickly fix point in RPT as a part of your typical process, it is best to get a document multitool that allows for all types of such operations without extra effort.
Try DocHub for streamlined editing of RPT and other document formats. Our platform provides effortless papers processing no matter how much or little prior experience you have. With tools you have to work in any format, you will not need to switch between editing windows when working with every one of your papers. Easily create, edit, annotate and share your documents to save time on minor editing tasks. You will just need to register a new DocHub account, and then you can begin your work immediately.
See an improvement in document processing productivity with DocHub’s simple feature set. Edit any document quickly and easily, irrespective of its format. Enjoy all the advantages that come from our platform’s efficiency and convenience.
alright thanks for watching and today I want to use the intermediate value theorem to show that the function has a fixed point more precisely suppose you have a function f from 0 1 to 0 1 so this just means F is between 0 1 and we are this is continuous then f has a fixed point as a fixed point what does that mean it means there is a specific point think 1/2 such that if you apply F to it then nothing happens so there is is X naught somewhere in the interval 0 comma 1 such that f of X naught equals X naught in other words this point is fixed by F so nothing happens here and there is actually a nice geometric interpretation of this because all that this means is that if you have a function like that from 0 1 2 0 1 for instance like this suppose F looks like this that F must cross the line y equals x kind of like that in other words there must be some point X naught such that the output of X naught is the same thing and Ill give you some kind of neat applications in a second but firs