Question

. The functions (), () and their derivatives ′(), ′() are all continuous in [, ] and () ′ () − ′() () ≠ 0 at any point of the interval. Show that between any two roots of () = 0 in the interval lies one root of () = 0 and conversely. Verify the result when () = , () = ​

Answer 1

Answer:

yes I Aldo want answer please how much fast you can do do it