Seminars and Colloquium

Conferences and Workshops

Student News

Bookmarks

Bulletin Boards

Alumni News

Problem of the week

Find the smallest prime number \( p \geq 5 \) such that there exist no integer coefficient polynomials \( f \) and \( g \) satisfying \[ p | ( 2^{f(n)} + 3^{g(n)}) \] for all positive integers \( n \).