A Cyclic Group Is a Group That Isgenerated By a Single Element, In the Sense That Every Element of the Group Canbe Written As a Power of some Particular Element G In Multiplicative Notation,Or As a Multiple of G In Additive Notation. This Element G Is Called A"Generator" of the Group. any Infinite Cyclic Group Is Isomorphic to Z, the Integers With Addition As Thegroup Operation. any Finite Cyclic Group of Order N Is Isomorphic to Z/Nz, the Integers Modulo N With Addition As the Group Operation.