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However, using mathematical properties of modular arith…

The computations involved in selecting keys and in enciphering data are complex, and are not practical for
manual use. However, using mathematical properties of modular arithmetic and a method known as
“_________________,” RSA is quite feasible for computer use.

PrepAway - Latest Free Exam Questions & Answers

A.
computing in Galois fields

B.
computing in Gladden fields

C.
computing in Gallipoli fields

D.
computing in Galbraith fields

Explanation:
The computations involved in selecting keys and in enciphering data are complex, and are not practical for
manual use. However, using mathematical properties of modular arithmetic and a method known as computing
in Galois fields, RSA is quite feasible for computer use.
A Galois field is a finite field.
Incorrect Answers:
B: A finite field is not called a Gladden field. Gladden fields are not used in RSA.
C: A finite field is not called a Gallipoli field. Gallipoli fields are not used in RSA.
D: A finite field is not called a Galbraith field. Galbraith fields are not used in RSA.


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