RSA Algorithm
Introduction
Ron Rivest, Adi Shamir and Len Adleman have developed this algorithm (Rivest-Shamir-Adleman). It is a block cipher which converts plain text into cipher text and vice versa at receiver side.
RSA Algorithm Steps
Step-1: Select two prime numbers p and q where p ≠ q.
Step-2: Calculate n = p * q.
Step-3: Calculate Ф(n) = (p-1) * (q-1).
Step-4: Select e such that, e is relatively prime to Ф(n), i.e. (e, Ф(n)) = 1 and 1 < e < Ф(n)
Step-5: Calculate d = e -1 mod Ф(n) or ed = 1 mod Ф(n).
Step-6: Public key = {e, n}, private key = {d, n}.
Step-7: Find out cipher text using the formula,
C = Pe mod n where, P < n where C = Cipher text, P = Plain text, e = Encryption key and n=block size.
Step-8: P = Cd mod n. Plain text P can be obtain using the given formula. where, d = decryption key
RSA algorithm explanation with example step by step
Step – 1: Select two prime numbers p and q where p ≠ q.
Example, Two prime numbers p = 13, q = 11.
Step – 2: Calculate n = p * q.
Example, n = p * q = 13 * 11 = 143.
Step – 3: Calculate Ф(n) = (p-1) * (q-1).
Example, Ф(n) = (13 – 1) * (11 – 1) = 12 * 10 = 120.
Step – 4: Select e such that, e is relatively prime to Ф(n), i.e. (e, Ф(n)) = 1 and 1 < e < Ф(n).
Example, Select e = 13, gcd (13, 120) = 1.
Step – 5: Calculate d = e -1 mod Ф(n) or e * d = 1 mod Ф(n)
Example, Finding d: e * d mod Ф(n) = 1
13 * d mod 120 = 1
(How to find: d *e = 1 mod Ф(n)
d = ((Ф(n) * i) + 1) / e
d = (120 + 1) / 13 = 9.30 (∵ i = 1)
d = (240 + 1) / 13 = 18.53 (∵ i = 2)
d = (360 + 1) / 13 = 27.76 (∵ i = 3)
d = (480 + 1) / 13 = 37 (∵ i = 4))
Step – 6: Public key = {e, n}, private key = {d, n}.
Example, Public key = {13, 143} and private key = {37, 143}.
Step – 7: Find out cipher text using the formula, C = Pe mod n where, P < n.
Example, Plain text P = 13. (Where, P < n)
C = Pe mod n = 1313 mod 143 = 52.
Step – 8: P = Cd mod n. Plain text P can be obtain using the given formula.
Example, Cipher text C = 52
P = Cd mod n = 5237 mod 143 = 13.
Solution of exercise (Given in video)
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