Q1: Sara is using RSA crypto-system with the following setup: p = 11 and q =...

Samantha uses the RSA signature scheme with primes p = 13 and q = 23 and...

Samantha uses the RSA signature scheme with primes p = 13 and q = 23 and public verification exponent v = 53. (a) What is Samantha’s public modulus? What is her private signing key? (b) Samantha signs the digital document D = 100. What is the signature?

(i) What are the public and private keys for RSA cryptosystem with p = 3 and...

(i) What are the public and private keys for RSA cryptosystem with p = 3 and q = 7 and 3<e<11. Answer: (ii) In Z6 What is the value of 4⊘5? (iii) (Chinese Remainder Theorem) Find the value of x where: x ≡ 2 mod 3 x ≡ 3 mod 5 x ≡ 2 mod 7 (Note:All necessary steps are required to show the result)

RSA Cryptography Perform encryption and decryption to find private decryption key d. a. p = 3,...

RSA Cryptography Perform encryption and decryption to find private decryption key d. a. p = 3, q = 13, e = 7 b. p = 787, q = 631, e = 234559

Let p=11, q=17, n = pq = 187. Your (awful) public RSA encryption key is (e=107,...

Let p=11, q=17, n = pq = 187. Your (awful) public RSA encryption key is (e=107, n=187). (a) What is your private decryption key? (b) You receive the encrypted message: 100 Decrypt the message. (In other words, what was the original message, before it was encrypted? Just give me a number, don’t convert it to letters).

Let p=3 and q=17 and let an RSA public-key cryptosystem be given. 1. Why is the...

Let p=3 and q=17 and let an RSA public-key cryptosystem be given. 1. Why is the number 8 not a valid encryption-key? 2. We encrypt the number M=8 with the help of the encryption-key e=3. Why is the encrypted message C=2? 3. Why is the decryption key d for the encryption-key, (e=3), equal to 11? https://en.wikipedia.org/wiki/RSA_(cryptosystem)#Encryption

1. Dexter wants to set up his own public keys. He chooses p = 23 and...

1. Dexter wants to set up his own public keys. He chooses p = 23 and q = 37 with e = 5. Answer the following using RSA cryptographic method: a) Encrypt the message ‘100’ and find the CIPHER number (C) to be sent. ‘100’ should be taken together as M while computing encryption [5 Marks] C = Me mod pq (Use This Formula) b) Find the decryption key ‘d’, using extended Euclidean GCD algorithm. [10 Marks] c) Now decrypt...

Write public and private key where p = 13, q = 37 and n = 481....

Write public and private key where p = 13, q = 37 and n = 481. Totient is 432. E is 19 and d is 91. Write public key as (n = , e =) and private key as (n = , d =)

Discrete Math: decipher the following: 392466 600311 599633 where the public key is (950141,11), 950141=p*q 11=e...

Discrete Math: decipher the following: 392466 600311 599633 where the public key is (950141,11), 950141=p*q 11=e and the private key (d) is 603395

Perform encryption using the RSA algorithm for the following: p=5, q=9, e=2, M=5 p=4, q=12, e=4,...

Perform encryption using the RSA algorithm for the following: p=5, q=9, e=2, M=5 p=4, q=12, e=4, M=3 C=Me mod n C is the cipher text and M is the plain text, n=p×q

p = 13 q = 37 Totient = 432 n = 481 e = 19 d...

p = 13 q = 37 Totient = 432 n = 481 e = 19 d = 91 public key: n = 481, e = 19 private key: n= 481, d = 91 Except 1, explain any other prime number less than e which cannot be used to generate d? What are those number and why they cannot be used?