MA378 RSA Encryption Homework

Due Friday, March 30

I. You are being sent a message by a person using the public keys
e=5
n= 10000000000000000000000000000000000000000000000000000000000000000000 00000000001303000000000000000000000000000000000000000000000000000000000 00000000000000000001677
You know that the prime factors of n are 10⁸⁰ + 129 and 10⁸¹+13.
The message that you receive is
171663025402460977622167329685993830535731580891747046636110368514563694 091731803094467099529678721476301098062464759556304208765184337181110411 0637591483189485
Decode the message

II Another person, using public keys
e= 14171
n = 471758703294079038853617468346414311784476006895799230100189541061 90773045495123647160120041508873811309337286850351982107411134611
sends the message
437261982487692529479119769054325981152581089009030805804096973313808 24611055578917544946060676831627279290841164054802058495542167
Decode the message.
You should turn in your results Friday, March 30.
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