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0answers
24 views

RSA with Garner - addition chains

I computed RSA, but the decryption is done with Garner's method. That will extract the message m=y^d mod n by dividing the exponentiation into 3 smaller ones. The algorithm is 5-6.5 times faster. The ...
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0answers
29 views

Modular exponention fast way

I'm working on a RSA assignment. Since the numbers were getting pretty large is used the InfInt biginter library. Now, the problem I'm facing is, if the numbers are too big like 6-7 digit input, the ...
1
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2answers
570 views

modular exponentiation in Java using eulers totient and the chinese remainder theorem [closed]

Edit - clarified I'm trying to implement modular exponentiation in Java using lagrange and the chinese remainder theorem. For example, if N is 55, having been given the prime factors 5 and 11, phi ...
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1answer
393 views

a factor that impacts RSA encryption/decryption time

"the RSA encryption or decryption time is roughly proportional to the number of bits in the exponent". I am assuming that it counts more on the position of the bits. For example, M^e. e1 = 10001 = 17 ...
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3answers
8k views

Store and work with Big numbers in C

I need help working with very big numbers. According to Windows calc, the exponent 174^55 = 1.6990597648061509725749329578093e+123 How would I store this using C (c99 standard)? int main(){ ...