Examples of 'modular arithmetic' in a sentence
Meaning of "modular arithmetic"
Modular arithmetic is a system of arithmetic that focuses on mathematical operations performed on remainders. It involves numbers being reduced to remainders when divided by a specified modulus. This type of arithmetic is used in various fields, such as cryptography, computer science, and number theory, and it has applications in diverse areas, including encryption algorithms, error detection, and hash functions
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- Any system of arithmetic for integers which, for some given positive integer n, is equivalent to the set of integers being mapped onto the finite set {0, ... n} according to congruence modulo n, and in which addition and multiplication are defined consistently with the results of ordinary arithmetic being so mapped.
How to use "modular arithmetic" in a sentence
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modular arithmetic
Modular arithmetic is based on the congruence relation.
This is trivially proven using modular arithmetic.
See modular arithmetic for notation and terminology.
We can express this statement in modular arithmetic too.
Modular arithmetic connects with primes in an interesting way.
Such wrapping is called modular arithmetic.
This brings us to modular arithmetic which is known as clock arithmetic.
Doing this is easy with modular arithmetic.
This makes use of modular arithmetic for provisions especially attractive.
Now for a question on modular arithmetic.
In modern times modular arithmetic is sometimes used in digital signal processing.
Development of algorithms for high precision computations in modular arithmetic.
This is called modular arithmetic.
Modular arithmetic coprocessor comprising two multiplication circuits working in parallel.
It is the basis of modular arithmetic.
See also
See modular arithmetic for an older and related convention applied in number theory.
Device improving the processing speed of a modular arithmetic coprocessor.
The invention relates to a modular arithmetic coprocessor comprising two multiplication circuits working in parallel.
The fundamental property of multiplication in modular arithmetic may thus be written.
The coprocessor is a modular arithmetic coprocessor especially designed to carry out computations on large numbers.
Multiplication in modular arithmetic.
We studied rsa cryptography as an important application to prime numbers and modular arithmetic.
Integer modular arithmetic.
Method for the performance of an integer division with a modular arithmetic coprocessor.
All calculations of modular arithmetic take place in the finite set.
Many complex cryptographic algorithms are actually based on fairly simple modular arithmetic.
Considerations related to modular arithmetic have led to the notion of valuation ring.
Modular Arithmetic be a primitive fifth root of unity.
We can do these calculations faster by using various modular arithmetic and Legendre symbol properties.
Modular arithmetic coprocessors are typically used in encryption and / or decryption circuits.
They have got a fancy name and everything, modular arithmetic.
Modular arithmetic coprocessor enabling the performance of non-modular operations at high speed.
The present study refers to a tool of number theory, called modular arithmetic.
The invention relates to a modular arithmetic coprocessor able to perform non-modular operations at high speed.
Instead of rewriting the current symbol, it can perform a modular arithmetic incrementation on it.
In modular arithmetic notation, define the function f as follows,.
The simplest finite fields, with prime order, are most directly accessible using modular arithmetic.
In their solution, they used modular arithmetic and one-way functions.
For the first part of the lecture, we are going to talk about Modular Arithmetic.
Modular arithmetic is a modification of usual arithmetic, by doing all calculations " modulo " a fixed number n.
So, to do that, we are going to use a little bit of Modular Arithmetic using remainders.
Alternatively, modular arithmetic is convenient for calculating the check digit using modulus 11.
So, that remainder is actually, essentially your computing Modular Arithmetic when you compute remainders.
In modular arithmetic ( modulo a prime number ) and for real numbers, nonzero numbers have a multiplicative inverse.
Alright, let us talk about another example of Modular Arithmetic using remainder.
FIG . 1 shows a modular arithmetic coprocessor according to the prior art ;.
In particular, I am going to talk about remainders in Modular Arithmetic.
FIG . 1 shows a modular arithmetic coprocessor.
The invention relates to the field of microprocessors, and, more particularly, to a modular arithmetic coprocessor.
FIGS . 2 and 3 show respective embodiments of a modular arithmetic coprocessor according to the present invention.
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