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How and why are real numbers more difficult to represent and process than integers?
There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.
What are non positive integers?
Non-positive integers are zero and the negative integers.
Which set represent the integers?
The set of integers represents the integers.
What are the boundary points of the integers?
The boundary points of the integers is simply the integers.
Integers in counting order?
consecutive integers
What are some unique uses for integers?
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Where do you go to find all about the uses of integers?
You cannot. There are uses for them which are still undiscovered.
What are the examples of the uses of integers?
adding, subtracting, multiplying, dividing
Are there any mathematicians who used integers?
Every mathematician uses/used integers. It is one of the most important number sets.
What careers do you use integers for?
I'm thinking that a stock marketer uses integers to symbolize if a stock has gone up or down.
What are two uses of integers?
You can use them for counting, which is in fact addition. You can also use them for subtracion. Integers are natural numbers. This means you don't use decimals or fractions.
What job uses integers?
Mostly every job out there.... I probly cant name one job that doesn't use integers. But probably a mathematician or a teacher i would say
What is the best algorithm for b multiplying integers?
The best algorithm for multiplying integers depends on the size of the numbers involved. For small integers, the standard grade-school multiplication method is efficient. For larger integers, algorithms like Karatsuba or the Fast Fourier Transform (FFT)-based multiplication can significantly reduce computation time. For extremely large integers, the Schönhage-Strassen algorithm, which uses FFT, is considered one of the fastest.
Why does golf use integers?
The scoring in golf uses integers. You want to try to get a negative number. The higher the number is (positive), the more you're losing. The lower the number is (negative), the more you're winning. :) HOPE THIS HELPS! <3
What is a bijective numeration?
A bijective numeration is a numeral system which uses digits to establish a bijection between finite strings and the positive integers.
How and why are real numbers more difficult to represent and process than integers?
There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.There are more real numbers than integers. The set of integers is countably infinite, of magnitude aleph-zero. The set of real numbers is uncountably infinite (specifically, aleph-one).A computer can't really represent real numbers (that would require an infinite amount of memory), rather, it uses an approximation.
When the negative integers the positive integers and 0 are combined the integers are formed?
Negative integers, zero and the positive integers, together form the set of integers.
