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Can numbers be stored accurately in a computer?
Well, any computer ever made has some sort of limit to how much it can store. For example, the number Pi has an infinite number of digits, so no computer could ever store Pi accurately because it's infinite in size. But, for just about any practical purpose, numbers can be stored accurately *enough*. It all depends on what you need those numbers for -- store only as much as you need to do the task at hand.
How can you have infinite electricity?
you dont
What is je t'aime a l'infini?
The direct translation of this phrase is 'I like/love you has the infinite one'. It does not make much sense... depending on what context it is used in, it might be more understandable. (i.e. It might be understood in English as "I love you, the infinite one." -- "I love you, infinite one." -- "I love you, endless one." -- "I love the infinite one.")The phrase is also used as an album title, released by Benny B.
What is the significance of the cosine infinite product in mathematical analysis?
The cosine infinite product is significant in mathematical analysis because it provides a way to express the cosine function as an infinite product of its zeros. This representation helps in understanding the behavior of the cosine function and its properties, making it a useful tool in various mathematical applications.
Archimedes is known for what in mathematics?
1. Method of exhaustion to calculate the area under the arc of a parabola with the summation of an infinite series. 2. Approximation of pi. 3. Defined the spiral bearing his name 4. Volumes of surfaces of revolution 5. System for expressing very large numbers.
