Interesting

Is infinity +1 the same as infinity?

Is infinity +1 the same as infinity?

Yet even this relatively modest version of infinity has many bizarre properties, including being so vast that it remains the same, no matter how big a number is added to it (including another infinity). So infinity plus one is still infinity.

Is infinity 1 the smallest number?

Therefore, it is undefined. In the sense of how you are asking the question, no. 1 is 1 MORE than zero.

Is there an infinity bigger than infinity?

With this definition, there is nothing (meaning: no real numbers) larger than infinity. There is another way to look at this question. It come from an idea of Georg Cantor who lived from 1845 to 1918. Cantor looked at comparing the size of two sets, that is two collections of things.

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Can small be infinite?

In physical reality – no. Anything infinitely small does not exist although some objects act as if they are point-like. In mathematical Real numbers – no.

Is infinitesimal real number?

An infinitesimal is a nonstandard real number that is less, in absolute value, than any positive standard real number.

What is the smallest infinity?

aleph 0
The concept of infinity in mathematics allows for different types of infinity. The smallest version of infinity is aleph 0 (or aleph zero) which is equal to the sum of all the integers. Aleph 1 is 2 to the power of aleph 0. There is no mathematical concept of the largest infinite number.

What is the value of one less than infinity?

As far as it refers to the normal arithmetic numbers, infinity isn’t a number so ‘one less than infinity’ could be taken as meaningless or it could be taken as infinity. Infinity is not a number, it is an expression.

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What is the answer to infinity-infinity?

In short, any real number x, when added to infinity gives infinity again. That is, x + infinity = infinity (where x is a real number). which means that infinity-infinity can take any real number as an answer. That’s why zero is a perfect answer, but it is not the only one. This is not a precise explanation, but an intuitive one.

Is infinity a real number?

And formally speaking, infinity is not a real number! However, one could extend the set of real numbers to include the two “numbers”: +infinity and -infinity, and call such a set “The extended real numbers” (See Principles of Mathematical Analysis by Walter Rudin: Pg. 11-12).

Do all infinities come in different sizes?

Strange but True: Infinity Comes in Different Sizes. That assumption, however, is not entirely sound. As German mathematician Georg Cantor demonstrated in the late 19th century, there exists a variety of infinities—and some are simply larger than others. Take, for instance, the so-called natural numbers: 1, 2, 3 and so on.