![]() ![]() I guess I need to look at even more irrational numbers. Square roots of natural numbers which are not perfect squares or recurring. Also, after the void, both e and pi have a series of regularly spaced increases. Irrational numbers are real numbers that cannot be expressed as ratios of integers. Notice that none of the other irrational numbers have something like this - a jump much greater than the 'average' except for e and pi. I would assume that as you get to larger and larger iteration values, the gaps would get bigger. This is an iteration gap of over 300,000. Topics include powers of ten, notable integers, prime and cardinal numbers, and the myriad system. ![]() The next best fraction is 271801/99990 (which also matches to the 9 th decimal). A list of articles about numbers (not about numerals). There is the fraction 49171/18089 (which matches e up to the 9 th decimal place). However, take a look at the green curve for e. irrational number, any real number that cannot be expressed as the quotient of two integersthat is, p/q, where p and q are both integers. That is the jump from the 355/113 fraction being so awesome. We have already described numbers as counting numbers, whole numbers. Next, the small spike on the blue pi-curve. Identify rational numbers from a list of numbers Identify irrational numbers from. I have a feeling that this 'random' number list somehow used pi to generate its numbers. First, the arrow pointing to the black line. These are the best fractions for 1 million iterations. Let me go to a larger iteration number - I get this. The other lines seems to be pretty steady (but maybe that is because they are all square roots). Pi, e and the fake irrational number (random). This is not true in the case of radication.Here, I point out three lines.
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