Surreal numbers are the most natural collection of numbers which includes both the real numbers and the infinite ordinal numbers of Georg Cantor. They were invented by John H. Conway in 1969. Every real number is surrounded by surreals, which are closer to it than any real number. Knuth describes the surreal numbers in a work of fiction. The surreal numbers are written using the notation {a|b}, where {|} = 0, {0|} = 1 is the simplest number greater than 0, {1|} = 2 is the simplest number greater than 1, etc. Similarly, {|0} = - 1 is the simplest number less than 0, etc. However, 2 can also be represented by {1|3}, {3/2|4}, {1|ω}, etc.
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Jonathan is doing really well in all of his classes this semester, 5 A’s & 2 B’s (he has a computer essentials class instead of PLC). In his Algebra class that Nathan is helping him with he has an A+.
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