hyperoperations造句
例句与造句
- Several of these numbers represent the number of values representable using common lower hyperoperations.
- In common terms, the hyperoperations are ways of compounding numbers that increase in growth based on the iteration of the previous hyperoperation.
- The successor function is the level-0 foundation of the infinite hierarchy of hyperoperations ( used to build addition, multiplication, exponentiation, tetration, etc . ).
- :There exists commutative versions of hyperoperations, for example in Hyper operator # Commutative hyperoperations .-- talk ) 20 : 00, 10 April 2014 ( UTC)
- :There exists commutative versions of hyperoperations, for example in Hyper operator # Commutative hyperoperations .-- talk ) 20 : 00, 10 April 2014 ( UTC)
- It's difficult to find hyperoperations in a sentence. 用hyperoperations造句挺难的
- Inbetween exponential and hyperbolic growth lie more classes of growth behavior, like the hyperoperations beginning at tetration, and A ( n, n ), the diagonal of the Ackermann function.
- Ackermann function \ phi was less similar to modern hyperoperations, because his initial conditions start with \ phi ( a, 0, n ) = a for all " n " > 2.
- Like all other hyperoperations of order 3 ( exponentiation ) and higher, pentation has the following trivial cases ( identities ) which holds for all values of " a " and " b " within its domain:
- In his 1947 paper, R . L . Goodstein introduced the specific sequence of operations that are now called " hyperoperations ", and also suggested the Greek names tetration, pentation, etc ., for the extended operations beyond exponentiation ( because they correspond to the indices 4, 5, etc . ).
- The concepts of successor, addition, multiplication and exponentiation are all hyperoperations; the successor operation ( producing " x " + 1 from " x " ) is the most primitive, the addition operator specifies the number of times 1 is to be added to itself to produce a final value, multiplication specifies the number of times a number is to be added to itself, and exponentiation refers to the number of times a number is to be multiplied by itself.