Generalized quaternion group:Q256

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VIEW DEFINITIONS USING THIS AS EXAMPLE: All terms |Group properties |Subgroup properties|
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Definition

This group is defined as the generalized quaternion group of order $256=2^{8}$ and degree $128=2^{7}$ .

Arithmetic functions

Want to compare and contrast arithmetic function values with other groups of the same order? Check out groups of order 256#Arithmetic functions

Function	Value	Similar groups	Explanation for function value
underlying prime of p-group	2
order (number of elements, equivalently, cardinality or size of underlying set)	256	groups with same order
prime-base logarithm of order	8	groups with same prime-base logarithm of order
max-length of a group	8		max-length of a group equals prime-base logarithm of order for group of prime power order
chief length	8		chief length equals prime-base logarithm of order for group of prime power order
composition length	8		composition length equals prime-base logarithm of order for group of prime power order
exponent of a group	128	groups with same order and exponent of a group \| groups with same exponent of a group	cyclic subgroup of order 128.
prime-base logarithm of exponent	7	groups with same order and prime-base logarithm of exponent \| groups with same prime-base logarithm of order and prime-base logarithm of exponent \| groups with same prime-base logarithm of exponent
nilpotency class	7	groups with same order and nilpotency class \| groups with same prime-base logarithm of order and nilpotency class \| groups with same nilpotency class
derived length	2	groups with same order and derived length \| groups with same prime-base logarithm of order and derived length \| groups with same derived length	the derived subgroup is contained in the cyclic subgroup and is hence abelian
Frattini length	7	groups with same order and Frattini length \| groups with same prime-base logarithm of order and Frattini length \| groups with same Frattini length
minimum size of generating set	2	groups with same order and minimum size of generating set \| groups with same prime-base logarithm of order and minimum size of generating set \| groups with same minimum size of generating set
subgroup rank of a group	2	groups with same order and subgroup rank of a group \| groups with same prime-base logarithm of order and subgroup rank of a group \| groups with same subgroup rank of a group
rank of a p-group	1	groups with same order and rank of a p-group \| groups with same prime-base logarithm of order and rank of a p-group \| groups with same rank of a p-group	all abelian subgroups are cyclic.
normal rank of a p-group	1	groups with same order and normal rank of a p-group \| groups with same prime-base logarithm of order and normal rank of a p-group \| groups with same normal rank of a p-group	all abelian normal subgroups are cyclic.
characteristic rank of a p-group	1	groups with same order and characteristic rank of a p-group \| groups with same prime-base logarithm of order and characteristic rank of a p-group \| groups with same characteristic rank of a p-group	All abelian characteristic subgroups are cyclic.