terms |
supersolvable |
As a noun terms
is .
As an adjective supersolvable is
(mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
factor |
supersolvable |
In mathematics|lang=en terms the difference between factor and supersolvable
is that
factor is (mathematics) any of various objects multiplied together to form some whole while
supersolvable is (mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
As a noun factor
is (obsolete) a doer, maker; a person who does things for another person or organization.
As a verb factor
is to find all the factors of (a number or other mathematical object) (the objects that divide it evenly).
As an adjective supersolvable is
(mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
invariant |
supersolvable |
In mathematics|lang=en terms the difference between invariant and supersolvable
is that
invariant is (mathematics) unaffected by a specified operation (especially by a transformation) while
supersolvable is (mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
As adjectives the difference between invariant and supersolvable
is that
invariant is not varying; constant while
supersolvable is (mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
As a noun invariant
is an invariant quantity, function etc.
group |
supersolvable |
As a noun group
is a number of things or persons being in some relation to one another.
As a verb group
is to put together to form a group.
As an adjective supersolvable is
(mathematics) describing a group having an invariant normal series where all the factors are cyclic groups.
