Inversed vs Inverted - What's the difference?
inversed | inverted |
(inverse)
Opposite in effect or nature or order
reverse, opposite in order
(botany) Inverted; having a position or mode of attachment the reverse of that which is usual.
(mathematics) Having the properties of an inverse; said with reference to any two operations, which, when both are performed in succession upon any quantity, reproduce that quantity.
(linguistics, Kiowa-Tanoan) A grammatical number marking that indicates the opposite grammatical number (or numbers) of the default number specification of noun class.
(category theory) A morphism which is both a left inverse and a right inverse.
The opposite of a given, due to contrary nature or effect.
:: ''Deposing is the inverse of installing, and vice versa
The reverse version of a procedure.
(mathematics) The inverse of an element x'' with respect to a binary operation is an element that when combined with ''x yields the appropriate identity element.
(logic) A statement constructed from the negatives of the premise and conclusion of some other statement: ~p ? ~q is the inverse of p ? q.
(surveying) To compute the bearing and distance between two points.
Changed to a contrary or counterchanged order or direction; characterized by inversion; turned upside down; reversed; opposite; contrary.
(music) (of a chord ) Having the lowest note transposed an octave higher
(chemistry) (of sugar ) Having its polarization changed by hydrolysis; see invert sugar
(invert)
As verbs the difference between inversed and inverted
is that inversed is past tense of inverse while inverted is past tense of invert.As an adjective inverted is
changed to a contrary or counterchanged order or direction; characterized by inversion; turned upside down; reversed; opposite; contrary.inversed
English
Verb
(head)Anagrams
*inverse
English
Adjective
(-)- Multiplication is the inverse operation to division.
Derived terms
* inverse function * inverselyNoun
(en noun)- Removing one's shoes is the inverse of putting one's shoes on
- The additive inverse of x is -x as, x + -x = 0 where 0 is the additive identity element.
- The multiplicative inverse of x is x-1 as, x * x-1 = 1 where 1 is the multiplicative identity element.
- ''The compositional inverse of a function f is f–1 as, f f–1 is the identity function (ie f–1(f(a)) = a for all a).