This time we are looking on the crossword clue for: Kerfuffle.
it’s A 9 letters crossword puzzle definition. See the possibilities below.
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Possible Answers: ADO, STIR, SPAT, TODO, ROW, FLAP, HOOHA, TUMULT, BROUHAHA.
Last seen on: –NY Times Crossword 9 Feb 20, Sunday
–LA Times Crossword 22 Dec 19, Sunday
–NY Times Crossword 9 Sep 19, Monday
–Wall Street Journal Crossword – August 29 2019 – Starch Blockers
–NY Times Crossword 4 Aug 19, Sunday
–Universal Crossword – Jun 21 2019
–Canadiana Crossword – Apr 1 2019
–The Chronicle of Higher Education Crossword – Nov 16 2018
–NY Times Crossword 12 Aug 2018, Sunday
-NY Times Crossword 14 Nov 2017, Tuesday
-NY Times Crossword 9 Nov 2017, Thursday
Random information on the term “ADO”:
Ado of Vienne (Latin: Ado Viennensis, French: Adon de Vienne; d. 16 December 874) was archbishop of Vienne in Lotharingia from 850 until his death and is venerated as a saint. He belonged to a prominent Frankish family and spent much his early adulthood in Italy. Several of his letters are extant and reveal their writer as an energetic man of wide sympathies and considerable influence. Ado’s principal works are a martyrologium, and a chronicle, Chronicon sive Breviarium chronicorum de sex mundi aetatibus de Adamo usque ad annum 869.
Born into a noble family, he was sent as a child for his education, first to Sigulfe, abbot of Ferrières, and then to Marcward, abbot of Prüm near Trier. After the death of Marcward in 853, Ado went to Rome where he stayed for nearly five years, and then to Ravenna, after which Remy, archbishop of Lyon, gave him the parish of Saint-Romain near Vienne. The following year he was elected archbishop of Vienne and dedicated in August or September 860, despite opposition from Girart de Roussillon, Count of Paris, and his wife Berthe.
Random information on the term “TODO”:
Clear Script (Oirat: ᡐᡆᡑᡆ
ᡋᡅᡔᡅᡎ, Тодо бичиг; Mongolian: Тод бичиг, ᠲᠣᠳᠣ
ᠪᠢᠴᠢᠭ᠌ tod biçig, or just todo) is an alphabet created in 1648 by the Oirat Buddhist monk Zaya Pandita for the Oirat language. It was developed on the basis of the Mongolian script with the goal of distinguishing all sounds in the spoken language, and to make it easier to transcribe Sanskrit and the Tibetic languages.
Clear Script is a Mongolian script, whose obvious closest forebear is vertical Mongolian. This Mongolian script was derived from the Old Uyghur alphabet, which itself was descendent from the Aramaic alphabet. Aramaic is an abjad, an alphabet that has no symbols for vowels, and Clear Script is the first in this line of descendants to develop a full system of symbols for all the vowel sounds.
As mentioned above, Clear Script was developed as a better way to write Mongolian, specifically of the Western Mongolian groups of the Oirats and Kalmyks. The practicality of Clear Script lies in the fact that it was supremely created in order to dissolve any ambiguities that might appear when one attempts to write down a language. Not only were vowels assigned symbols, but all existing symbols were clarified. All of the ‘old’ symbols, those that did not change from the previously used script, were assigned a fixed meaning, based mostly on their Uyghur ancestors. New symbols and diacritics were added to show vowels and vowel lengths, as well as distinguish between voiced and unvoiced consonants. There were even some marks enabling distinctions such as between ši and si which are unimportant for words written in the Oirat language but are useful for the transcription of foreign words and names.
Random information on the term “ROW”:
In linear algebra, a column vector or column matrix is an m × 1 matrix, that is, a matrix consisting of a single column of m elements,
Similarly, a row vector or row matrix is a 1 × m matrix, that is, a matrix consisting of a single row of m elements
Throughout, boldface is used for the row and column vectors. The transpose (indicated by T) of a row vector is a column vector
and the transpose of a column vector is a row vector
The set of all row vectors forms a vector space called row space, similarly the set of all column vectors forms a vector space called column space. The dimensions of the row and column spaces equals the number of entries in the row or column vector.
The column space can be viewed as the dual space to the row space, since any linear functional on the space of column vectors can be represented uniquely as an inner product with a specific row vector.
To simplify writing column vectors in-line with other text, sometimes they are written as row vectors with the transpose operation applied to them.