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gag    音标拼音: [g'æg]
n. 箝口物,箝制言论,讨论终结
vt. 使窒息,使呕吐,压制言论自由,插科打浑

箝口物,箝制言论,讨论终结使窒息,使呕吐,压制言论自由,插科打浑

gag
n 1: a humorous anecdote or remark intended to provoke laughter;
"he told a very funny joke"; "he knows a million gags";
"thanks for the laugh"; "he laughed unpleasantly at his own
jest"; "even a schoolboy's jape is supposed to have some
ascertainable point" [synonym: {joke}, {gag}, {laugh}, {jest},
{jape}]
2: restraint put into a person's mouth to prevent speaking or
shouting [synonym: {gag}, {muzzle}]
v 1: prevent from speaking out; "The press was gagged" [synonym:
{gag}, {muzzle}]
2: be too tight; rub or press; "This neckband is choking the
cat" [synonym: {choke}, {gag}, {fret}]
3: tie a gag around someone's mouth in order to silence them;
"The burglars gagged the home owner and tied him to a chair"
[synonym: {gag}, {muzzle}]
4: make jokes or quips; "The students were gagging during
dinner" [synonym: {gag}, {quip}]
5: struggle for breath; have insufficient oxygen intake; "he
swallowed a fishbone and gagged" [synonym: {gag}, {choke},
{strangle}, {suffocate}]
6: cause to retch or choke [synonym: {gag}, {choke}]
7: make an unsuccessful effort to vomit; strain to vomit [synonym:
{gag}, {heave}, {retch}]

Gag \Gag\, n.
1. Something thrust into the mouth or throat to hinder
speaking.
[1913 Webster]

2. A mouthful that makes one retch; a choking bit; as, a gag
of mutton fat. --Lamb.
[1913 Webster]

3. A speech or phrase interpolated offhand by an actor on the
stage in his part as written, usually consisting of some
seasonable or local allusion. [Slang]


Gag \Gag\, v. t. [imp. & p. p. {Gagged}; p. pr. & vb. n.
{Gagging}.] [Prob. fr. W. cegio to choke or strangle, fr. ceg
mouth, opening, entrance.]
1. To stop the mouth of, by thrusting sometimes in, so as to
hinder speaking; hence, to silence by authority or by
violence; not to allow freedom of speech to. --Marvell.
[1913 Webster]

The time was not yet come when eloquence was to be
gagged, and reason to be hood winked. --Maccaulay.
[1913 Webster]

2. To pry or hold open by means of a gag.
[1913 Webster]

Mouths gagged to such a wideness. --Fortescue
(Transl.).
[1913 Webster]

3. To cause to heave with nausea.
[1913 Webster]


Gag \Gag\, v. i.
1. To heave with nausea; to retch.
[1913 Webster]

2. To introduce gags or interpolations. See {Gag}, n., 3.
[Slang] --Cornill Mag.
[1913 Webster]

234 Moby Thesaurus words for "gag":
Oregon boat, acoustic tile, acting, antiknock, asphyxiate, baffler,
balk, barf, be nauseated, be seasick, be sick, belly laugh, bilbo,
blue story, boggle, bond, bonds, bottle up, bridle, bring up,
buffoonery, business, camisole, censor, chains, characterization,
check, choke, choke off, choke on, chuck up, clamp down on, collar,
cork, cork up, crack, crack down on, crush, cuffs, curb, cushion,
damp, damp down, dampener, damper, deflate, dirty joke,
dirty story, disarm, discourage, disgorge, double entendre,
drollery, drown, dumbfound, egest, enchain, ethnic joke,
extinguish, fast one, feed the fish, feel disgust, fetter, fun,
funny story, gibe, good one, good story, gyves, halter, ham,
hammy acting, hamper, hamstring, handcuff, handcuffs, heave,
heave the gorge, hoax, hobble, hobbles, hog-tie, hoke, hokum,
hold down, hopples, howler, hush, hush-hush, hushcloth,
impersonation, inhibit, irons, jape, jest, jestbook, jib, joke,
jump on, keck, keep down, keep under, kill, knock out, laugh,
leading strings, leash, manacle, mimesis, mimicking, mimicry,
miming, muffle, muffler, mummery, mute, muzzle, overacting, panic,
pantomiming, paralyze, patter, performance, performing,
personation, pillory, play, playacting, playing, point, portrayal,
pour water on, practical joke, prank, projection, prostrate, puke,
pun, put down, put to silence, quash, quell, quench, quiet,
quieten, quietener, quip, regurgitate, reins, reject,
representation, repress, restrain, restraint, restraints, retch,
rib tickler, riot, ruse, sally, scream, scruple, shackle, shush,
shut down on, shy, sick joke, sick up, sicken at, sidesplitter,
sight gag, silence, silence cloth, silencer, sit down on, sit on,
slapstick, smash, smother, soft pedal, soft-pedal, sordine,
sordino, sound-absorbing material, soundproofing,
soundproofing insulation, sourdine, spew, sport, squash, squelch,
stage business, stage directions, stage presence, stanch, stick,
stickle, stifle, still, stocks, stop up, story, straightjacket,
strain, strait-waistcoat, straitjacket, strangle, stranglehold,
strike dumb, stultify, stumble, stunt, subdue, suffocate, suppress,
taking a role, tether, throttle, throw up, trammel, trammels,
trick, truss up, upchuck, visual joke, vomit, wheeze, wile,
wisecrack, witticism, wow, yak, yarn, yoke

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  • Prove that $o(a)=o(gag^{-1})$ - Mathematics Stack Exchange
    Let G G be a group and a ∈ G a ∈ G Prove that o(a) = o(gag−1) o (a) = o (g a g − 1) for every element of order 2 2 in G G If a be the only element of order 2 2 in G G deduce that a commutes with every element of G G Approach: Let o(a) = n o (a) = n, then an = e a n = e Now
  • Let $a \\in G$. Show that for any $g \\in G$, $gC(a)g^{-1} = C(gag^{-1})$.
    Try checking if the element ghg−1 you thought of is in C(gag−1) and then vice versa
  • $G$ is finite, $A \\leq G$ and all double cosets $AxA$ have the same . . .
    Closed 8 years ago If G G is a finite group and A A is a subgroup of G G such that all double cosets AxA A x A have the same number of elements, show that gAg−1 = A g A g − 1 = A for all g ∈ G g ∈ G Here is my attempt, I guess it's correct but please verify it
  • abstract algebra - $x$ conjugate to $y$ in a group $G$ is an . . .
    I am writing this answer largely to push through that, Group theory is not a collection of discrete facts, but really a continuum of ideas about symmetry in Mathematics So, having solved this exercise, you can ask yourself the following questions What is the number of equivalence classes (or since the relation is conjugation, conjugacy classes)? Answer This may not have a nice answer for
  • Let $a$ be an element of a group. Show that $a$ and $a^{-1}$ have the . . .
    I think one way to solve it is by considering the conjugation of a a and a−1 a − 1 using g ∈ G g ∈ G That is, ag = gag−1 a g = g a g − 1 and (a−1)g = ga−1g−1 (a − 1) g = g a − 1 g − 1 Then, if n n is the order of a a we have (ag)n = e (a g) n = e; since, (ag)n = gag−1gag−1 ⋯g−1gag−1 = (a g) n = g a g − 1 g a g − 1 ⋯ g − 1 g a g − 1 = = gaegaea ⋯
  • abstract algebra - Centralizer and Normalizer as Group Action . . .
    The stabilizer subgroup we defined above for this action on some set A ⊆ G A ⊆ G is the set of all g ∈ G g ∈ G such that gAg−1 = A g A g − 1 = A — which is exactly the normalizer subgroup NG(A) N G (A)! Thus we know that the normalizer is a subgroup because stabilizers are
  • Reflexive Generalized Inverse - Mathematics Stack Exchange
    Definition: G is a generalized inverse of A if and only if AGA=A G is said to be reflexive if and only if GAG=G I was trying to solve the problem: If A is a matrix and G be it's generalized inverse then G is reflexive if and only if rank (A)=rank (G)
  • Let $G$ be a group, $a \\in G$. Prove that for all $g \\in G$, $|a . . .
    I am stuck on this problem Let's just consider the case where |a| | a | is finite So |a| = n | a | = n where n n is the least positive integer such that an = e a n = e First I need to show that |g−1ag| ≤ n | g − 1 a g | ≤ n I notice that g−1ang =g−1eg =g−1g = e g − 1 a n g = g − 1 e g = g − 1 g = e But does this imply that (g−1ag)n = e (g − 1 a g) n = e? If so, why
  • Gauge transformations in differential forms - Mathematics Stack Exchange
    I am aware of gauge transformations and covariant derivatives as understood in Quantum Field Theory and I am also familiar with deRham derivative for vector valued differential forms I thinking
  • by $g$ is isomorphism - Mathematics Stack Exchange
    For fixed g ∈ G g ∈ G, prove that conjugation by g g is an isomorphism from G G onto itself (i e an automorphism of G G) Deduce that x x and gxg−1 g x g − 1 have that same order for all x ∈ G x ∈ G and that for any subset A A of G G, |A| = |gAg−1| | A | = | g A g − 1 | (here gAg−1 = {gag−1|a ∈ A} g A g − 1 = {g a g − 1 | a ∈ A} ) Take g ∈ G g ∈ G We show that





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