26-letter words containing h, o, t, r, l
- to look on the bright side — If you look on the bright side, you try to be cheerful about a bad situation by thinking of some advantages that could result from it, or thinking that it is not as bad as it could have been.
- to rub salt into the wound — If someone or something rubs salt into the wound, they make the unpleasant situation that you are in even worse, often by reminding you of your failures or faults.
- to spare someone's blushes — If you spare someone's blushes or save someone's blushes, you avoid doing or saying something that will embarrass them.
- to steal someone's thunder — If you steal someone's thunder, you get the attention or praise that they thought they would get, usually by saying or doing what they had intended to say or do.
- to take sb to the cleaners — If someone takes you to the cleaners, they unfairly take most of your money, for example in a business deal or in gambling.
- to throw down the gauntlet — If you throw down the gauntlet to someone, you say or do something that challenges them to argue or compete with you.
- triple combination therapy — treatment with three different drugs
- turn the tables on someone — to cause a complete reversal of circumstances, esp to defeat or get the better of someone who was previously in a stronger position
- walther von der vogelweide — c1170–c1230, German minnesinger and poet.
- with one's beer goggles on — seeing people and things as increasingly attractive as one's alcohol intake rises
- won't/wouldn't hear of sth — If you say that you won't hear of someone doing something, you mean that you refuse to let them do it.
- worth one's weight in gold — extremely helpful, kind, etc
- yellow-crowned night heron — any of several thick-billed, crepuscular or nocturnal herons of the genus Nycticorax and related genera, as N. nycticorax (black-crowned night heron) of the Old and New Worlds, and Nyctanassa violacea (yellow-crowned night heron) of America.
- zermelo fränkel set theory — (mathematics) A set theory with the axioms of Zermelo set theory (Extensionality, Union, Pair-set, Foundation, Restriction, Infinity, Power-set) plus the Replacement axiom schema: If F(x,y) is a formula such that for any x, there is a unique y making F true, and X is a set, then {F x : x in X} is a set. In other words, if you do something to each element of a set, the result is a set. An important but controversial axiom which is NOT part of ZF theory is the Axiom of Choice.