`` There isn't anything left to say, is there, Keith ''??

There was a measure of protection in its concrete walls and ceiling, but the engineers who hastily installed it were well aware that concrete is not much better than prayer, if as efficacious, when a direct hit comes along.

There is nothing for you '', Matsuo said.

There is much truth in both these charges, and not many Bourbons deny them.

There is unceasing pressure, but its sources are immediate.

There is little time for the men in the command centers to reflect about the implications of these clocks.

There is no room for error or waste.

There is a New South emerging, a South losing the folksy traditions of an agrarian society with the rapidity of an avalanche -- especially within recent decades.

There is a haunting resemblance between the notion of cause in Copernicus and in Freud.

There is still the remote possibility of planetoid collision.

There is the unexplainable, and there art raises questions that it does not attempt to answer ''.

There is nothing holy in wedlock.

There is no more `` plot '' than that ; ;

There is a legend ( Hawthorne records it in his `` English Notebooks ''.

It consists of fragmentary personal revelations, such as `` The Spark '': `` There is a spark dwells deep within my soul.

There is only one catch to this idyllic arrangement: Adam Smith was wrong.

Harris J. Griston, in Shaking The Dust From Shakespeare ( 216 ), writes: `` There is not a word spoken by Shylock which one would expect from a real Jew ''.

There is no justification for such misrepresentation.

There is no socially existential answer to the question.

There is no selectivity ; ;

There is probably some significance in the fact that two of the best incest stories I have encountered in recent years are burlesques of the incest myth.

There is no necessity, I suppose, to assert that Mr. Faulkner is Southern.

There is evidence to suggest, in fact, that many authors of the humorous sketches were prompted to write them -- or to make them as indelicate as they are -- by way of protesting against the artificial refinements which had come to dominate the polite letters of the South.

There may be a case of this sort, but it is not one we wish to argue, here.

There is a wide variety of representations possible and one can express a given Turing machine program as a sequence of machine tables ( see more at finite state machine, state transition table and control table ), as flowcharts ( see more at state diagram ), or as a form of rudimentary machine code or assembly code called " sets of quadruples " ( see more at Turing machine ).

There is, however, no finite set of statements that are couched in purely sensory terms and can express the satisfaction of the condition of the presence of a normal observer.

There is a notion of ind-finite group, which is the concept dual to profinite groups ; i. e. a group G is ind-finite if it is the direct limit of an inductive system of finite groups.

There are many other projective planes, both infinite, such as the complex projective plane, and finite, such as the Fano plane.

# There is a recursive enumeration of all mappings of the finite set X into S.

There are several other sources of noise in electronic circuits such as shot noise, seen in very low-level signals where the finite number of energy-carrying particles becomes significant, or flicker noise ( 1 / f noise ) in semiconductor devices.

There are two threads in the history of finite simple groups – the discovery and construction of specific simple groups and families, which took place from the work of Galois in the 1820s to the construction of the Monster in 1981 ; and proof that this list was complete, which began in the 19th century, most significantly took place 1955 through 1983 ( when victory was initially declared ), but was only generally agreed to be finished in 2004., work on improving the proofs and understanding continues ; see for 19th century history of simple groups.

There are infinitely many possible syllogisms, but only a finite number of logically distinct types, which we classify and enumerate below.

( There is a fundamental theorem holding in every finite group, usually called Fermat's little Theorem because Fermat was the first to have proved a very special part of it.

There is therefore a finite limit beyond which it is impossible to resolve separate points in the objective field, known as the diffraction limit.

According to the historian of science Norwood Russell Hanson: There is no bilaterally-symmetrical, nor excentrically-periodic curve used in any branch of astrophysics or observational astronomy which could not be smoothly plotted as the resultant motion of a point turning within a constellation of epicycles, finite in number, revolving around a fixed deferent. Any path — periodic or not, closed or open — can be represented with an infinite number of epicycles.

There is an equivalent definition of non-archimedean local field: it is a field that is complete with respect to a discrete valuation and whose residue field is finite.

There is an ε < sub > n </ sub > > 0 such that if an n-dimensional Riemannian manifold has a metric with sectional curvature | K | ≤ ε < sub > n </ sub > and diameter ≤ 1 then its finite cover is diffeomorphic to a nil manifold.

(...) There is here an infinity of an infinitely happy life to gain, a chance of gain against a finite number of chances of loss, and what you stake is finite.

There is only one smallest dominating set since dominating sets are nested, non-empty, and the set of candidates is finite.

There is a unique minimal way of cutting an irreducible oriented 3-manifold along tori into pieces that are Seifert manifolds or atoroidal called the JSJ decomposition, which is not quite the same as the decomposition in the geometrization conjecture, because some of the pieces in the JSJ decomposition might not have finite volume geometric structures.

There are exactly 10 finite closed 3-manifolds with this geometry, 6 orientable and 4 non-orientable.

There are many projective geometries, which may be divided into discrete and continuous: a discrete geometry comprises a set of points, which may or may not be finite in number, while a continuous geometry has infinitely many points with no gaps in between.

Affine geometry can be viewed as the geometry of affine space, of a given dimension n, coordinatized over a field K. There is also ( in two dimensions ) a combinatorial generalization of coordinatized affine space, as developed in synthetic finite geometry.

There are a number of analogous results between algebraic groups and Coxeter groups – for instance, the number of elements of the symmetric group is, and the number of elements of the general linear group over a finite field is the q-factorial ; thus the symmetric group behaves as though it were a linear group over " the field with one element ".

There are two main kinds of finite plane geometry: affine and projective.

* There is a finite supply of classic stamps.

There are three approaches to the analysis: the mechanics of materials approach ( also known as strength of materials ), the elasticity theory approach ( which is actually a special case of the more general field of continuum mechanics ), and the finite element approach.