Let it go beyond a certain point, and it will tend for a time to gain strength from its own development as its effects spread and return to intensify the process of collapse ”.

" He did however add this caveat, " Let me emphasize that this note is not a plea for a return to a gold standard ....

Let me not be misunderstood: richly as the valleys wave with corn, and beautiful as is the general aspect of modern Palestine, vestiges of the ancient cultivation are every where visible ... proofs far more than sufficient that the land still enjoys her Sabbaths, and only waits the return of her banished children, and the application of industry commensurate with her agricultural capabilities, to burst once more into universal luxuriance — all that she ever was in the days of Solomon.

Newcastle libertarian Alice Winspear, the wife of pioneer socialist William Robert Winspear, wrote: " Let us have freedom — freedom for both man and woman — freedom to earn our bread in whatever vocation is best suited to us, and freedom to love where we like, and to live only with those whom we love, and by whom we are loved in return.

Hedison did not expect to return to the role, saying " I was sure that ... and Let Die would be my first – and last " and Glen was reluctant to cast the 61-year old actor, since the role even had a scene parachuting.

Let us return to our Socrates syllogism.

Aiken made it to the round of 32 before being cut from the show, but he was invited to return for the " Wild Card " round ; his performance of Elton John's " Don't Let the Sun Go Down on Me " sent him on to the final 12 as the viewer's choice.

" Baby Let Me Follow You Down " would later return in a driving electric arrangement during his 1965 and 1966 tours with The Hawks ; a live recording was included on Live 1966.

Let an individual's increasing, concave von Neumann-Morgenstern utility function be u, let r < sub > f </ sub > be the return on the risk-free asset, and let r be the random return on the risky asset.

Let denote the error terms ( return residuals, with respect to a mean process ) i. e. the series terms.

; Networking through ' Extra-local, Itinerant Ministries ': " After some days Paul said to Barnabas, " Let us return and visit the brethren in every city in which we proclaimed the word of the Lord, and see how they are.

In this quest, she authored and coauthored a number of songs for children: " Ima sarata munanki " (" What kind of corn do you want "), " Aylluman kutiripuna " (" Let us return to the community ") and many others.

# Q1: Never Let Me Down marks your return to the studio to make your own album for the first time since 1984.

Conley would later return to the BBC to present Let Me Entertain You in 2006.

Let us return to the example of John and Bill.

Let History Judge reflected the dissident thinking that emerged in the 1960s among Soviet intellectuals who, like Medvedev, sought a reformed, democratic socialism and a return to Leninism.

Among the admirers of the song was the Naushad who reportedly said, " Let me have this ghazal and take all my compositions in return " upon hearing it.

4 ) Let us spare tracks the rigor that it will be possible, we will employ force only to subdue the stubborn rebellion, and that those who at the time of the publication of manifestos, return of loyal subjects to the duty, with research on their past conduct, with the exception of the heads of sedition, and convicted of major crimes that can not be removed from the prosecution of justice, will be tried according to the laws and judicial forms

Let there be items, to where has a value and weight.

LET x = rnd * 20! Let the value ' x ' equal a random number between ' 0 ' and ' 20 '

LET y = rnd * 20! Let the value ' y ' equal a random number between ' 0 ' and ' 20 '

Let X be a normed topological vector space over F, compatible with the absolute value in F. Then in X *, the topological dual space X of continuous F-valued linear functionals on X, all norm-closed balls are compact in the weak -* topology.

Let be the value of the variable of interest at a certain location.

Let be the mean of the values in associated with class c, and let be the variance of the values in associated with class c. Then, the probability of some value given a class,, can be computed by plugging into the equation for a Normal distribution parameterized by and.

Let X be a random variable with finite expected value μ and finite non-zero variance σ < sup > 2 </ sup >.

* Let X be a random variable that takes the value 0 with probability 1 / 2, and takes the value 1 with probability 1 / 2.

* Let Z be a random variable that takes the value-1 with probability 1 / 2, and takes the value 1 with probability 1 / 2.

Let p ( n ; H ) be the probability that during this experiment at least one value is chosen more than once.

Let an initial value problem be specified as follows.

The reverse shows the legend in two lines -- The religion of the Protestants, the laws of England and the liberty of Parliament, with three plumes and the value numeral III above the declaration and the year 1642 below it, the whole being surrounded by the legend -- Let God arise and His enemies be scattered.

Let be the function that returns the value of used to compute if, or if.

Let, denote the pre-treatment and post-treatment measures on subject i. The possible effect of the treatment should be visible in the differences, which we assume to be independently distributed, all with the same expected value and variance.

Let a be the minimum non-negative value of φ ( it exists since the integral of φ is infinite ).

It can be proved as follows: Let S be a non-empty subset of R and U be an upper bound for S. Substituting a larger value if necessary, we may assume U is rational.

Let x < nowiki >'</ nowiki > be the new value of x for the next iteration, y < nowiki >'</ nowiki > be the new value of y for the next iteration, and r < nowiki >'</ nowiki > be the new value of r for the next iteration.

Let X be a formula with a classical bivalent truth value.

Let y ( t ; a ) denote the solution of the initial value problem

Let and be the optimal value and the set of optimal solutions, respectively, of the true problem and let and be the optimal value and the set of optimal solutions, respectively, of the SAA problem.

Let H be a discrete random variable describing the probability of being hit by a car while walking over the crossing, taking one value from

Let V, W and X be three vector spaces over the same base field F. A bilinear map is a function

Let the function g ( t ) be the altitude of the car at time t, and let the function f ( h ) be the temperature h kilometers above sea level.

Let P < sub > F </ sub > be the domain of a prefix-free universal computable function F. The constant Ω < sub > F </ sub > is then defined as

Let F be a prefix-free universal computable function.

Let M be a smooth manifold and let f ∈ C < sup >∞</ sup >( M ) be a smooth function.

Let g be a smooth function on N vanishing at f ( x ).

Let r ( t ) be a vector that describes the position of a point mass as a function of time.

Let f be a real valued function.

Suppose that in a mathematical language L, it is possible to enumerate all of the defined numbers in L. Let this enumeration be defined by the function G: W → R, where G ( n ) is the real number described by the nth description in the sequence.

: Theorem on projections: Let the function f: X → B be such that a ~ b → f ( a )

Let function composition interpret group multiplication, and function inverse interpret group inverse.

Let function composition, notated by infix, interpret the group operation.

Let R be a domain and f a Euclidean function on R. Then:

Let be the conditional probability distribution function of Y given X.

Let ƒ be a function whose domain is the set X, and whose range is the set Y.

Let F be the continuous cumulative distribution function which is to be the null hypothesis.

Let V and W be vector spaces over the same field K. A function f: V → W is said to be a linear map if for any two vectors x and y in V and any scalar α in K, the following two conditions are satisfied:

Let π ( x ) be the prime-counting function that gives the number of primes less than or equal to x, for any real number x.

Let be the Riemann zeta function.

Let be a non-negative real-valued function of the interval, and let < math > S =

Let H be a Hilbert space, and let H * denote its dual space, consisting of all continuous linear functionals from H into the field R or C. If x is an element of H, then the function φ < sub > x </ sub >, defined by

Let us assume the bias is V and the barrier width is W. This probability, P, that an electron at z = 0 ( left edge of barrier ) can be found at z = W ( right edge of barrier ) is proportional to the wave function squared,

Let be the space of real-valued continuous functions on X which vanish at infinity ; that is, a continuous function f is in if, for every, there exists a compact set such that on