alternating series

Then he heard an alternating series of low and high beats.

There is an alternating series of brown spots on each side.

All I need to do is create an alternating series of overlapping fields.

In one form, it is used to accelerate the convergence of an alternating series.

(note that this is just the alternating series in the above definition of ).

Ventrally, two alternating series of large white blotches are found.

An alternating series is a series where terms alternate signs.

Norman, alternating series with Stacy, also went over the century mark with 105.

The secret is that the house is an alternating series of grand spaces and tiny rooms.

Williams used Out Our Way as an umbrella title for several alternating series.

The alternating series test is a method used to prove that infinite series of terms converge.

Accidents of nature have created alternating series of crashing cliffs and quiet coves.

This series converges by the alternating series test.

Alternating series test: A series of the form ( 1) a (with a 0) is called alternating.

At ground level was an alternating series of blue and gray vertical stripes, each a meter wide and three meters tall.

The simplest examples of conditionally convergent series (including the one above) are the alternating series.

For an alternative proof using Cauchy's convergence test, see Alternating series.

Beyond the rotunda, above the kitchen, is the Roschens' suite - again, an alternating series of big and little rooms.

In one dimension, the anti-ferromagnetic ground state is an alternating series of spins: up, down, up, down, etc.

Euler summation is particularly used to accelerate the convergence of alternating series and allows evaluating divergent sums.

The phonetic terracing effect in Twi of an alternating series of high and low tones.

James has pondered his potential problem at quarterback, even considering alternating series with Hobert and Brunell.

Most of the series acceleration techniques developed for alternating series can be profitably applied to the evaluation of the eta function.

In mathematics and numerical analysis, in order to accelerate convergence of an alternating series, Euler's transform can be computed as follows.

For alternating series, several powerful techniques, offering convergence rates from all the way to for a summation of terms, are described by Cohen et al..