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Consider two dimensional plane flow within a Cartesian coordinate system.
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Consider and two
( Consider: " one team ", " two teams ", " most teams "; " one government ", " two governments ", " many governments ").
Consider two systems ; S < sub > 1 </ sub > and S < sub > 2 </ sub > at the same temperature and capable of exchanging particles.
* The Infinite Moment ( 1961 ) ( US edition of Consider Her Ways, with two stories dropped, two others added )
Consider two observers O and O ', each using their own Cartesian coordinate system to measure space and time intervals.
Consider two ISPs, A and B, which each have a presence in New York, connected by a fast link with latency 5 ms ; and which each have a presence in London connected by a 5 ms link.
Consider the two endpoints of a rod of length L. The length can be determined from the differences in the three coordinates Δx, Δy and Δz of the two endpoints in a given reference frame
Consider the 1592 season of Lord Strange's Men at the Rose Theatre as far more representative: between Feb. 19 and June 23 the company played six days a week, minus Good Friday and two other days.
Consider code that adds two numbers and then multiplies by a third ; in the Cray, these would all be fetched at once, and both added and multiplied in a single operation.
Consider the ratio of the difference of two positions of a particle divided by the time interval, which is called the average velocity over that time interval.
Consider Thomas Hood's " Bridge of Sighs :", in which the lines are of two feet, each composed of three syllables:
Consider a simple banking application where two users have access to the funds in a particular account.
Consider and dimensional
Consider a three dimensional orthogonal Cartesian coordinate frame, for example a level table top with a point marked on it for the origin, and the x and y axes laid out with pencil lines.
Consider the example of a one dimensional nonrelativistic particle with a 2D ( i. e. two state ) internal degree of freedom called " spin " ( it's not really spin because " real " spin is for particles in three-dimensional space ).
Consider and plane
Consider a simple, closed, plane curve C which is a real-analytic image of the unit circle, and which is given by Af.
Consider a planar projection of each knot and suppose these projections are disjoint. Find a rectangle in the plane where one pair of sides are arcs along each knot but is otherwise disjoint from the knots.
Consider a point in a continuum under a state of plane stress, or plane strain, with stress components and all other stress components equal to zero ( Figure 7. 1, Figure 8. 1 ).
Consider a set of points R ( R is a vector depicting a point in a Bravais lattice ) constituting a Bravais lattice, and a plane wave defined by:
Consider the illustration, depicting a plane intersecting a cone to form an ellipse ( the interior of the ellipse is colored light blue ).
Consider region D in the plane: a unit circle or general polygon — the asymptotics of the problem, which are the interesting aspect, aren't dependent on the exact shape.
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