Examples of 'topology can' in a sentence
Meaning of "topology can"
The phrase 'topology can' refers to the ability or potential of a topology to perform a certain function or exhibit certain characteristics. In the context of mathematics or computer science, topology refers to the study of the properties and relationships of spaces and structures. 'Topology can' suggests that a particular topology has the capability or potential to achieve a desired outcome
How to use "topology can" in a sentence
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topology can
Their topology can be represented by a face configuration.
For each gauge any topology can be used.
This topology can also naturally be expressed as a pretopology.
The disadvantages of a single inverter topology can vary depending on the application.
Topology can be considered as a virtual shape or structure of a network.
The connection topology can change dynamically.
Topology can nevertheless facilitate the integration of the spatial context.
Determining network topology can be done in many ways.
By connecting the computers at each end, a ring topology can be formed.
The physical topology can be linear or star forked.
Several variants of the order topology can be given,.
The circuit topology can be that of a flyback transformer.
Readers already familiar with point set topology can safely skip this chapter.
Hierarchical topology can be viewed as a collection of star networks arranged in a hierarchy.
Sharp distinctions between geometry and topology can be drawn, however, as discussed below.
See also
This topology can extend the scope and coverage of the network.
A basis for the Zariski topology can be constructed as follows.
A tree topology can also be described as a combination of star and bus topologies.
In many applications, using micro-inverter topology can significantly improve overall system efficiency.
Ladder topology can be extended without limit and is much used in filter designs.
Otherwise, for a flat or a hyperbolic spatial geometry, the topology can be either compact or infinite.
A desired router topology can therefore also be predefined vía a projected configuration.
At this stage of market development, a point-to-point topology can be effectively unbundled.
The topology can.
The underlying Layer 2 topology can be one of these,.
The same topology can be used to implement a baseband EA ADC.
Thus, the network topology can change quickly.
This topology can be applied in both down - and up-conversion mixers.
A topological space whose topology can be described by a metric is called metrizable.
Topology can be multilayered, single-layered, or recurrent.
Thus, the illustrated topology can handle higher power levels.
In fact, topology can be described as a study of continuity.
In aeronautics, this topology can be subject to deformations or be difficult to map.
This topology can be adapted to produce low-pass, band-pass, and high pass filters.
Self-organizing mesh topology can be very difficult to predict time delay.
This topology can also be used in a CTM-network ( CTM, Cordless Terminal Mobility ).
Hierarchical, This network topology can be visualized as a tree of star networks.
The ultrastrong topology can be obtained from the strong operator topology as follows.
Systems with a known topology can be initialized in a system specific manner without affecting interoperability.
A Flyback topology can be used as a switched mode converter.
This mixer topology can be implemented in Silicon or GaAs technology.
In cosmology, topology can be used to describe the overall shape of the universe.
That is, the original topology can be reconstructed by knowing the convergent sequences.
In particular, the topology can change because certain links or routes disappear.
The contact network topology can have a important e ¿ ect in the ¿ nal distribution of opinions.
A proof that algebraic topology can never have a non-self contradictory set of abelion groups.
A proof that algebraic topology can never have a non-self-contradictory set of abelian groups.
A bus or ring topology can support, in the illustrated embodiment, up to 32 subracks.
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Examples of using Can
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Sou can manage the company alone
Examples of using Topology
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Their topology can be represented by a face configuration
But the cocountable topology is not discrete
The topology of a knitted fabric is relatively complex
