一般意義上是指模仿實(shí)物或設(shè)計(jì)中結(jié)構(gòu)的形狀,其大小可分為縮小型、實(shí)物型和放大型。有些模型甚細(xì)節(jié)與實(shí)物完全相同,有的模仿實(shí)物的主要特征。模型的意義在于通過視覺理解物體的形象。除了具有藝術(shù)欣賞價(jià)值外,它在教育、科研、工業(yè)建設(shè)、土木工程和軍事方面也有很大的作用。隨著科學(xué)技術(shù)的進(jìn)步,人們將研究對象視為一個(gè)系統(tǒng),從整體行為上進(jìn)行研究。系統(tǒng)研究不是列出所有的事實(shí)和細(xì)節(jié),而是識(shí)別有重大影響的因素和相互關(guān)系,以掌握本質(zhì)規(guī)律。通過類比、抽象等類比、抽象等方式建立。這叫做建模。模型可以采用各種形式,沒有統(tǒng)一的分類原則??煞譃槲锢砟P汀?shù)學(xué)模型和結(jié)構(gòu)模型。
In general, it refers to imitating the shape of a physical object or structure in a design, and its size can be divided into miniaturization, physical type, and enlargement. Some models even have identical details to the actual object, while others imitate the main features of the object. The significance of a model lies in understanding the image of an object visually. In addition to its artistic appreciation value, it also plays a significant role in education, scientific research, industrial construction, civil engineering, and military affairs. With the progress of science and technology, people view the research object as a system and conduct research from the perspective of overall behavior. Systematic research is not about listing all facts and details, but identifying factors and interrelationships that have significant impacts in order to grasp essential laws. Establish through analogies, abstractions, and other methods. This is called modeling. The model can take various forms without a unified classification principle. It can be divided into physical models, mathematical models, and structural models.
物理模型:又稱實(shí)體模型,又可分為實(shí)物模型和類比模型。①物理模型:根據(jù)相似性理論制造的實(shí)物,如飛機(jī)模型、水力系統(tǒng)實(shí)驗(yàn)?zāi)P汀⒔ㄖP?、船舶模型等。②類比模型:在不同的物理領(lǐng)域(機(jī)械、電學(xué)、熱學(xué)、流體力學(xué)等)。),每個(gè)系統(tǒng)的變量有時(shí)遵循相同的規(guī)律。根據(jù)這個(gè)共同的規(guī)律,可以制作出具有完全不同物理意義的比較和類推模型。例如,在一定條件下,由節(jié)流閥和氣容組成的氣動(dòng)系統(tǒng)的壓力響應(yīng)與由電阻和電容組成的電路的輸出電壓特性有相似的規(guī)律,因此可以使用更容易實(shí)驗(yàn)的電路來模擬氣動(dòng)系統(tǒng)。
Physical model: also known as physical model, it can be divided into physical model and analog model Physical model: physical objects manufactured according to similarity theory, such as Model aircraft, hydraulic system experimental model, building model, ship model, etc Analogy model: in different physical fields (mechanics, electricity, heat, Fluid mechanics, etc.), The variables of each system sometimes follow the same pattern. Based on this common law, comparative and analogical models with completely different physical meanings can be created. For example, under certain conditions, the pressure response of a pneumatic system composed of a throttle valve and a gas capacity has a similar pattern to the output voltage characteristics of a circuit composed of resistors and capacitors. Therefore, a circuit that is easier to experiment with can be used to simulate the pneumatic system.
數(shù)學(xué)模型:一種用數(shù)學(xué)語言描述的模型。數(shù)學(xué)模型可以是一組或一組代數(shù)方程、微分方程、差分方程、積分方程或統(tǒng)計(jì)方程,也可以是它們的適當(dāng)組合,通過這些方程定量或定性地描述系統(tǒng)變量之間的關(guān)系或因果關(guān)系。除了用方程描述的數(shù)學(xué)模型外,還有用代數(shù)、幾何、拓?fù)洹?shù)理邏輯等其他數(shù)學(xué)工具描述的模型。需要指出的是,數(shù)學(xué)模型描述的是系統(tǒng)的行為和特征,而不是系統(tǒng)的實(shí)際結(jié)構(gòu)。
Mathematical model: A model described in mathematical language. Mathematical models can be a group or a group of Algebraic equation, differential equations, difference equations, Integral equation or statistical equations, or an appropriate combination of them. These equations can quantitatively or qualitatively describe the relationship or causal relationship between system variables. In addition to mathematical models described by equations, there are models described by algebra, geometry, topology, Mathematical logic and other mathematical tools. It should be pointed out that the mathematical model describes the behavior and characteristics of the system, rather than the actual structure of the system.
結(jié)構(gòu)模型:主要反映系統(tǒng)結(jié)構(gòu)特征和因果關(guān)系的模型。結(jié)構(gòu)模型中的一個(gè)重要模型是圖形模型。此外,生物系統(tǒng)分析中常用的房間模型也屬于結(jié)構(gòu)模型。結(jié)構(gòu)模型是研究復(fù)雜系統(tǒng)的有效手段。
Structural model: A model that primarily reflects the structural characteristics and causal relationships of a system. An important model in structural models is the graphical model. In addition, room models commonly used in Biological system analysis are also structural models. Structural models are an effective means of studying complex systems.