A linearly independent vector refers to a vector that cannot be expressed as a linear combination of other vectors in a given space. It plays a crucial role in vector algebra and multivariate analysis by indicating the minimum number of vectors needed to span the space effectively. ...
Given a list of vectors, the collection of all linear combinations of these vectors is called the span of the list. If the span of the list is equal to the whole vector space V, then we say the list…
linearly independent vector 英 [ˈlɪnɪəli ˌɪndɪˈpendənt ˈvektə(r)] 美 [ˈlɪniərli ˌɪndɪˈpendənt ˈvektər]网络 线性无关的向量; 线...
vector n. 1.【数】矢量;向量 2.【生】(传染疾病的)介体、载体 3.【术语】(航空器的)航线 duplex independent 【计】 双工独立的 device independent 与设备无关 host independent 【计】 与主机无关的 machine independent 独立于机器的,机器独立程序 space independent 空间不相关的 four vector 四元...
英文 linearly independent vector 中文 【计】 线性无关向量最新查询: linear weighte linear-logarit linear-phase linear-regress linear-sweep d linear-sweep g linearis myias linearity linearity cont linearity curv linearity erro linearity rang linearity-grad linearity-grad linearization linearize linearized ...
Vector fieldTangent spaceComplex structureIn this paper are found θ(n) linearly independent vector fields on the Grassmann manifold Gk(V) of k-planes in n-dimensional Euclidean vector space if k is odd number, where θ(n) is the maximal number of linearly independent vector fields on Sn1,...
The non-zero vectors {eq}a_1 , a_2 , \ldots , a_n {/eq} are said to be linearly dependent vectors, if any one of them can be written as a linear combination of others; otherwise they are linear independent vectors. A vector {eq}z {/eq} is ...
分享到: 线性独立向量 分类: 心理学|查看相关文献(pubmed)|免费全文文献 详细解释: 以下为句子列表: 分享到:
1.This article uses the method of linearly independent vector to make a brief analysis of the shaking force balance of planar seven-bar linkage mechanism,and supplies the condition in which the mechanism realizes the full balance of shaking force.运用线性无关向量法对平面七杆机构的振动力平衡问题进...
Then S is linearly independent if and only if S is a vector basis for span(S). d. Let X and Y be linear spaces, let B be a vector basis for X, and let f∈ YB. Then f extends uniquely to a linear map from X into Y. Thus, there is an isomorphism between the linear spaces ...