How Do You Spell LINEAR SUBSPACE?

Pronunciation: [lˈɪni͡ə sˈʌbspe͡ɪs] (IPA)

The term "linear subspace" is commonly used in mathematics to define a subset of a vector space that is closed under addition and scalar multiplication. The spelling of this word can be explained using the IPA phonetic transcription as /ˈlɪniər/ and /ˈsʌbspeɪs/. The first syllable "lini-" is pronounced with a short "i" sound, followed by the stress on the second syllable "-ear". The second word "subspace" is pronounced with a short "u" sound in the first syllable "-sub" and a long "a" sound in the second syllable "-space".

Meaning and Definition
Etymology
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LINEAR SUBSPACE Meaning and Definition

  1. A linear subspace, also known as a vector subspace or simply a subspace, is a fundamental concept in linear algebra. It refers to a subset of a vector space that is closed under addition and scalar multiplication. In other words, a linear subspace is a collection of vectors that, when added together or multiplied by scalars, remain within that subspace.

    To be more specific, a linear subspace V is defined as a subset of a vector space over a field F, satisfying the following conditions:

    1. The zero vector is an element of V, denoted as 0 ∈ V. In other words, the subspace must contain the origin of the vector space.

    2. The subspace is closed under vector addition. If u and v are vectors in V, then their sum u + v is also a vector in V.

    3. The subspace is closed under scalar multiplication. If u ∈ V and c is a scalar in F, then the product cu is also a vector in V.

    These conditions ensure that a linear subspace preserves the vector space structure, meaning it inherits the properties of the larger vector space. For example, if the original vector space is finite-dimensional, the linear subspace will also be finite-dimensional.

    Linear subspaces are widely used in various branches of mathematics and physics. They form the building blocks for concepts like linear independence, span, and basis, providing a foundational framework for studying vector spaces and their applications.

Etymology of LINEAR SUBSPACE

The word "linear" is derived from the Latin word "linearis", which means "belonging to a line". It comes from the noun "linea", meaning "a line".

The term "subspace" is composed of two parts: "sub-" and "-space". The prefix "sub-" comes from the Latin word "sub", meaning "under" or "below". It indicates that the subspace is a subset or smaller component of a larger space. The suffix "-space" is derived from the Latin word "spatium", meaning "space" or "room". It refers to a mathematical concept of a set of elements with certain properties.

Therefore, the term "linear subspace" denotes a subset within a larger space that possesses specific linearity properties.