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Invariant of topological spaces
the inductive dimension of a topological space X is either of two values, the small inductive dimension ind(X) or the large inductive dimension Ind(X)
Inductive_dimension
Property of a mathematical space
in En looks locally like En-1 and this leads to the notion of the inductive dimension. While these notions agree on En, they turn out to be different when
Dimension
Topological space of dimension zero
this refinement. A topological space is zero-dimensional with respect to the small inductive dimension if it has a base consisting of clopen sets. The
Zero-dimensional_space
Invariant measure of fractal dimension
arbitrary separable metric space. There is a topological notion of inductive dimension for X which is defined recursively. It is always an integer (or +∞)
Hausdorff_dimension
Topologically invariant definition of the dimension of a space
inductive dimension. The covering dimension of a paracompact Hausdorff space X {\displaystyle X} is greater or equal to its cohomological dimension (in
Lebesgue_covering_dimension
Topological space that is maximally disconnected
The Baire space The Sorgenfrey line Every Hausdorff space of small inductive dimension 0 is totally disconnected The Erdős space ℓ2 ∩ Q ω {\displaystyle
Totally_disconnected_space
Geometric space with four dimensions
Four-dimensional (4D) space is the mathematical extension of the concept of three-dimensional space (3D). Three-dimensional space is the simplest possible
Four-dimensional_space
Method of logical reasoning
Inductive reasoning refers to a variety of methods of reasoning in which the conclusion of an argument is supported not with deductive certainty, but
Inductive_reasoning
Geometric space with five dimensions
A five-dimensional (5D) space is a mathematical or physical space that has five independent dimensions. In physics and geometry, such a space extends
Five-dimensional_space
Manifold or algebraic variety of dimension n in a space of dimension n+1
is a manifold or an algebraic variety of dimension n − 1, which is embedded in an ambient space of dimension n, generally a Euclidean space, an affine
Hypersurface
Topics referred to by the same term
spaces: Complex dimension Hausdorff dimension Inductive dimension Lebesgue covering dimension Packing dimension Isoperimetric dimension Measurements of
Dimension_(disambiguation)
Mathematical set with some added structure
to prove. The dimension of a topological space is difficult to define; inductive dimension (based on the observation that the dimension of the boundary
Space_(mathematics)
Number of vectors in any basis of the vector space
is sometimes called Hamel dimension (after Georg Hamel) or algebraic dimension to distinguish it from other types of dimension. For every vector space there
Dimension_(vector_space)
Geometric model of the physical space
rarely, tri-dimensional space. Most commonly, it means the three-dimensional Euclidean space, that is, the Euclidean space of dimension three, which
Three-dimensional_space
Measure of a mathematical object studied in the field of algebraic geometry
In mathematics and specifically in algebraic geometry, the dimension of an algebraic variety may be defined in various equivalent ways. Some of these
Dimension of an algebraic variety
Dimension_of_an_algebraic_variety
Real-valued number of spatial dimensions
fractal dimension that build on this basic concept of change in detail with change in scale, see § Examples below. Ultimately, the term fractal dimension became
Fractal_dimension
Mathematical space with two coordinates
A two-dimensional space is a mathematical space with two dimensions, meaning points have two degrees of freedom: their locations can be locally described
Two-dimensional_space
Geometric space with six dimensions
Six-dimensional (6D) space is any space that has six dimensions, six degrees of freedom, and that needs six pieces of data, or coordinates, to specify
Six-dimensional_space
Fundamental space of geometry
the three-dimensional space of Euclidean geometry, but in modern mathematics there are Euclidean spaces of any positive integer dimension n, which are
Euclidean_space
Method of determining fractal dimension
Minkowski–Bouligand dimension, also known as Minkowski dimension or box-counting dimension, is a way of determining the fractal dimension of a bounded set
Minkowski–Bouligand_dimension
Property of topological space
also be contrasted with normal spaces. A zero-dimensional space with respect to the small inductive dimension has a base consisting of clopen sets. Every
Regular_space
Space with one dimension
A one-dimensional (1D) space is a mathematical space in which location can be specified with a single coordinate. An example is the number line, each
One-dimensional_space
In mathematics, dimension of a ring
Krull dimension of a commutative ring R, named after Wolfgang Krull, is the supremum of the lengths of all chains of prime ideals. The Krull dimension need
Krull_dimension
Mathematical property of a space
Zero-dimensional. A space is zero-dimensional if it has a base of clopen sets. These are precisely the spaces with a small inductive dimension of 0.
Topological_property
C*-algebra
approximately finite-dimensional (AF) C*-algebra is a C*-algebra that is the inductive limit of a sequence of finite-dimensional C*-algebras. Approximate
Approximately finite-dimensional C*-algebra
Approximately_finite-dimensional_C*-algebra
Generalized sphere of dimension n (mathematics)
{\displaystyle n} -dimensional spaces together, by identifying the boundary of an n {\displaystyle n} -cube with a point, or (inductively) by forming the
N-sphere
Geometric object with flat sides
generalization of three-dimensional polyhedra to any number of dimensions. Polytopes may exist in any general number of dimensions n as an n-dimensional polytope or
Polytope
Type of topological space
X {\displaystyle X} is compact, T0, and zero-dimensional (in the sense of the small inductive dimension); X {\displaystyle X} is coherent and Hausdorff
Stone_space
Question of whether inductive reasoning leads to definitive knowledge
known as "inductive inferences". David Hume, who first formulated the problem in 1739, argued that there is no non-circular way to justify inductive inferences
Problem_of_induction
Size of a mathematical ball
R^{2}}{n}}V_{n-2}(R),\end{aligned}}} which is the two-dimension recursion formula. The same technique can be used to give an inductive proof of the volume formula. The base
Volume_of_an_n-ball
continuity Lawson topology Polish Space Cantor space Inductive dimension Lebesgue covering dimension Lebesgue's number lemma Polytope Simplex Simplicial
List of general topology topics
List_of_general_topology_topics
Concept in set theory
sets. This implies that the Baire space is zero-dimensional with respect to the small inductive dimension (as are all spaces whose base consists of clopen
Baire_space_(set_theory)
Geometric space with seven dimensions
Seven-dimensional (7D) space is a sequence of n real numbers (when n = 7) that can be understood as a location in n-dimensional space. Often such a space
Seven-dimensional_space
Geometric space with eight dimensions
Eight-dimensional (8D) space is a sequence of n real numbers (when n = 8) that can be understood as a location in n-dimensional space. Often such spaces
Eight-dimensional_space
Subspace of n-space whose dimension is (n-1)
is a generalization of a two-dimensional plane in three-dimensional space to mathematical spaces of arbitrary dimension. Like a plane in space, a hyperplane
Hyperplane
Fundamental object of geometry
As zero-dimensional objects, points are usually taken to be the fundamental indivisible elements comprising the space, of which one-dimensional curves
Point_(geometry)
Study of dimension in algebraic geometry
In mathematics, dimension theory is the study in terms of commutative algebra of the notion of dimension of an algebraic variety (and by extension that
Dimension_theory_(algebra)
Dimension of a subset of a metric space
the packing dimension is one of a number of concepts that can be used to define the dimension of a subset of a metric space. Packing dimension is in some
Packing_dimension
Interplay between observation, experiment, and theory in science
century. Scientific inquiry includes creating a testable hypothesis through inductive reasoning, testing it through experiments and statistical analysis, and
Scientific_method
Element of a unital algebra over the field of real numbers
hypercomplex number is a traditional term for an element of a finite-dimensional unital algebra over the field of real numbers. The study of hypercomplex
Hypercomplex_number
change in dimension from flexing and distortion thus allowing inductive pumps to remain very accurate with no significant changes over time. Inductive pumps
Inductive_pump
Overview of and topical guide to machine learning
Incremental decision tree Induction of regular languages Inductive bias Inductive probability Inductive programming Influence diagram Information Harvesting
Outline_of_machine_learning
Subset of artificial intelligence
on symbolic/knowledge-based learning continued within AI, leading to inductive logic programming (ILP), but the more statistical line of research was
Machine_learning
Four-dimensional number system
mathematics, particularly for calculations involving three-dimensional rotations, such as in three-dimensional computer graphics, computer vision, robotics, magnetic
Quaternion
1994 book by Michio Kaku
Scientific Odyssey Through Parallel Universes, Time Warps, and the 10th Dimension (1994, ISBN 0-19-286189-1) is a book by Michio Kaku, a theoretical physicist
Hyperspace_(book)
Method for producing composition algebras
sequence of algebras over the field of real numbers, each with twice the dimension of the previous one. It is named after Arthur Cayley and Leonard Eugene
Cayley–Dickson_construction
Faster-than-light travel in science fiction
original meaning, the term hyperspace was simply a synonym for higher-dimensional space. This usage was most common in 19th-century textbooks and is still
Hyperspace
Surname list
Menger sponge, a fractal curve Menger's theorem Menger–Urysohn dimension; see Inductive dimension Cayley–Menger determinant; see Distance geometry All pages
Menger
Machine learning technique
Sean (2007). "Spring Research Presentation: A Theoretical Foundation for Inductive Transfer". Brigham Young University, College of Physical and Mathematical
Transfer_learning
Limit of spheres in algebraic topology
topology, the infinite-dimensional sphere is the inductive limit of all spheres. Although no sphere is contractible, the infinite-dimensional sphere is contractible
Infinite-dimensional_sphere
Completion of the usual space with "points at infinity"
space of dimension n is defined as the set of the vector lines (that is, vector subspaces of dimension one) in a vector space V of dimension n + 1. Equivalently
Projective_space
Number of independent parameters of a system
notion is formalized as the dimension of a manifold or an algebraic variety. When degrees of freedom is used instead of dimension, this usually means that
Degrees_of_freedom
N-dimensional generalisation of a pyramid
called a n-dimensional hyperpyramid. A normal triangle is a 2-dimensional hyperpyramid, the tetrahedron or triangular pyramid is a 3-dimensional hyperpyramid
Hyperpyramid
Finest topology making some functions continuous
of mathematics, the final topology (or coinduced, strong, colimit, or inductive topology) on a set X , {\displaystyle X,} with respect to a family of
Final_topology
Regions of an electromagnetic field
receive coils for RFID, and emission coils for wireless charging and inductive heating; however their technical classification as "antennas" is contentious
Near_and_far_field
Ratio of active power to apparent power
toasters and ovens) have a power factor of almost 1, but circuits containing inductive or capacitive loads (electric motors, solenoid valves, transformers, fluorescent
Power_factor
Process of heating an electrically conducting object by electromagnetic induction
magnetic field induces eddy currents in the workpiece. The frequency of the inductive current determines the depth that the induced eddy currents penetrate
Induction_heating
Multi-dimensional generalization of triangle
polytope in any given dimension. For example, a 0-dimensional simplex is a point, a 1-dimensional simplex is a line segment, a 2-dimensional simplex is a triangle
Simplex
Type theory in logic and mathematics
things to come out of the Oberwolfach meeting was the basic idea of higher inductive types, due to Lumsdaine, Shulman, Bauer, and Warren. The participants
Homotopy_type_theory
Convex polytope, the n-dimensional analogue of a square and a cube
In geometry, a hypercube is an n-dimensional analogue of a square (n = 2) and a cube (n = 3); the special case for n = 4 is known as a tesseract. It is
Hypercube
Geometric model of the planar projection of the physical universe
In mathematics, a Euclidean plane is a Euclidean space of dimension two, denoted E 2 {\displaystyle {\textbf {E}}^{2}} or E 2 {\displaystyle \mathbb {E}
Euclidean_plane
German mathematician
Theorem by E. Specker)". Inventiones mathematicae 6 (1968), pp. 41–55. Inductive dimension Universal space "Zum Geburtstag des Mathematikers Prof. Dr. Georg
Georg_Nöbeling
SI unit of apparent power in an electrical circuit
transformers, and other power handling equipment, where loads may be reactive (inductive or capacitive). For a simple electrical circuit running on direct current
Volt-ampere
Special case of colimit in category theory
"direct inductive limit", "directed colimit", "direct colimit" and "inductive limit" for the concept of direct limit defined above. The term "inductive limit"
Direct_limit
German-American philosopher (1891–1970)
modal logic, and on the philosophical foundations of probability and inductive logic (Carnap 1950, 1952). After a stint at the Institute for Advanced
Rudolf_Carnap
Generalization of a rectangle for higher dimensions
product of finite intervals. This means that a k {\displaystyle k} -dimensional rectangular solid has each of its edges equal to one of the closed intervals
Hyperrectangle
Topological vector space
topological vector space (TVS) X that is a locally convex inductive limit of a countable inductive system ( X n , i n m ) {\displaystyle (X_{n},i_{nm})} of
LF-space
Theorem in group theory
showed that the McKay conjecture reduces to the checking of a so-called inductive McKay condition for each finite simple group. This opens the door to a
McKay_conjecture
Philosophical study of knowledge
form of empiricism and explained knowledge of general truths through inductive reasoning. Charles Peirce (1839–1914) thought that all knowledge is fallible
Epistemology
on topological spaces (for example, the article "homotopy", or "inductive dimension") does not specify the used definition of a topological space. Thus
Equivalent definitions of mathematical structures
Equivalent_definitions_of_mathematical_structures
Process of using data analysis for predicting population data from sample data
assumption for covariate information. Objective randomization allows properly inductive procedures. Many statisticians prefer randomization-based analysis of
Statistical_inference
Passive two-terminal electrical component that stores energy in its magnetic field
saturable reactor exploits saturation of the core as a means of stopping the inductive transfer of current via the core. The winding resistance appears as a
Inductor
Concept in algebraic topology
filtrations, and generally to make inductive arguments. They are particularly important when X has infinite dimension, in the sense that the Xn do not become
N-skeleton
Paradigm in machine learning
transductive setting, these unsolved problems act as exam questions. In the inductive setting, they become practice problems of the sort that will make up the
Weak_supervision
Type of mass spectrometry that uses an inductively coupled plasma to ionize the sample
Inductively coupled plasma mass spectrometry (ICP-MS) is a type of mass spectrometry that uses an inductively coupled plasma to ionize the sample. It
Inductively coupled plasma mass spectrometry
Inductively_coupled_plasma_mass_spectrometry
Idea that knowledge comes only/mainly from sensory experience
requires inductive reasoning to arrive at the premises for the principle of inductive reasoning, and therefore the justification for inductive reasoning
Empiricism
In mathematics, a module that has a basis
Algebraic variety Spacetime Other dimensions Krull Lebesgue covering Inductive Hausdorff Minkowski Fractal Degrees of freedom Polytopes and shapes Hyperplane
Free_module
Machine learning model for vision processing
networks (CNNs) in computer vision applications. They have different inductive biases, training stability, and data efficiency. Compared to CNNs, ViTs
Vision_transformer
Result of commutative algebra
variable) such that S is integral over T. By the inductive hypothesis, T / ( u ) {\displaystyle T/(u)} has dimension d − 1 {\displaystyle d-1} . By incomparability
Noether_normalization_lemma
Algebraic expansion of powers of a binomial
{n+1}{k}}x^{n+1-k}y^{k},} which is the inductive hypothesis with n + 1 substituted for n and so completes the inductive step. The standard binomial theorem
Binomial_theorem
Regular polytope dual to the hypercube in any number of dimensions
n-dimensional Euclidean space. A 2-dimensional cross-polytope is a square, a 3-dimensional cross-polytope is a regular octahedron, and a 4-dimensional cross-polytope
Cross-polytope
Recurrence relations of binomial coefficients in Pascal's triangle
\choose n-r}\qquad {\text{ for }}n,r\in \mathbb {N} ,\quad n\geq r.} The inductive and algebraic proofs both make use of Pascal's identity: ( n k ) = ( n
Hockey-stick_identity
Posits ability to interpolate within latent manifolds
description length Solomonoff's theory of inductive inference Gorban, A. N.; Tyukin, I. Y. (2018). "Blessing of dimensionality: mathematical foundations of the
Manifold_hypothesis
Arrangement of interrelated elements in an object/system, or the object/system itself
classified as one-dimensional (ropes, struts, beams, arches), two-dimensional (membranes, plates, slab, shells, vaults), or three-dimensional (solid masses)
Structure
Property of a statement that can be logically contradicted
explicitly adopt an inductive approach and sought such an inductive method. However, Lakatos' method never provided precise inductive rules. In response
Falsifiability
Extension of independent vectors to bases
V} by hypothesis. For the inductive step, assume the proposition is true for m − 1 {\displaystyle m-1} . By the inductive hypothesis we may reorder the
Steinitz_exchange_lemma
Field of geometry and statistics
clouds of points in a space that is n-dimensional. This includes topological data analysis, cluster analysis, inductive data analysis, correspondence analysis
Geometric_data_analysis
Machine learning paradigm
(meta-algorithm) Bayesian statistics Case-based reasoning Decision tree learning Inductive logic programming Gaussian process regression Genetic programming Group
Supervised_learning
Capacitive displacement sensor Eddy-current sensor Hall effect sensor Inductive sensor Laser Doppler vibrometer (optical) Linear variable differential
Position_sensor
Quantum mechanical model
harmonic oscillator. Once the ground state is computed, one can show inductively that the excited states are Hermite polynomials times the Gaussian ground
Quantum_harmonic_oscillator
Property of a space in which the local dimensionality is the same everywhere
topology, equidimensionality is a property of a space that the local dimension is the same everywhere. In the classification of differential equations
Equidimensionality
Type of topological space
(n-1)-dimensional sphere (the "equator") and two n-cells that are attached to it (the "upper hemi-sphere" and the "lower hemi-sphere"). Inductively, this
CW_complex
Mathematical condition
{\displaystyle b(x,y)=\int _{a}^{x}r(t,y)\,dt.} It is also possible to give an inductive proof of Poincaré's lemma which does not use homotopical arguments. Let
Poincaré_lemma
Vacuum tube used for amplifying radio waves
The inductive output tube (IOT) or klystrode is a variety of linear-beam vacuum tube, similar to a klystron, used as a power amplifier for high frequency
Inductive_output_tube
Eighth letter of the Greek alphabet
Schindler, Ralf (ed.). "The proof theory of classical and constructive inductive definitions. A 40 year saga, 1968–2008" (PDF). Ways of Proof Theory: 7–30
Theta
Thing in mathematics and theoretical physics
Algebraic variety Spacetime Other dimensions Krull Lebesgue covering Inductive Hausdorff Minkowski Fractal Degrees of freedom Polytopes and shapes Hyperplane
Quasi-sphere
Discrete device in an electronic system
integrated circuit (hybrid IC) Mixed-signal integrated circuit Three-dimensional integrated circuit (3D IC) Digital electronics Logic gate Microcontroller
Electronic_component
Classical statement of gravity as force
physical law derived from empirical observations by what Isaac Newton called inductive reasoning. It is a part of classical mechanics and was formulated in Newton's
Newton's law of universal gravitation
Newton's_law_of_universal_gravitation
caged bird, and noted its weight loss between feeding times. Aristotle's inductive-deductive method used inductions from observations to infer general principles
History_of_scientific_method
Yang–Mills theory in two dimensions with a well-defined measure
In mathematical physics, two-dimensional Yang–Mills theory is the special case of Yang–Mills theory in which the dimension of spacetime is taken to be
Two-dimensional Yang–Mills theory
Two-dimensional_Yang–Mills_theory
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
Girl/Female
Indian
Name of Goddess Saraswati Devi inspired, Intuitive, And creative, Goddess Durga
Girl/Female
Tamil
Bhagavath | பாகவாத
Name of Goddess Saraswati Devi inspired, Intuitive, And creative, Goddess Durga
Bhagavath | பாகவாத
Boy/Male
Indian
People with this Name Tend to be Very Inspired Intuitive and Creative
Girl/Female
Afghan, African, American, Arabic, Danish, Egyptian, Finnish, Hebrew, Hindu, Indian, Jamaican, Modern, Muslim, Swahili, Swedish, Tamil
Dark Beauty; Wine; Intoxication; Night Beauty; Born at Night; Seductive
Boy/Male
Indian, Telugu
Very Knowledge; Intuitive; Creative; Their Aim is to Improve the World and can be Quite Altruistic; Strive to See the Big Picture and Achieve Their Dreams; Inspired by Goddess Sarasvati
Girl/Female
Tamil
Bhagavathi | பாகாவாதி
Name of Goddess Saraswati Devi inspired, Intuitive, And creative, Goddess Durga
Bhagavathi | பாகாவாதி
Female
Chinese
flattering and seductive.
Girl/Female
Indian
Name of Goddess Saraswati Devi inspired, Intuitive, And creative, Goddess Durga
Male
Japanese
(1-妖一, 2-陽一, 3-洋一, 4-与一) Japanese name YOICHI means "bewitching/seductive first (son)," 2) "clear/sun/pride first (son)," 3) "foreign/ocean first (son)," and 4) "participating first (son)."
Girl/Female
African, Arabic, Australian, French, German, Hebrew, Indian, Kenyan, Spanish, Swahili, Tamil
Gentle; Delicate; Gentleness is her Soul; Lovelorn; Seductive
Girl/Female
American, Arabic, Australian, British, Danish, English, Greek, Hebrew, Latin
Night; Night Beauty; Feminine of Lyle; From the Island; Variant of Delilah; Form of Lilac; Bluish; Languishing; Lovelorn; Seductive
Girl/Female
African, American, Arabic, Danish, Finnish, French, German, Hebrew, Indian, Iranian, Irish, Italian, Muslim, Parsi, Sindhi, Swedish, Tamil
Dark as Night; Black; Night; Night Beauty; Nocturnal; Dark-haired Beauty; Lovelorn; Seductive; Name of a Saint; Dark Haired
Boy/Male
Arabic, Muslim
Intuitive
Girl/Female
French, German, Latin, Spanish
Smooth; Seductive; Flattering; Blond
Girl/Female
Hindu, Indian
Knowledgeable; Inspired; Intuitive; Creative
Girl/Female
American, Arabic, Hebrew
Night; Lovelorn; Seductive
Girl/Female
Indian, Punjabi, Sikh
People with this Name Tend to be Very Inspired; Intuitive; And Creative; They Strive to See the Big Picture and Achieve Their Dreams
Girl/Female
African, American, Arabic, Assamese, Australian, British, Danish, English, French, German, Greek, Hebrew, Hindu, Indian, Iranian, Jamaican, Latin, Muslim, Parsi, Persian, Polish, Sanskrit, Sindhi, Swahili, Tamil
Good; Night; Feminine of Lyle; Seductive; Dark Beauty; Lily; Purity; Pleasure; Sport; Pastime; Delicate; Playful; Divine Drama
Girl/Female
American, Arabic, Australian, Christian, English, French, Greek, Hebrew, Indian, Persian, Sanskrit
Dark Haired Beauty; Night; Divine Play; From the Island; Night Beauty; Lovelorn; Seductive
Boy/Male
Muslim
Intuitive
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
Boy/Male
Hindu
Calm, A name of Lord Hanuman
Girl/Female
Indian
Successful
Boy/Male
Hindu, Indian, Punjabi, Sikh
One who Loves the Divine Knowledge
Boy/Male
Christian & English(British/American/Australian)
God is Gracious
Boy/Male
Arthurian Legend
Son of Arthur.
Boy/Male
Indian, Sanskrit
To be Invoked
Girl/Female
Latin
Laughter.
Boy/Male
Tamil
Kintesh | கீநà¯à®¤à¯‡à®·Â
Girl/Female
Australian, Finnish
Obstinacy; Beloved
Surname or Lastname
French
French : from Old French corne ‘horn’ (Late Latin corna), a derogatory nickname for a cuckold (see Horn 4), or a metonymic occupational name for a hornblower or worker in horn.English : variant spelling of Corn.
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
INDUCTIVE DIMENSION
n.
An expression which inveighs or rails against a person; a severe or violent censure or reproach; something uttered or written, intended to cast opprobrium, censure, or reproach on another; a harsh or reproachful accusation; -- followed by against, having reference to the person or thing affected; as an invective against tyranny.
a.
Operating by induction; as, an inductive electrical machine.
a.
Rendered electro-polar by induction, or brought into the opposite electrical state by the influence of inductive bodies.
a.
Inductive.
n.
The act or process of inducting or bringing in; introduction; entrance; beginning; commencement.
a.
Facilitating induction; susceptible of being acted upon by induction; as certain substances have a great inductive capacity.
a.
Tending to lead astray; apt to mislead by flattering appearances; tempting; alluring; as, a seductive offer.
a.
Not active; inert; esp., not exhibiting any action or activity on polarized light; optically neutral; -- said of isomeric forms of certain substances, in distinction from other forms which are optically active; as, racemic acid is an inactive tartaric acid.
n.
The indicative mood.
n.
A reductive agent.
a.
Leading to inferences; proceeding by, derived from, or using, induction; as, inductive reasoning.
a.
Pertaining to, or proceeding by, induction; inductive.
a.
Not disposed to action or effort; not diligent or industrious; not busy; idle; as, an inactive officer.
a.
Received. reached, obtained, or perceived, by intuition; as, intuitive judgment or knowledge; -- opposed to deductive.
a.
Not active; having no power to move; that does not or can not produce results; inert; as, matter is, of itself, inactive.
n.
A process of demonstration in which a general truth is gathered from an examination of particular cases, one of which is known to be true, the examination being so conducted that each case is made to depend on the preceding one; -- called also successive induction.
a.
Seeing clearly; as, an intuitive view; intuitive vision.
adv.
By induction or inference.
a.
Having the quality or power of conducting; as, the conductive tissue of a pistil.