English-Wörter für 'A monic polynomial.'
Oben finden Sie Wörter zu "A monic polynomial.". Bewegen Sie den Fokus oder Mauszeiger auf ein Wort, um die Definition anzuzeigen.
Suchergebnisse
noun
adj
- (topology, of a manifold) Not containing a sphere of codimension 1 that is not the boundary of a ball.
- (number theory, of an integer) Unable to be factored into smaller integers; prime.
- (group theory, of a representation) Impossible to divide further into representations of lower dimension by means of any similarity transformation.
- Not able to be brought to a simpler or reduced form.
- (algebra, of an element of a ring) Whose only divisors are units and associates.
- (mathematics, of a polynomial) Unable to be factorized into polynomials of lower degree, as (x² + 1).
- (algebraic geometry, of an algebraic variety) Inexpressible as the union of two proper algebraic subvarieties.
- (number theory, of a fraction) Whose numerator and denominator share no common factor greater than 1.
- Not able to be reduced or lessened.
- incapable of being made smaller or simpler
adj
noun
- a mathematical function that is the sum of a number of terms
- (taxonomy) A taxonomic designation (such as of a subspecies) consisting of more than two terms.
- (linguistics, Sinology) A type of term consisting of multiple parts.
- (algebra, strict sense) An expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as a_nxⁿ+a_n-1xⁿ⁻¹+...+a_0x⁰.
noun
- (mathematics) homogeneous polynomial
- (mathematics) a function f(x) which has the property that for any c, f(cx)=cf(x).
- (mathematics) the ratio of two homogeneous polynomials, such that the sum of the exponents in a term of the numerator is equal to the sum of the exponents in a term of the denominator.
adj
noun
- A foursome.
- (mathematics) A set of points with all the combinatorial properties of a quadric (a quadric being the set of points of PG(n, q) whose coordinates satisfy a quadratic equation).
- (grammar) A grammatical number referring to four (or more) things.
- (rhetoric) A set of four phrases, separated by pauses when speaking or commas when writing.
noun
adj
noun
- any distinct quantity contained in a polynomial
- a limited period of time
- one of the substantive phrases in a logical proposition
- the end of gestation or point at which birth is imminent
- a word or expression used for some particular thing
- (usually plural) a statement of what is required as part of an agreement
- (architecture) a statue or a human bust or an animal carved out of the top of a square pillar; originally used as a boundary marker in ancient Rome
- A chronological limitation or restriction, a limited timespan.
- (astrology) An essential dignity in which unequal segments of every astrological sign have internal rulerships which affect the power and integrity of each planet in a natal chart.
- Part of a year, especially one of the divisions of an academic year.
- (mathematics) Any value (variable or constant) or expression separated from another term by a space or an appropriate character, in an overall expression or table.
- Specifically, the conditions in a legal contract that specify the price and also how and when payment must be made.
- A word or phrase (e.g., noun phrase, verb phrase, open compound), especially one from a specialised area of knowledge; a name for a concept.
- (of a patent) The maximum period during which the patent can be maintained into force.
- (logic) The subject or the predicate of a proposition; one of the three component parts of a syllogism, each one of which is used twice.
- Certain days on which rent is paid.
- Any of the binding conditions or promises in a legal contract.
- (computing, informal) A computer program that emulates a physical terminal.
- (nautical) A piece of carved work placed under each end of the taffrail.
- One whose employment has been terminated
- That which limits the extent of anything; limit, extremity, bound, boundary, terminus.
- (art) A statue of the upper body, sometimes without the arms, ending in a pillar or pedestal.
- The time during which legal courts are open.
- With respect to a pregnancy, the usual duration of gestation for the given species (for example, nine months in humans); (metonymic) the end of this duration: the timepoint at which birth usually happens (for example, in humans, approximately 40 weeks from conception), defining the due date.
- Duration of officeholding, or its limit; period in office of fixed length.
- Relations among people.
verb
adj
noun
- (algebra) A polynomial with two terms.
- (taxonomy) A scientific name at the rank of species, with two terms: a generic name and a specific name.
- (algebra) A quantity expressed as the sum or difference of two terms.
- (mathematics) a quantity expressed as a sum or difference of two terms; a polynomial with two terms
adj
noun
adj
- involving the fourth and no higher power of a quantity or degree
- (mathematics) Of a polynomial expression, involving only the zeroth, second, and fourth powers of a variable, as x⁴ + 3x² + 2. Sometimes extended to any expression involving the biquadrate or fourth power (but no higher powers), as x⁴ − 4x³ + 3x² − x + 1.
adj
- (of a polynomial) Having degree one; that is, being of the form a_1x_1+a_2x_2+⋯+a_nx_n+b, where each x_i is a variable. See also Linear polynomials on Wikipedia.Wikipedia
- (botany, of leaves) Long and narrow, with nearly parallel sides.
- (media, of video and audio) Delivered or delivering on a fixed schedule, as opposed to on-demand.
- (of a function between vector spaces) An additive, homogeneous mapping; that is, a function f:V→W is linear if it distributes over vector addition (f( mathbf v+ mathbf w)=f( mathbf v)+f( mathbf w)) and respects scalar multiplication (f(c mathbf v)=cf( mathbf v)). If V and W are vector spaces over a field K, f may also be called a K-linear map. See also linear map on Wikipedia.Wikipedia
- Of or relating to lines.
- (physics) A type of length measurement involving only one spatial dimension (as opposed to area or volume).
- Made, or designed to be used, in a step-by-step, sequential manner.
- Having the form of a line; straight or roughly straight; following a direct course.
- (of a function over a module) A module homomorphism; that is, a group homomorphism that commutes with scalar multiplication. See also Module homomorphism on Wikipedia.Wikipedia
- (of a polynomial equation) Involving only linear polynomials. See also Linear equation on Wikipedia.Wikipedia
- measured lengthwise
- of or in or along or relating to a line; involving or having a single dimension
- (of a leaf shape) long and narrow
- of a circuit or device having an output that is proportional to the input
- designating or involving an equation whose terms are of the first degree
noun
adj
- (algebra, commutative algebra, of a ring element in a ring B relative to a subring A) Being the root of some monic polynomial in A.
- Constituting a whole together with other parts or factors; not omittable or removable.
- (mathematics) Relating to integration (“the process of finding the integral [noun] of a function”).
- (mathematics) Of, pertaining to, or being an integer.
- constituting the undiminished entirety; lacking nothing essential especially not damaged
- of or denoted by an integer
- existing as an essential constituent or characteristic
noun
- (mathematics) One of the two fundamental operations of calculus (the other being differentiation), whereby a function's displacement, area, volume, or other qualities arising from the study of infinitesimal change are quantified, usually defined as a limiting process on a sequence of partial sums. Denoted using a long s: ∫, or a variant thereof.
- (mathematics) A definite integral: the result of the application of such an operation onto a function and a suitable subset of the function's domain: either a number or positive or negative infinity. In the former case, the integral is said to be finite or to converge; in the latter, the integral is said to diverge. In notation, the domain of integration is indicated either below the sign, or, if it is an interval, with its endpoints as sub- and super-scripts, and the function being integrated forming part of the integrand (or, generally, differential form) appearing in front of the integral sign.
- (specifically) Any of several analytic formalizations of this operation: the Riemann integral, the Lebesgue integral, etc.
- (mathematics) An indefinite integral: the result of the application of such an operation onto a function together with an indefinite domain, yielding a function; a function's antiderivative;
- the result of a mathematical integration; F(x) is the integral of f(x) if dF/dx = f(x)
adj
- (algebra, of a polynomial) Such that all its nonzero terms have the same degree.
- (ring theory, of an element of a graded ring) Belonging to one of the summands of the grading (if the ring is graded over the natural numbers and the element is in the kth summand, it is said to be homogeneous of degree k; if the ring is graded over a commutative monoid I, and the element is an element of the ith summand, it is said to be of grade i)
- (of a linear differential equation) Having its degree-zero term equal to zero; admitting the trivial solution.
- Having the same composition throughout; of uniform make-up.
- (probability theory, Fourier analysis, of a distribution S on Euclidean n-space (or on ℝⁿmathbf 0)) Informally: Determined by its restriction to the unit sphere. Formally: Such that, for all real t>0 and test functions ϕ( mathbf x), the equality S[t⁻ⁿϕ( mathbf x/t)]=t^(mS)[ϕ( mathbf x)] holds for some fixed real or complex m.
- Of the same kind; alike, similar.
- (of a linear map f between vector spaces graded by a commutative monoid I) Which respects the grading of its domain and codomain. Formally: Satisfying f(V_j)⊆W_i+j for fixed i (called the degree or grade of f), V_j the jth component of the grading of f 's domain, W_k the kth component of the grading of f 's codomain, and + representing the monoid operation in I.
- (geometry, of a space equipped with a group action) Informally: Everywhere the same, uniform, in the sense that any point can be moved to any other (via the group action) while respecting the structure of the space. Formally: Such that the group action is transitively and acts by automorphisms on the space (some authors also require that the action be faithful).
- (set theory, order theory, of a relation) Holding between a set and itself; being an endorelation.
- (of a first-order differential equation) Capable of being written in the form f(x,y) mathop dy=g(x,y) mathop dx where f and g are homogeneous functions of the same degree as each other.
- (linear algebra, by specialization, of a system of linear equations) Such that all the constant terms are zero.
- (mathematics) In any of several technical senses uniform; scalable; having its behavior or form determined by, or the same as, its behavior on or form at a smaller component (of its domain of definition, of itself, etc.).
- (geometry) Of or relating to homogeneous coordinates.
- The function f(x,y)#61;x²#43;x²ʸ#43;y² is not homogeneous on all of #92;mathbb#123;R#125;² because f(2,2)#61;16#92;neq 2ᵏ#42;3#61;2ᵏf(1,1) for any k, but f is homogeneous on the subspace of #92;mathbb#123;R#125;² spanned by (1,0) because f(#92;alphax,#92;alphay)#61;#92;alphax²#61;#92;alpha²f(x,y) for all (x,y)#92;in#92;operatorname#123;Span#125;#92;#123;(1,0)#92;#125;.
- (mathematical analysis, generalizing the case of polynomial functions, of a function f) Such that if each of f 's inputs are multiplied by the same scalar, f 's output is multiplied by the same scalar to some fixed power (called the degree of homogeneity or degree of f). (Formally and more generally, of a partial function f between vector spaces whose domain is a linear cone) Satisfying the equality f(s mathbf x)=sᵏᶠ(
- (of a general differential equation) Homogeneous as a function of the dependent variable and its derivatives.
- (chemistry) In the same state of matter.
- all of the same or similar kind or nature
adj
- (algebra, number theory, of a number) Which is a root of some polynomial whose coefficients are rational.
- (algebra, of a field) Whose every element is a root of some polynomial whose coefficients are rational.
- (chess, of notation) Describing squares by file (referred to in intrinsic order rather than by the piece starting on that file) and rank, both with reference to a fixed point rather than a player-dependent perspective.
- (mathematics, of an expression, equation, or function) Containing only numbers, letters, and arithmetic operators.
- Of, or relating to, algebra.
- of or relating to algebra
noun
adj
- (mathematics) Relating to polynomials of the form ax³+bx²+cx+d.
- (crystallography) Having three equal axes and all angles 90°.
- (geometry) Used in the names of units of volume formed by multiplying a unit of length by itself twice.
- having the shape of a cube; having three dimensions
- involving the cube and no higher power of a quantity or variable
verb
- resolve (a polynomial) into factors
- (mathematics, transitive) To create a list of the factors of.
- (mathematics, transitive) To divide an expression into a list of items that, when multiplied together, will produce the original quantity.
- (US, transitive) To warn not to pay or give up goods.
- (US, transitive) To attach the effects of a debtor in the hands of a third party.
adj
- (mathematics, of a symmetric polynomial) Arising from Vieta's formulas; see Elementary symmetric polynomial on Wikipedia.Wikipedia
- (sciences) Fundamental: serving as a building block for more complicated structures or processes.
- (mathematics, of a square matrix) Which performs a row or column operation on another matrix when the two are multiplied; see Elementary matrix on Wikipedia.Wikipedia (Such matrices are called "elementary" because they generate the general linear group).
- (mathematics, of an argument or proof) Straightforward, employing only basic techniques; not requiring substantial knowledge (of some particular domain, object, etc.).
- Relating to the basic, essential or fundamental part of something.
- (chemistry, of a reaction) Involving only a single reaction step and transition state.
- Relating to an elementary school.
- (number theory, of an argument or proof, mostly historical outside the phrase "Elementary number theory") Making no use of complex analysis.
- (physics) Relating to a subatomic particle.
- Very simple.
- of or pertaining to or characteristic of elementary school or elementary education
- of or being the essential or basic part
- easy and not involved or complicated
noun
noun
adj
- (topology, of a manifold) Not containing a sphere of codimension 1 that is not the boundary of a ball.
- (number theory, of an integer) Unable to be factored into smaller integers; prime.
- (group theory, of a representation) Impossible to divide further into representations of lower dimension by means of any similarity transformation.
- Not able to be brought to a simpler or reduced form.
- (algebra, of an element of a ring) Whose only divisors are units and associates.
- (mathematics, of a polynomial) Unable to be factorized into polynomials of lower degree, as (x² + 1).
- (algebraic geometry, of an algebraic variety) Inexpressible as the union of two proper algebraic subvarieties.
- (number theory, of a fraction) Whose numerator and denominator share no common factor greater than 1.
- Not able to be reduced or lessened.
- incapable of being made smaller or simpler
noun
- (mathematics) homogeneous polynomial
- (mathematics) a function f(x) which has the property that for any c, f(cx)=cf(x).
- (mathematics) the ratio of two homogeneous polynomials, such that the sum of the exponents in a term of the numerator is equal to the sum of the exponents in a term of the denominator.
noun
adj
noun
- any distinct quantity contained in a polynomial
- a limited period of time
- one of the substantive phrases in a logical proposition
- the end of gestation or point at which birth is imminent
- a word or expression used for some particular thing
- (usually plural) a statement of what is required as part of an agreement
- (architecture) a statue or a human bust or an animal carved out of the top of a square pillar; originally used as a boundary marker in ancient Rome
- A chronological limitation or restriction, a limited timespan.
- (astrology) An essential dignity in which unequal segments of every astrological sign have internal rulerships which affect the power and integrity of each planet in a natal chart.
- Part of a year, especially one of the divisions of an academic year.
- (mathematics) Any value (variable or constant) or expression separated from another term by a space or an appropriate character, in an overall expression or table.
- Specifically, the conditions in a legal contract that specify the price and also how and when payment must be made.
- A word or phrase (e.g., noun phrase, verb phrase, open compound), especially one from a specialised area of knowledge; a name for a concept.
- (of a patent) The maximum period during which the patent can be maintained into force.
- (logic) The subject or the predicate of a proposition; one of the three component parts of a syllogism, each one of which is used twice.
- Certain days on which rent is paid.
- Any of the binding conditions or promises in a legal contract.
- (computing, informal) A computer program that emulates a physical terminal.
- (nautical) A piece of carved work placed under each end of the taffrail.
- One whose employment has been terminated
- That which limits the extent of anything; limit, extremity, bound, boundary, terminus.
- (art) A statue of the upper body, sometimes without the arms, ending in a pillar or pedestal.
- The time during which legal courts are open.
- With respect to a pregnancy, the usual duration of gestation for the given species (for example, nine months in humans); (metonymic) the end of this duration: the timepoint at which birth usually happens (for example, in humans, approximately 40 weeks from conception), defining the due date.
- Duration of officeholding, or its limit; period in office of fixed length.
- Relations among people.
verb
adj
noun
- (algebra) A polynomial with two terms.
- (taxonomy) A scientific name at the rank of species, with two terms: a generic name and a specific name.
- (algebra) A quantity expressed as the sum or difference of two terms.
- (mathematics) a quantity expressed as a sum or difference of two terms; a polynomial with two terms
adj
noun
adj
- involving the fourth and no higher power of a quantity or degree
- (mathematics) Of a polynomial expression, involving only the zeroth, second, and fourth powers of a variable, as x⁴ + 3x² + 2. Sometimes extended to any expression involving the biquadrate or fourth power (but no higher powers), as x⁴ − 4x³ + 3x² − x + 1.
noun
adj
- (mathematics) Relating to polynomials of the form ax³+bx²+cx+d.
- (crystallography) Having three equal axes and all angles 90°.
- (geometry) Used in the names of units of volume formed by multiplying a unit of length by itself twice.
- having the shape of a cube; having three dimensions
- involving the cube and no higher power of a quantity or variable
verb
- resolve (a polynomial) into factors
- (mathematics, transitive) To create a list of the factors of.
- (mathematics, transitive) To divide an expression into a list of items that, when multiplied together, will produce the original quantity.
- (US, transitive) To warn not to pay or give up goods.
- (US, transitive) To attach the effects of a debtor in the hands of a third party.
adj
noun
- a mathematical function that is the sum of a number of terms
- (taxonomy) A taxonomic designation (such as of a subspecies) consisting of more than two terms.
- (linguistics, Sinology) A type of term consisting of multiple parts.
- (algebra, strict sense) An expression consisting of a sum of a finite number of terms, each term being the product of a constant coefficient and one or more variables raised to a non-negative integer power, such as a_nxⁿ+a_n-1xⁿ⁻¹+...+a_0x⁰.
adj
noun
- A foursome.
- (mathematics) A set of points with all the combinatorial properties of a quadric (a quadric being the set of points of PG(n, q) whose coordinates satisfy a quadratic equation).
- (grammar) A grammatical number referring to four (or more) things.
- (rhetoric) A set of four phrases, separated by pauses when speaking or commas when writing.
adj
- (of a polynomial) Having degree one; that is, being of the form a_1x_1+a_2x_2+⋯+a_nx_n+b, where each x_i is a variable. See also Linear polynomials on Wikipedia.Wikipedia
- (botany, of leaves) Long and narrow, with nearly parallel sides.
- (media, of video and audio) Delivered or delivering on a fixed schedule, as opposed to on-demand.
- (of a function between vector spaces) An additive, homogeneous mapping; that is, a function f:V→W is linear if it distributes over vector addition (f( mathbf v+ mathbf w)=f( mathbf v)+f( mathbf w)) and respects scalar multiplication (f(c mathbf v)=cf( mathbf v)). If V and W are vector spaces over a field K, f may also be called a K-linear map. See also linear map on Wikipedia.Wikipedia
- Of or relating to lines.
- (physics) A type of length measurement involving only one spatial dimension (as opposed to area or volume).
- Made, or designed to be used, in a step-by-step, sequential manner.
- Having the form of a line; straight or roughly straight; following a direct course.
- (of a function over a module) A module homomorphism; that is, a group homomorphism that commutes with scalar multiplication. See also Module homomorphism on Wikipedia.Wikipedia
- (of a polynomial equation) Involving only linear polynomials. See also Linear equation on Wikipedia.Wikipedia
- measured lengthwise
- of or in or along or relating to a line; involving or having a single dimension
- (of a leaf shape) long and narrow
- of a circuit or device having an output that is proportional to the input
- designating or involving an equation whose terms are of the first degree
noun
adj
- (algebra, commutative algebra, of a ring element in a ring B relative to a subring A) Being the root of some monic polynomial in A.
- Constituting a whole together with other parts or factors; not omittable or removable.
- (mathematics) Relating to integration (“the process of finding the integral [noun] of a function”).
- (mathematics) Of, pertaining to, or being an integer.
- constituting the undiminished entirety; lacking nothing essential especially not damaged
- of or denoted by an integer
- existing as an essential constituent or characteristic
noun
- (mathematics) One of the two fundamental operations of calculus (the other being differentiation), whereby a function's displacement, area, volume, or other qualities arising from the study of infinitesimal change are quantified, usually defined as a limiting process on a sequence of partial sums. Denoted using a long s: ∫, or a variant thereof.
- (mathematics) A definite integral: the result of the application of such an operation onto a function and a suitable subset of the function's domain: either a number or positive or negative infinity. In the former case, the integral is said to be finite or to converge; in the latter, the integral is said to diverge. In notation, the domain of integration is indicated either below the sign, or, if it is an interval, with its endpoints as sub- and super-scripts, and the function being integrated forming part of the integrand (or, generally, differential form) appearing in front of the integral sign.
- (specifically) Any of several analytic formalizations of this operation: the Riemann integral, the Lebesgue integral, etc.
- (mathematics) An indefinite integral: the result of the application of such an operation onto a function together with an indefinite domain, yielding a function; a function's antiderivative;
- the result of a mathematical integration; F(x) is the integral of f(x) if dF/dx = f(x)
adj
- (algebra, of a polynomial) Such that all its nonzero terms have the same degree.
- (ring theory, of an element of a graded ring) Belonging to one of the summands of the grading (if the ring is graded over the natural numbers and the element is in the kth summand, it is said to be homogeneous of degree k; if the ring is graded over a commutative monoid I, and the element is an element of the ith summand, it is said to be of grade i)
- (of a linear differential equation) Having its degree-zero term equal to zero; admitting the trivial solution.
- Having the same composition throughout; of uniform make-up.
- (probability theory, Fourier analysis, of a distribution S on Euclidean n-space (or on ℝⁿmathbf 0)) Informally: Determined by its restriction to the unit sphere. Formally: Such that, for all real t>0 and test functions ϕ( mathbf x), the equality S[t⁻ⁿϕ( mathbf x/t)]=t^(mS)[ϕ( mathbf x)] holds for some fixed real or complex m.
- Of the same kind; alike, similar.
- (of a linear map f between vector spaces graded by a commutative monoid I) Which respects the grading of its domain and codomain. Formally: Satisfying f(V_j)⊆W_i+j for fixed i (called the degree or grade of f), V_j the jth component of the grading of f 's domain, W_k the kth component of the grading of f 's codomain, and + representing the monoid operation in I.
- (geometry, of a space equipped with a group action) Informally: Everywhere the same, uniform, in the sense that any point can be moved to any other (via the group action) while respecting the structure of the space. Formally: Such that the group action is transitively and acts by automorphisms on the space (some authors also require that the action be faithful).
- (set theory, order theory, of a relation) Holding between a set and itself; being an endorelation.
- (of a first-order differential equation) Capable of being written in the form f(x,y) mathop dy=g(x,y) mathop dx where f and g are homogeneous functions of the same degree as each other.
- (linear algebra, by specialization, of a system of linear equations) Such that all the constant terms are zero.
- (mathematics) In any of several technical senses uniform; scalable; having its behavior or form determined by, or the same as, its behavior on or form at a smaller component (of its domain of definition, of itself, etc.).
- (geometry) Of or relating to homogeneous coordinates.
- The function f(x,y)#61;x²#43;x²ʸ#43;y² is not homogeneous on all of #92;mathbb#123;R#125;² because f(2,2)#61;16#92;neq 2ᵏ#42;3#61;2ᵏf(1,1) for any k, but f is homogeneous on the subspace of #92;mathbb#123;R#125;² spanned by (1,0) because f(#92;alphax,#92;alphay)#61;#92;alphax²#61;#92;alpha²f(x,y) for all (x,y)#92;in#92;operatorname#123;Span#125;#92;#123;(1,0)#92;#125;.
- (mathematical analysis, generalizing the case of polynomial functions, of a function f) Such that if each of f 's inputs are multiplied by the same scalar, f 's output is multiplied by the same scalar to some fixed power (called the degree of homogeneity or degree of f). (Formally and more generally, of a partial function f between vector spaces whose domain is a linear cone) Satisfying the equality f(s mathbf x)=sᵏᶠ(
- (of a general differential equation) Homogeneous as a function of the dependent variable and its derivatives.
- (chemistry) In the same state of matter.
- all of the same or similar kind or nature
adj
- (algebra, number theory, of a number) Which is a root of some polynomial whose coefficients are rational.
- (algebra, of a field) Whose every element is a root of some polynomial whose coefficients are rational.
- (chess, of notation) Describing squares by file (referred to in intrinsic order rather than by the piece starting on that file) and rank, both with reference to a fixed point rather than a player-dependent perspective.
- (mathematics, of an expression, equation, or function) Containing only numbers, letters, and arithmetic operators.
- Of, or relating to, algebra.
- of or relating to algebra
adj
- (mathematics, of a symmetric polynomial) Arising from Vieta's formulas; see Elementary symmetric polynomial on Wikipedia.Wikipedia
- (sciences) Fundamental: serving as a building block for more complicated structures or processes.
- (mathematics, of a square matrix) Which performs a row or column operation on another matrix when the two are multiplied; see Elementary matrix on Wikipedia.Wikipedia (Such matrices are called "elementary" because they generate the general linear group).
- (mathematics, of an argument or proof) Straightforward, employing only basic techniques; not requiring substantial knowledge (of some particular domain, object, etc.).
- Relating to the basic, essential or fundamental part of something.
- (chemistry, of a reaction) Involving only a single reaction step and transition state.
- Relating to an elementary school.
- (number theory, of an argument or proof, mostly historical outside the phrase "Elementary number theory") Making no use of complex analysis.
- (physics) Relating to a subatomic particle.
- Very simple.
- of or pertaining to or characteristic of elementary school or elementary education
- of or being the essential or basic part
- easy and not involved or complicated