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Unit of volume
Lambda (written λ, in lowercase) is a non-SI unit of volume equal to 10−9 m3, 1 cubic millimetre (mm3) or 1 microlitre (μL). Introduced by the BIPM in
Lambda_(unit)
Eleventh letter in the Greek alphabet
Lambda (/ˈlæmdə/ ; uppercase Λ, lowercase λ; Greek: λάμ(β)δα, lám(b)da; Ancient Greek: λά(μ)βδα, lá(m)bda), sometimes rendered lamda, labda or lamma, is
Lambda
Topics referred to by the same term
Canada Lambda (anatomy), a point on the skull Lambda (unit), a non-SI unit of volume Lambda baryon, a family of subatomic particles SARS-CoV-2 Lambda variant
Lambda_(disambiguation)
Nonstandard, humorous unit of length
smoot /ˈsmuːt/ is a nonstandard, humorous unit of length created as part of an MIT fraternity pledge to Lambda Chi Alpha by Oliver R. Smoot, who in October
Smoot
Spatial frequency of a wave
radians per unit distance is more often used: k = 2 π λ = 2 π ν ~ {\displaystyle k\;=\;{\frac {2\pi }{\lambda }}=2\pi {\tilde {\nu }}} . The SI unit of spectroscopic
Wavenumber
Concepts from linear algebra
\det(A-\lambda I)=(\lambda _{1}-\lambda )^{\mu _{A}(\lambda _{1})}(\lambda _{2}-\lambda )^{\mu _{A}(\lambda _{2})}\cdots (\lambda _{d}-\lambda )^{\mu _{A}(\lambda
Eigenvalues_and_eigenvectors
Discrete probability distribution
in the same interval is: λ k e − λ k ! . {\displaystyle {\frac {\lambda ^{k}e^{-\lambda }}{k!}}.} For instance, consider a call center which receives an
Poisson_distribution
Probability distribution
{\frac {\lambda _{0}e^{\lambda _{0}x}}{\lambda e^{\lambda x}}}\right)\\&=\log(\lambda _{0})-\log(\lambda )-(\lambda _{0}-\lambda )E_{\lambda _{0}}(x)\\&=\log(\lambda
Exponential_distribution
Approximation of a black body's spectral radiance
B_{\lambda }(T)={\frac {2ck_{\text{B}}T}{\lambda ^{4}}},} where B λ {\displaystyle B_{\lambda }} is the spectral radiance (the power emitted per unit emitting
Rayleigh–Jeans_law
Serverless computing platform
AWS Lambda is an event-driven, serverless Function as a Service (FaaS) provided by Amazon as a part of Amazon Web Services. It is designed to enable developers
AWS_Lambda
Mass per unit length
Each infinitesimal unit of mass, d m {\displaystyle dm} , is equal to the product of its linear mass density, λ m {\displaystyle \lambda _{m}} , and the
Linear_density
Relation between peak wavelengths of black body radiation and temperature
radiation per unit wavelength, peaks at the wavelength λ peak {\displaystyle \lambda _{\text{peak}}} given by: λ peak = b T {\displaystyle \lambda _{\text{peak}}={\frac
Wien's_displacement_law
Formula for the great-circle distance between two points on a sphere
{p_{1},p_{2}}}} on the unit sphere, given by their latitude φ {\displaystyle \varphi } and longitude λ {\displaystyle \lambda } : p 2 = ( λ 2 , φ 2 )
Haversine_formula
Emissions from unstable atomic nuclei
{\displaystyle \lim _{\lambda _{B}\rightarrow 0}\left[{\frac {N_{A0}\lambda _{A}}{\lambda _{B}-\lambda _{A}}}\left(e^{-\lambda _{A}t}-e^{-\lambda _{B}t}\right)\right]={\frac
Radioactive_decay
Arc crossing all meridians of longitude at the same angle
sphere. The unit vector β ^ ( λ , φ ) = ( sin β ) λ ^ + ( cos β ) φ ^ {\displaystyle \mathbf {\boldsymbol {\hat {\beta }}} (\lambda ,\varphi )=(\sin
Rhumb_line
Visible light per unit solid angle
}=683\int _{0}^{\infty }{\overline {y}}(\lambda )\cdot {\frac {\partial I_{\mathrm {e} }}{\partial \lambda }}\,d\lambda .} Brightness International System of
Luminous_intensity
Classical physics prediction that black body radiation grows unbounded with frequency
B λ {\displaystyle B_{\lambda }} is the spectral radiance, the power emitted per unit emitting area, per steradian, per unit wavelength; c {\displaystyle
Ultraviolet_catastrophe
Unit of energy
electronvolt (symbol eV), also written as electron-volt and electron volt, is a unit of measurement equivalent to the amount of kinetic energy gained by a single
Electronvolt
Feature of some stochastic processes
{\displaystyle \lambda _{1}} . If the process has multiple unit roots, the difference operator can be applied multiple times. Shocks to a unit root process
Unit_root
SI unit of luminous intensity
{\displaystyle I_{\mathrm {v} }(\lambda )=683.002\ \mathrm {lm/W} \cdot {\overline {y}}(\lambda )\cdot I_{\mathrm {e} }(\lambda ),} where Iv(λ) is the luminous
Candela
North American collegiate fraternity
Lambda Chi Alpha (ΛΧΑ), commonly referred to as Lambda Chi, is a collegiate fraternity in North America. With over 300,000 initiates as of 2024, it is
Lambda_Chi_Alpha
Family of linear transformations
Lambda ^{0}}_{0}&{\Lambda ^{0}}_{1}&{\Lambda ^{0}}_{2}&{\Lambda ^{0}}_{3}{\vphantom {{x'}^{0}}}\\{\Lambda ^{1}}_{0}&{\Lambda ^{1}}_{1}&{\Lambda ^{1}}_{2}&{\Lambda
Lorentz_transformation
Four-bar straight-line mechanism
In kinematics, the Chebyshev Lambda Linkage is a four-bar linkage that converts rotational motion to approximate straight-line motion with approximate
Chebyshev_lambda_linkage
Length used in relativistic quantum physics
− cos θ ) {\displaystyle \lambda '-\lambda _{0}=\lambda _{c}(1-\cos \theta )} with λ c = h / m c {\displaystyle \lambda _{c}={h}/{mc}} , where h is
Compton_wavelength
Method of interpolating functions on a 2D grid
\\w_{21}&=x(1-y),\\w_{22}&=xy.\end{aligned}}} Alternatively, the interpolant on the unit square can be written as f ( x , y ) = a 00 + a 10 x + a 01 y + a 11 x y
Bilinear_interpolation
Formal system in mathematical logic
simply typed lambda calculus ( λ → {\displaystyle \lambda ^{\to }} ), a form of type theory, is a typed interpretation of the lambda calculus with
Simply_typed_lambda_calculus
Production scheduling model
_{0}^{T_{1}}(Q-s-\lambda t)\,dt={\frac {IC}{2\lambda }}(Q-s)^{2},} where s is the number of backorders when order quantity Q is delivered and λ {\displaystyle \lambda }
Economic_order_quantity
Natural number
rendering support, you may see question marks, boxes, or other symbols. 1 (one, unit, unity) is a number, numeral, and grapheme. It is the first and smallest
1
Surjective bounded operator on a Hilbert space preserving the inner product
{\begin{aligned}\|\lambda U(x)-U(\lambda x)\|^{2}&=\langle \lambda U(x)-U(\lambda x),\lambda U(x)-U(\lambda x)\rangle \\[5pt]&=\|\lambda U(x)\|^{2}+\|U(\lambda x)\|^{2}-\langle
Unitary_operator
Class of statistical survival models
function, often denoted λ 0 ( t ) {\displaystyle \lambda _{0}(t)} , describing how the risk of event per time unit changes over time at baseline levels of covariates;
Proportional_hazards_model
Probability distribution
a single shape parameter λ ∈ ( 0 , 1 ) {\displaystyle \lambda \in (0,1)} , defined on the unit interval x ∈ [ 0 , 1 ] {\displaystyle x\in [0,1]} , by:
Continuous Bernoulli distribution
Continuous_Bernoulli_distribution
Number of occurrences or cycles per unit time
frequency), frequency has an inverse relationship to the wavelength, λ (lambda). Even in dispersive media, the frequency f of a sinusoidal wave is equal
Frequency
Term in economics
{\displaystyle \,\!\lambda ^{*}} as above, then the change in maximal utility per unit of additional income will be equal to λ ∗ {\displaystyle \,\!\lambda ^{*}} since
Shadow_price
Physical constants of energy and wavenumber
^{2}m_{\text{e}}c}{2h}}={\frac {\alpha ^{2}}{2\lambda _{\text{e}}}}={\frac {\alpha }{4\pi a_{0}}}} and in energy units Ry = h c R ∞ = 1 2 m e c 2 α 2 = 1 2 e
Rydberg_constant
Conductivity per molar concentration of electrolyte
mobility (μ), or drift velocity per unit electric field, according to the equation λ = z μ F , {\displaystyle \lambda =z\mu F,} where z is the ionic charge
Molar_conductivity
Continuous probability distribution
0 , {\displaystyle f(x;\lambda ,k)={\begin{cases}{\frac {k}{\lambda }}\left({\frac {x}{\lambda }}\right)^{k-1}e^{-(x/\lambda )^{k}},&x\geq 0,\\0,&x<0
Weibull_distribution
Radiant flux per unit area
\\[8pt]M_{\mathrm {e} ,\lambda }^{\circ }&=\pi L_{\mathrm {e} ,\Omega ,\lambda }^{\circ }={\frac {2\pi hc^{2}}{\lambda ^{5}}}{\frac {1}{e^{\frac {hc}{\lambda kT}}-1}}
Radiant_exitance
Third letter of the Greek alphabet
In Archaic Greece, the shape of gamma was closer to a classical lambda (Λ), while lambda retained the Phoenician L-shape (𐌋). Letters that arose from
Gamma
Measurement describing the power of an illumination
λ {\displaystyle M(\lambda )={\frac {\partial ^{2}\Phi }{\partial A\,\partial \lambda }}\approx {\frac {\Phi }{A\,\Delta \lambda }}} where M(λ) is the
Spectral_power_distribution
Logarithm of ratio of incident to transmitted radiant power through a sample
}\,,\\A_{\lambda }&=\log _{10}{\frac {\Phi _{{\text{e}},\lambda }^{\text{i}}}{\Phi _{{\text{e}},\lambda }^{\text{t}}}}=-\log _{10}T_{\lambda }\,,\end{aligned}}}
Absorbance
Result about when a matrix can be diagonalized
} {\displaystyle V_{\lambda }=\{v\in V:Av=\lambda v\}} be the eigenspace corresponding to an eigenvalue λ {\displaystyle \lambda } . Note that the definition
Spectral_theorem
Set of eigenvalues of a matrix
(T-\lambda I)^{-1}} follows automatically from its existence. The space of bounded linear operators B(X) on a Banach space X is an example of a unital Banach
Spectrum (functional analysis)
Spectrum_(functional_analysis)
Energy carried by a photon
f = c λ {\displaystyle {\begin{aligned}E&=hf={\frac {hc}{\lambda }}\\f&={\frac {c}{\lambda }}\\\end{aligned}}} E is the photon's energy in J f is the
Photon_energy
Fuel injection technology for automotive petrol engines
injection. The engine control unit (ECU) may be either analog or digital, and the system may or may not have closed-loop lambda control. The system is based
Jetronic
Electromagnetic stress
}{\lambda +V}}\right)\left(-\lambda -V\right)^{3}} From the last multiplicand on the RHS, we immediately see that λ = − V {\displaystyle \lambda =-V}
Maxwell_stress_tensor
Noncentral generalization of the chi-squared distribution
{\displaystyle \lambda } which is related to the mean of the random variables X i {\displaystyle X_{i}} by: λ = ∑ i = 1 k μ i 2 . {\displaystyle \lambda =\sum _{i=1}^{k}\mu
Noncentral chi-squared distribution
Noncentral_chi-squared_distribution
Astronomical magnitude system
{\displaystyle \lambda _{\text{piv}}={\sqrt {\frac {\int e(\lambda )\lambda \,\mathrm {d} \lambda }{\int e(\lambda )\lambda ^{-1}\,\mathrm {d} \lambda }}}.} For
AB_magnitude
Measure of radiant energy over time
∂ λ , {\displaystyle \Phi _{\mathrm {e} ,\lambda }={\frac {\partial \Phi _{\mathrm {e} }}{\partial \lambda }},} where λ is the wavelength. Standards organizations
Radiant_flux
Theorem in functional analysis
λ n {\textstyle \lambda _{1}\geq ...\geq \lambda _{n}} . Let v 1 , . . . , v n {\textstyle v_{1},...,v_{n}} be the corresponding unit-length orthogonal
Min-max_theorem
Frequency with which an engineered system or component fails
finance. It is usually denoted by the Greek letter λ {\displaystyle \lambda } (lambda). In real-world applications, the failure probability of a system usually
Failure_rate
Mathematical model of financial markets
V(S)={K \over {1-\lambda _{2}}}\left({\lambda _{2}-1 \over {\lambda _{2}}}\right)^{\lambda _{2}}\left({S \over {K}}\right)^{\lambda _{2}}} By solving
Black–Scholes_model
Field-equations in general relativity
{\displaystyle R_{\mu \nu }-{\frac {1}{2}}Rg_{\mu \nu }+\Lambda g_{\mu \nu }=\kappa T_{\mu \nu }.} In standard units, each term on the left has quantity dimension
Einstein_field_equations
Characteristic of any structure that is periodic across a position in space
\lambda } and is commonly denoted by ξ {\displaystyle \xi } or sometimes ν {\displaystyle \nu } : ξ = 1 λ . {\displaystyle \xi ={\frac {1}{\lambda }}
Spatial_frequency
Shortest distance between two points on the surface of a sphere
points 1 and 2, and Δ λ = | λ 2 − λ 1 | {\displaystyle \Delta \lambda =|\lambda _{2}-\lambda _{1}|} and Δ ϕ = | ϕ 2 − ϕ 1 | {\displaystyle \Delta \phi =|\phi
Great-circle_distance
American Latina-based collegiate sorority
within a unit of sisterhood. Lambda Theta Nu Sorority Inc.'s priorities, however, will be placed on academic excellence and community service." Lambda Theta
Lambda_Theta_Nu
Set of probability distributions
A ( θ ) ) . {\displaystyle f_{X}(x\mid \theta ,\lambda )=h^{*}(\lambda ,x)\exp \left(\theta x-\lambda A(\theta )\right)\,\!.} The distribution of the
Exponential_dispersion_model
Representation of mechanical stress at every point within a deformed 3D object
\left(\lambda _{1},\lambda _{2},\lambda _{3}\right)} , σ 3 = min ( λ 1 , λ 2 , λ 3 ) {\displaystyle \sigma _{3}=\min \left(\lambda _{1},\lambda _{2},\lambda
Cauchy_stress_tensor
Spectral density of light emitted by a black body
spectral radiance can also be expressed per unit wavelength λ {\displaystyle \lambda } instead of per unit frequency: B λ ( λ , T ) = 2 h c 2 λ 5 1 exp
Planck's_law
Artificial neural network node function
William (1998), Orr, Genevieve B.; Müller, Klaus-Robert (eds.), "Square Unit Augmented Radially Extended Multilayer Perceptrons", Neural Networks: Tricks
Activation_function
Analytic function in mathematics
θ + ω ) {\displaystyle S((\lambda _{k})_{k},\theta )=\sum _{k=1}^{\infty }a_{k}\cos(\lambda _{k}\theta )\qquad S((\lambda _{k})_{k},\theta ,\omega )=\sum
Lacunary_function
Representation of data types in lambda calculus
&=(\lambda p.\lambda q.p\ p\ q)\ (\lambda a.\lambda b.a)\ (\lambda a.\lambda b.b)\\&=(\lambda a.\lambda b.a)\ (\lambda a.\lambda b.a)\ (\lambda a.\lambda
Church_encoding
Algorithm in computational number theory
and computational algebra, Pollard's kangaroo algorithm (also Pollard's lambda algorithm, see Naming below) is an algorithm for solving the discrete logarithm
Pollard's_kangaroo_algorithm
Measurement of electromagnetic radiation (esp. optical radiation)
{e} ,\lambda }\,d\lambda =\int _{0}^{\infty }\Phi _{\mathrm {e} ,\nu }\,d\nu =\int _{0}^{\infty }\lambda \Phi _{\mathrm {e} ,\lambda }\,d\ln \lambda =\int
Radiometry
Family of continuous probability distributions
{\displaystyle k,} the "shape", and a positive real number λ , {\displaystyle \lambda ,} the "rate". The "scale", β , {\displaystyle \beta ,} the reciprocal of
Erlang_distribution
Method to solve constrained optimization problems
( x ) + ⟨ λ , g ( x ) ⟩ {\displaystyle {\mathcal {L}}(x,\lambda )\equiv f(x)+\langle \lambda ,g(x)\rangle } for functions f , g {\displaystyle f,g} ;
Lagrange_multiplier
Triple star system in the constellation Scorpius
Lambda Scorpii is a triple star system and the second-brightest object in the constellation of Scorpius. It is formally named Shaula; Lambda Scorpii is
Lambda_Scorpii
Axisymmetric eigenfunctions
\mathbf {S} ={\frac {1}{\lambda }}\nabla \times \mathbf {T} } where n ^ {\displaystyle \mathbf {\hat {n}} } is a fixed unit vector. Since ∇ × S = λ T
Chandrasekhar–Kendall function
Chandrasekhar–Kendall_function
Mathematical study of waiting lines, or queues
arrivals/departures per unit time is assumed. Under this assumption, this process has an arrival rate of λ = avg ( λ 1 , λ 2 , … , λ k ) {\displaystyle \lambda ={\text{avg}}(\lambda
Queueing_theory
Range of light usable for photosynthesis
_{\lambda _{1}}^{\lambda _{2}}B(\lambda ,T)\,683\mathrm {~[lm/W]} \,y(\lambda )\,d\lambda }{\int _{\lambda _{1}}^{\lambda _{2}}B(\lambda ,T)\,d\lambda }}
Photosynthetically active radiation
Photosynthetically_active_radiation
Conic conformal map projection
{\begin{aligned}x&=\rho \sin \left[n\left(\lambda -\lambda _{0}\right)\right]\\y&=\rho _{0}-\rho \cos \left[n\left(\lambda -\lambda _{0}\right)\right]\end{aligned}}}
Lambert conformal conic projection
Lambert_conformal_conic_projection
Partial differential equation describing the evolution of temperature in a region
− λ x + C e − − λ x . {\displaystyle X(x)=Be^{{\sqrt {-\lambda }}\,x}+Ce^{-{\sqrt {-\lambda }}\,x}.} From (3) we get X(0) = 0 = X(L) and therefore B
Heat_equation
Electromagnetic radiation generated by the thermal motion of particles
blackbody, I λ , b {\displaystyle I_{\lambda ,b}} was first determined by Max Planck. It is given by Planck's law per unit wavelength as: I λ , b ( λ , T )
Thermal_radiation
Light or sound absorption in a substance
, {\displaystyle \mu _{\lambda }=-{\frac {1}{\Phi _{\mathrm {e} ,\lambda }}}{\frac {\mathrm {d} \Phi _{\mathrm {e} ,\lambda }}{\mathrm {d} z}},} where
Attenuation_coefficient
Diffraction pattern in optics
_{A}^{2}A^{2}}{2R^{2}}}={\frac {P_{0}A}{\lambda ^{2}R^{2}}}} where E {\displaystyle \mathrm {E} } is the source strength per unit area at the aperture, A is the
Airy_disk
For-profit online coding bootcamp
providing for-profit massive online course. Launched in 2017 under the name Lambda School, it gained attention for being a coding bootcamp that offered income
Bloom_Institute_of_Technology
Units used to measure energy
= h c / λ {\displaystyle E=h\nu =hc/\lambda } . In discussions of energy production and consumption, the units barrel of oil equivalent and ton of oil
Units_of_energy
Theory in functional analysis
{\displaystyle x_{n_{k}}=Cx_{n_{k}}/\lambda \to y} . Thus, the closed unit ball in K e r ( λ − C ) {\displaystyle Ker(\lambda -C)} is compact. Induct. Let x
Spectral theory of compact operators
Spectral_theory_of_compact_operators
Type of random mathematical object
dimension. The parameter λ {\textstyle \lambda } can be interpreted as the average number of points per some unit of extent such as length, area, volume
Poisson_point_process
Howard Masur asserts that for almost all choices of λ {\displaystyle \lambda } in the unit simplex { ( t 1 , … , t n ) : ∑ t i = 1 } {\displaystyle \{(t_{1}
Interval exchange transformation
Interval_exchange_transformation
Activity per unit mass of a radionuclide
radioactivity per unit mass of the radionuclide: a [ Bq/g ] = λ N M N / N A = λ N A M . {\displaystyle a[{\text{Bq/g}}]={\frac {\lambda N}{MN/N_{\text{A}}}}={\frac
Specific_activity
Construction in functional analysis, useful to solve differential equations
spectrum consists of all scalars λ {\displaystyle \lambda } such that the operator T − λ {\displaystyle T-\lambda } does not have a bounded inverse on X {\displaystyle
Decomposition of spectrum (functional analysis)
Decomposition_of_spectrum_(functional_analysis)
Law of physics
{\displaystyle I(\lambda ,T)={\frac {2hc^{2}}{\lambda ^{5}}}e^{-{\frac {hc}{\lambda k_{\text{B}}T}}},} where I ( λ , T ) {\displaystyle I(\lambda ,T)} is the
Wien_approximation
Measure of electromagnetic energy
{hc}{k\lambda }}\ln ^{-1}\left(1+{\frac {2hc^{2}}{I_{\lambda }\lambda ^{5}}}\right)} For long-wave radiation h c / λ ≪ k T {\displaystyle hc/\lambda \ll
Brightness_temperature
Formula for radiative heat transfer
{\begin{aligned}dI_{\lambda }&=n\sigma _{\lambda }B_{\lambda }(T)\,ds-n\sigma _{\lambda }I_{\lambda }\,ds\\[1ex]&=n\sigma _{\lambda }\left[B_{\lambda }(T)-I_{\lambda }\right]\
Schwarzschild's equation for radiative transfer
Schwarzschild's_equation_for_radiative_transfer
_{i=1}^{6}{\frac {\beta _{i}}{1+\lambda _{i}T_{p}}}}{{\frac {l^{*}}{3600}}+\sum _{i=1}^{6}{\frac {\beta _{i}}{1+\lambda _{i}3600}}}}} [Equation 2] ρ = reactivity
Inhour_equation
Category admitting tensor products
\lambda } and ρ {\displaystyle \rho } , respectively called the left unitor and right unitor, with components λ A : I ⊗ A ≅ A {\displaystyle \lambda _{A}\colon
Monoidal_category
Model for quantum noise in quantum systems
{\displaystyle \Delta _{\lambda }(\rho )=(1-\lambda )\rho +{\frac {\lambda }{d}}(\mathrm {tr} (\rho ))I=(1-\lambda )\rho +{\frac {\lambda }{d}}I.} The condition
Quantum_depolarizing_channel
Block diagonal matrix of Jordan blocks
{\begin{bmatrix}\lambda &1&0&\cdots &0\\0&\lambda &1&\cdots &0\\\vdots &\vdots &\ddots &\ddots &\vdots \\0&0&0&\lambda &1\\0&0&0&0&\lambda \end{bmatrix}}
Jordan_matrix
Description in spectral theory
π ) − d ω d v o l ( Ω ) {\displaystyle \lim _{\lambda \rightarrow \infty }{\frac {N(\lambda )}{\lambda ^{d/2}}}=(2\pi )^{-d}\omega _{d}\mathrm {vol} (\Omega
Weyl_law
Symmetric holomorphic function
\left\lbrace {\lambda ,{\frac {1}{1-\lambda }},{\frac {\lambda -1}{\lambda }},{\frac {1}{\lambda }},{\frac {\lambda }{\lambda -1}},1-\lambda }\right\rbrace
Modular_lambda_function
Property of crosslinked rubber
{\displaystyle \lambda _{x}\lambda _{y}\lambda _{z}=1} it is assumed that λ x = λ y = λ z − 1 / 2 {\displaystyle \lambda _{x}=\lambda _{y}=\lambda _{z}^{-1/2}}
Rubber_elasticity
Unit of measurement
numerical aperture, the axial optical unit is: u z = 8 π η λ sin 2 ( α 2 ) z {\displaystyle u_{z}={\frac {8\pi \eta }{\lambda }}\sin ^{2}({\frac {\alpha }{2}})z}
Optical_unit
Distance from the Earth surface to a point near its center
{\displaystyle {\mathcal {R}}_{\mathrm {E} }^{\mathrm {N} }} ) is sometimes used as a unit of measurement in astronomy and geophysics, a conversion factor used when
Earth_radius
Constant relating to close packing of spheres
with unit covolume, i.e. vol ( R n / L ) = 1 {\displaystyle \operatorname {vol} (\mathbb {R} ^{n}/L)=1} , let λ 1 ( L ) {\displaystyle \lambda _{1}(L)}
Hermite_constant
Family of continuous probability distributions
2 μ 2 x ) {\displaystyle f(x;\mu ,\lambda )={\sqrt {\frac {\lambda }{2\pi x^{3}}}}\exp {\biggl (}-{\frac {\lambda (x-\mu )^{2}}{2\mu ^{2}x}}{\biggr )}}
Inverse_Gaussian_distribution
Incident radiant energy per area
∂ H e ∂ λ , {\displaystyle H_{\mathrm {e} ,\lambda }={\frac {\partial H_{\mathrm {e} }}{\partial \lambda }},} where λ is the wavelength. Standards organizations
Radiant_exposure
Measure of the ability of a solution containing electrolytes to conduct electricity
{\displaystyle {\frac {1}{\Lambda _{\text{m}}}}={\frac {1}{\Lambda _{\text{m}}^{0}}}+{\frac {\Lambda _{\text{m}}c}{K_{\text{a}}{(\Lambda _{\text{m}}^{0})}^{2}}}
Conductivity_(electrolytic)
Variant of the metric system
centimetre–gram–second system of units (CGS or cgs) is a variant of the metric system based on the centimetre as the unit of length, the gram as the unit of mass, and the
Centimetre–gram–second system of units
Centimetre–gram–second_system_of_units
Generalized Euclidean space in mathematics
if and only if v = λ w {\displaystyle v=\lambda w} for some non-zero complex number λ {\displaystyle \lambda } . This is the usual construction of projectivization
Projective_Hilbert_space
Movement of an object's magnetic moment axis about a magnetic field
{e}{m}}u^{\tau }u_{\sigma }F^{\sigma \lambda }a_{\lambda }+2\mu (F^{\tau \lambda }-u^{\tau }u_{\sigma }F^{\sigma \lambda })a_{\lambda },} where a τ {\displaystyle
Larmor_precession
LAMBDA UNIT
LAMBDA UNIT
Girl/Female
Arabic, Indian, Muslim, Pashtun, Sanskrit
Flame; Large; Spacious; Tall; Another Name for Durga and Lakshmi
Girl/Female
Indian
Dark lipped
Girl/Female
Indian
Flame
Girl/Female
Muslim
Ambitious
Female
Native American
Native American Indian name ALAMEDA means "grove of cottonwood."
Female
Italian
Italian form of English Amber, AMBRA means "amber."
Surname or Lastname
English
English : from Middle English lamb, a nickname for a meek and inoffensive person, or a metonymic occupational name for a keeper of lambs. See also Lamm.English : from a short form of the personal name Lambert.Irish : reduced Anglicized form of Gaelic Ó Luain (see Lane 3). MacLysaght comments: ‘The form Lamb(e), which results from a more than usually absurd pseudo-translation (uan ‘lamb’), is now much more numerous than O’Loan itself.’Possibly also a translation of French agneau.
Girl/Female
Muslim
Dark lipped
Female
Greek
(Λαμία) Greek myth name of an evil spirit who abducts and devours children, LAMIA means "large shark." The name means "vampire" in Latin and "fiend" in Arabic.
Girl/Female
Indian
Ambitious
Girl/Female
Muslim
Flame
Girl/Female
Muslim
Soft to touch
Girl/Female
Indian
Soft to touch
Boy/Male
Indian
Jaws.
Girl/Female
Muslim
Praiseworthy, Praiser of Allah
Surname or Lastname
English
English : habitational name from Lambden in Berwickshire.
Boy/Male
Hindu
Lord Ganesh, The huge bellied Lord
Surname or Lastname
English
English : from a pet form of Lamb 1 and 2.English : from an Old Norse personal name Lambi, from lamb ‘lamb’.
Female
Spanish
Feminine form of Spanish Amado, AMADA means "beloved."
Girl/Female
Indian
Praiseworthy, Praiser of Allah
LAMBDA UNIT
LAMBDA UNIT
Boy/Male
Greek
King of Calydon.
Boy/Male
Muslim
Master, Lord, Chief, Leader, Reigning, Ruling
Male
Romanian
 Short form of Roman Latin Marianus, MARIAN means "like Marius." In use by the Romanians. Compare with feminine Marian.
Girl/Female
Tamil
Bhavishyaa | பவிஷà¯à®¯à®¾
Futures of parent
Girl/Female
Tamil
Base, Of earth
Boy/Male
Hindu, Indian
Universal Soul
Boy/Male
Arabic
Wide; Spacious
Female
Icelandic
Variant spelling form of Icelandic Iða, ÃDA means "industrious."
Female
Czechoslovakian
, noble cheer, or, noble maiden.
Boy/Male
Tamil
LAMBDA UNIT
LAMBDA UNIT
LAMBDA UNIT
LAMBDA UNIT
LAMBDA UNIT
pl.
of Lamina
n.
Any person who is as innocent or gentle as a lamb.
n.
A thin plate or scale; a layer or coat lying over another; -- said of thin plates or platelike substances, as of bone or minerals.
v. i.
To bring forth a lamb or lambs, as sheep.
n.
A monster capable of assuming a woman's form, who was said to devour human beings or suck their blood; a vampire; a sorceress; a witch.
imp. & p. p.
of Lamb
n.
The name of the Greek letter /, /, corresponding with the English letter L, l.
n.
The point of junction of the sagittal and lambdoid sutures of the skull.
n.
The blade of a leaf; the broad, expanded portion of a petal or sepal of a flower.
n.
A lamb.
n.
The lamb's-quarters (Chenopodium album).
a.
Lamed; lame; disabled; impeded.
n.
A viola da gamba.
n.
A lamb.
n.
A thin plate or scale; specif., one of the thin, flat processes composing the vane of a feather.
n.
A lamp or candlestick.
n.
A thin plate or lamina.
pl.
of Lamina
a.
Shaped like the Greek letter lambda (/); as, the lambdoid suture between the occipital and parietal bones of the skull.
p. pr. & vb. n.
of Lamb