Declaraciones de Manuel Bonaque tras el A.D. Mérida 2 - Real Club Recreativo de Huelva 0.
Ficha técnica AD Mérida: José Andrés, Bonaque (Tiago Leal), Acosta (Bourdal), Ismael G.M. (Leo), Sandoval (Marcos Fernández) ...
En directo: pospartido A.D. Mérida - Real Club Recreativo de Huelva.
DON ALVARO - MERIDA AD. LIVE HD. INTERNATIONAL CLUB FRIENDLY MATCH. (ONLY SUBSCRIBERS) [ LIVE] CD ...
RESUMEN DEL PARTIDO: AD Ceuta FC 0 - RB Linense 0.
RESUMEN DEL PARTIDO: CF Rayo Majadahonda 1 - AD Mérida 1.
0-1 | Chuma (3') ⚽ 1-1 | Rubén Torres (45') Cerro del Espino -SUSCRÍBETE al canal de la RFEF ...
Mérida Unión Deportiva was a Spanish football club based in Mérida, in the autonomous community of Extremadura. Founded in 1990, they last played in Tercera División – Group 14 when dissolved in 2013, and hosted games at the Estadio Romano.
Mérida Asociación Deportiva, S.A.D. is a Spanish football club based in Mérida, in the autonomous community of Extremadura. Founded in 2013, it currently plays in Segunda División B Group 4.
Merelinense Futebol Clube also known as Merelinense FC is a Portuguese football club from São Pedro de Merelim in Braga and founded in 1938. Merelinense FC currently plays in the Campeonato de Portugal.
In mathematics, Molien's formula computes the generating function attached to a linear representation of a group G on a finite-dimensional vector space, that counts the homogeneous polynomials of a given total degree that are invariants for G. It is named for Theodor Molien. Precisely, it says: given a finite-dimensional complex representation V of G and R n = C [ V ] n = Sym n {\displaystyle R_{n}=\mathbb {C} [V]_{n}=\operatorname {Sym} ^{n}(V^{*})} , the space of homogeneous polynomial functions on V of degree n (degree-one homogeneous polynomials are precisely linear functionals), if G is a finite group, the series (called Molien series) can be computed as: ∑ n = 0 ∞ dim ( R n G ) t n = ( # G ) − 1 ∑ g ∈ G det ( 1 − t g | V ∗ ) − 1 .
Molines-en-Queyras is a commune in the Hautes-Alpes department in southeastern France.
Mérida is a city and municipality of Spain, part of the Province of Badajoz, and capital of the autonomous community of Extremadura. Located in the western-central part of the Iberian Peninsula at 217 metres above sea level, the city is crossed by the Guadiana and Albarregas rivers.
Princess Merida of DunBroch is the main character from the 2012 Disney Pixar film Brave. Merida was added to the Disney Princess line-up as the 11th princess, on May 11, 2013, becoming the first Pixar character to receive the honor.
Mérida or Merida may refer to:
Manuel Crescencio Rejón International Airport, formerly known as Mérida-Rejón Airport is an international airport located in the Mexican city of Mérida, Yucatán. It is located on the southern edge of the city and it is one of four airports in Mexico which has an Area Control Center (Centro Mérida/Mérida Center); the other ones being Mexico City International Airport, Monterrey International Airport and Mazatlán International Airport.
The Cordillera de Mérida is a series of mountain ranges, or massif, in northwestern Venezuela. The Cordillera de Mérida is a northeastern extension of the Andes Mountains and the most important branch of the Venezuelan Andes.
The Dragon Prince and Dragon Star trilogies comprise six connected fantasy novels written by Melanie Rawn. The Dragon Prince trilogy focuses on Prince Rohan of the Desert and his Sunrunner wife, Sioned, while the Dragon Star trilogy focuses on their son, Pol.
The Merida Andes tree frog is a species of frogs in the family Hylidae found in Colombia and Venezuela. Its natural habitats are subtropical or tropical moist montane forests, rivers, and heavily degraded former forests.
The Amphitheatre of Mérida is a ruined Roman amphitheatre situated in the Roman colony of Emerita Augusta, present-day Mérida, in Spain. The city itself, Emerita Augusta, was founded in 25 BC by Augustus, to resettle emeritus soldiers discharged from the Roman army from two veteran legions of the Cantabrian Wars (the Legio V Alaudae and Legio X Gemina).