Brahms: Hungarian Dances & The Hungarian Tradition (CD2) by Janos Bandi, Istvan Kassai, Szilvia Elek, Ferenc Szecsodi, and Adrienn Miksch appears in this catalog as a structured album entry It is meant to give search engines and visitors a fuller explanation of the release without adding invented review claims.
The release information on this page points to release year 2023, genre area Classical, 32 tracks, total running time 1:08:59, and cover artwork available. This gives the page enough context to describe the release in a natural catalog style.
Track names visible on the page include Traditional 13 Karancsai Paloc Nota No. 7 In D Minor (Arr. F. Bunko For Piano) [13 Paloc Tunes From Karancsalja], Szerdahelyi A Csikos Tanc (The Horse Herdsman Dance) [Arr. For Piano], Brahms 21 Hungarian Dances, WoO 1 No. 11 In D Minor (Version For Piano 4 Hands) [Version For Piano 4 Hands], Szentirmay Tiz Par Csokot Egyvegbul (Ten Pairs Of Kisses All In One), Patikarus Galgoczi Emlek (Souvenir Of Galgocz) [Arr. E. Bartay For Piano As Morog A Brugo [The Double-Bass Is Grumbling]], Brahms 21 Hungarian Dances, WoO 1 No. 12 In D Minor (Version For Piano 4 Hands) [Version For Piano 4 Hands], Zimay Edes Rozsam (My Sweet Rose), and Traditional Barna Legeny (Brown Lad) [Arr. E. Erkel For Voice And Piano]. These titles make the page specific to this album rather than a generic music category.
The page can also be read through the track durations: Kecskemeti Egressy Halotti Harangozasa (Mourning Bells For Beni Egressy) is one of the longer tracks at 5:51 and Traditional 13 Karancsai Paloc Nota No. 5 In D Major (Arr. F. Bunko For Piano) [13 Paloc Tunes From Karancsalja] is one of the shorter tracks at 0:34. The duration notes keep the text factual and tied to the actual track table.
As a catalog entry, Brahms: Hungarian Dances & The Hungarian Tradition (CD2) is described through its visible facts, its tracks and the metadata already available on the page. Because the text is stored after the first visit, the page keeps a consistent description over time.
