Divisor
Divisor

sábado, 26 de novembro de 2011

Sebastian Bach virá ao Brasil em abril de 2012


A produtora Dark Dimensions anunciou hoje, em sua página oficial no Facebook, o retorno de Sebastian Bach (ex-Skid Row) ao Brasil. A única apresentação no país, está agendada para 14 de abril, no Carioca Club, em São Paulo.

Neste momento, o artista está em turnê pelos Estados Unidos promovendo seu mais recente trabalho de estúdio "Kicking and Screaming”, lançado esse ano pela Frontiers Records.

A última vez que Bach veio ao Brasil foi como banda de abertura para o Guns ‘N’ Roses em 2010. A primeira passagem foi durante o festival Hollywood Rock.

Em breve mais informações sobre a vinda de Sebastian Bach ao Brasil serão divulgadas pela produtora.

Press-release: The Ultimate Music - Press
Por nfsMWX8

Nenhum comentário:

Postar um comentário

Assinar: Postar comentários (Atom)
ATENÇÃO
Todos os links e arquivos que se encontram no site, estão hospedados na própria Internet, somente indicamos onde se encontra, não hospedamos nenhum CD ou programas que seja de distribuição ilegal. Os Arquivos devem permanecer, no máximo, 24 horas em seu computador. Eles podem ser baixados apenas para teste, devendo o usuário apagá-lo ou compra-lo após 24 horas. A aquisição desses arquivos pela internet é de única e exclusiva responsabilidade do usuário. Os donos, webmasters e qualquer outra pessoa que tenha relacionamento com a produção do site não tem responsabilidade alguma sobre os arquivos que o usuário venha a baixar e para que ira utilizá-los. Que fique claro que o Rock World Brasil é totalmente contra a Pirataria.
data:image/jpeg;base64,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
Ir ao Fundo Ir ao Topo