West's fifth album, My Beautiful Dark Twisted Fantasy, has been noted by writers for its maximalist aesthetic and its incorporation of elements from West's previous four albums. Entertainment Weekly's Simon Vozick-Levinson perceives that such elements "all recur at various points", namely "the luxurious soul of 2004's The College Dropout, the symphonic pomp of Late Registration, the gloss of 2007's Graduation, and the emotionally exhausted electro of 2008's 808s & Heartbreak". Sean Fennessey of The Village Voice writes that West "absorb[ed] the gifts of his handpicked collaborators, and occasionally elevat[ed] them" on previous studio albums, noting collaborators and elements as Jon Brion for Late Registration, DJ Toomp for Graduation, and Kid Cudi for 808s & Heartbreak.
What is Kanye's fifth album titled? 
My Beautiful Dark Twisted Fantasy

In the US, nutritional standards and recommendations are established jointly by the US Department of Agriculture and US Department of Health and Human Services. Dietary and physical activity guidelines from the USDA are presented in the concept of MyPlate, which superseded the food pyramid, which replaced the Four Food Groups. The Senate committee currently responsible for oversight of the USDA is the Agriculture, Nutrition and Forestry Committee. Committee hearings are often televised on C-SPAN.
On which channel are committee meetings often shown?
C-SPAN

The axiomatization of mathematics, on the model of Euclid's Elements, had reached new levels of rigour and breadth at the end of the 19th century, particularly in arithmetic, thanks to the axiom schema of Richard Dedekind and Charles Sanders Peirce, and geometry, thanks to David Hilbert. At the beginning of the 20th century, efforts to base mathematics on naive set theory suffered a setback due to Russell's paradox (on the set of all sets that do not belong to themselves). The problem of an adequate axiomatization of set theory was resolved implicitly about twenty years later by Ernst Zermelo and Abraham Fraenkel. Zermelo–Fraenkel set theory provided a series of principles that allowed for the construction of the sets used in the everyday practice of mathematics. But they did not explicitly exclude the possibility of the existence of a set that belongs to itself. In his doctoral thesis of 1925, von Neumann demonstrated two techniques to exclude such sets—the axiom of foundation and the notion of class.
Who resolved the problem of adequate axiomatization of set theory?
Ernst Zermelo and Abraham Fraenkel