Sin2α＋sin2β－Sin2α×sin2β＋cos2α× cos2β
=Sin2α＋sin2β-4Sinαcosαsinβ cosβ+(cos^α-Sin^α)× (cos^β-Sin^β)
=Sin2α+sin2β+(cosαcosβ-SinαSinβ)^-(cosαSinβ+Sinαcosβ)^
=Sin2α+sin2β+cos^(α+β)-Sin^(α+β)
=1+Sin2α+sin2β-2Sin^(α+β)
=1+2(Sinαcosα+Sinβcosβ-Sinαcosα-Sinβcosβ)
=1