If [tex]F_{n}[/tex](α) = [tex]sin^{n}[/tex](α) + [tex]cos^{n}[/tex](α), then prove that
2[tex]F_{6}[/tex](α) -3[tex]F_{4}[/tex](α) + 1 = 0
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If [tex]F_{n}[/tex](α) = [tex]sin^{n}[/tex](α) + [tex]cos^{n}[/tex](α), then prove that
2[tex]F_{6}[/tex](α) -3[tex]F_{4}[/tex](α) + 1 = 0
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