The maximum value of `(cosalpha_(1))(cosalpha_(2))...(cosalpha_(n)),` under the restrications `0lealpha_(1),alpha_(2)..., alpha_(n)le(pi)/(2),and (cotalpha_(1))(cotalpha_(2))...(cotalpha_(n))=1is`

The maximum value of (cosalpha_(1))-(cos alpha_(2))...(cosalpha_(n)), under the restrictions 0lealpha_(1),alpha_(2)...,alpha_(n)le(pi)/(2) and (cotalpha_(1))-(cotalpha_(2))......(cotalpha_(n))=1 is

The maximum value of (cos alpha_1). (cos alpha_2)...........(cos alpha_n), under the restrictions 0 <=alpha_1,alpha_2..........,alpha_n<=pi/2 and (cot alpha_1) (cot alpha_2) ......... (cot a_n)=1 is

If alpha_(1),,alpha_(2),...,alpha_(n) are the roots of equation x^(n)+nax-b=0, show that (alpha_(1)-alpha_(2))(alpha_(1)-alpha_(2))...(alpha_(1)-alpha_(n))=n(alpha_(1)^(n-1)+a)

If alpha=e^((i2 pi)/(n)), then n(11-alpha)(11-alpha^(2))(11-alpha^(n-1))=

If alpha_(1),alpha_(2)………., alpha_(n) are real numbers show that (cos alpha_(1)+cos alpha_(2)+…..+cos alpha_(n))^(2)+(sin alpha_(1)+……+sin alpha_(n))^(2) le n^(2)

If 1,alpha_(1),alpha_(2),alpha_(3),...,alpha_(n-1) are n, nth roots of unity, then (1-alpha_(1))(1-alpha_(2))(1-alpha_(3))...(1-alpha_(n-1)) equals to

If 1,alpha_(1),alpha_(2)......alpha_(n-1) are n^(th) roots of unity then (1)/(1-alpha_(1))+(1)/(1-alpha_(2))+......+(1)/(1-alpha_(n-1))=