Let `A_(1), A_(2), A_(3),…,A_(n)` be the vertices of an n-sided regular polygon such that `(1)/(A_(1)A_(2))=(1)/(A_(1)A_(3))+(1)/(A_(1)A_(4)).` Find the value of n. Prove or disprove the converse of this result.

Let A_(1),A_(2),...A_(n) be the vertices of an n-sided regular polygon such that,(1)/(A_(1)A_(2))=(1)/(A_(1)A_(3))+(1)/(A_(1)A_(4)). Find the value of n.

let A_(1),A_(2),A_(3),...A_(n) are the vertices of a regular n sided polygon inscribed in a circle of radius R.If (A_(1)A_(2))^(2)+(A_(1)A_(3))^(2)+...(A_(1)A_(n))^(2)=14R^(2) then find the number of sides in the polygon.

If a_(1),a_(2),a_(3),,a_(n) are an A.P.of non-zero terms, prove that _(1)(1)/(a_(1)a_(2))+(1)/(a_(2)a_(3))++(1)/(a_(n-1)a_(n))=(n-1)/(a_(1)a_(n))

If A,A_(2),...,A_(n) is a regular polygon.Then the vector bar(A_(1)A_(2))+bar(A_(2)A_(3))+....+bar(A_(n)A) ,is equal to

If 1,a_(1),a_(2),...,a_(n-1) are the nth roots of unity then prove that (1-a_(1))(1-a_(2))(1-a_(3))=(1-a_(n-1))=n

Let A_(1),A_(2),A_(3),.........,A_(14) be a regular polygon with 14 sides inscribed in a circle of radius R. If (A_(1)A_(3))^(2)+(A_(1)A_(7))^(2)+(A_(3)A_(7))^(2)=KR^(2) , then K is equal to :

Let a_(1),a_(2),a_(3),...a_(n) be an AP.Prove that: (1)/(a_(1)a_(n))+(1)/(a_(2)a_(n-1))+(1)/(a_(3)a_(n-2))+......+(1)/(a_(n)a_(1))=