Statement I In triangle `ABC, (a^(2)+b^(2)+c^(2))/(Delta) ge 4 sqrt3`
Statement II If `a_(i) gt 0,i=1,2,3…,n` shich are not
`(a_(1)^(m)+a_(2)^(m)+...+a_(n)^(m))/(n)gt((a_(1)+a_(2)+...+ +a_(n))/(n))^(m) ,if m lt 0 or m gt1.`

Prove that (a_(1)^(m)+a_(2)^(m)+….+a_(n)^(m))/(n)lt((a_(1)+a_(2)+..+a_(n))/(n))^(m) If 0ltmlt1 and a_(i)gt0 for all I.

Statement-1: 1^(3)+3^(3)+5^(3)+7^(3)+...+(2n-1)^(3)ltn^(4),n in N Statement-2: If a_(1),a_(2),a_(3),…,a_(n) are n distinct positive real numbers and mgt1 , then (a_(1)^(m)+a_(2)^(m)+...+a_(n)^(m))/(n)gt((a_(1)+a_(2)+...+a_(b))/(n))^(m)

If a_(1)gt0 for all i=1,2,…..,n . Then, the least value of (a_(1)+a_(2)+……+a_(n))((1)/(a_(1))+(1)/(a_(2))+…+(1)/(a_(n))) , is

If a_(i)>0(i=1,2,3...n), prove that sum_(1<=i

Q.if a_(1)>0f or i=1,2,......,n and a_(1)a_(2),......a_(n)=1, then minimum value (1+a_(1))(1+a_(2)),...,,(1+a_(n)) is :

If a_(i)gt0 for i u=1, 2, 3, … ,n and a_(1)a_(2)…a_(n)=1, then the minimum value of (1+a_(1))(1+a_(2))…(1+a_(n)) , is

If a_(i) gt 0 AA I in N such that prod_(i=1)^(n) a_(i) = 1 , then prove that (a + a_(1)) (1 + a_(2)) (1 + a_(3)) .... (1 + a_(n)) ge 2^(n)

If a_(1),a_(2),...,a_(n)>0, then prove that (a_(1))/(a_(2))+(a_(2))/(a_(3))+(a_(3))/(a_(4))+...+(a_(n-1))/(a_(n))+(a_(n))/(a_(1))>n