For each positive integer n, consider the point P with abscissa n on the curve `y^2-x^2= 1`. If `d_n` represele the shortest distance from the point P to the line y = x then `Lim_(n-> oo)(n d_n)` has the value equal to

For each positive integer consider the point P with abscissa n on the curve y^2-x^2=1. If d_n represents the shortest distance from the point P to the line y=x then lim_(n->oo)(nd_n) has the value equal to:

For each positive integer consider the point P with abscissa n on the curve y^2-x^2=1. If d_n represents the shortest distance from the point P to the line y=x then lim_(n->oo)(nd_n) has the value equal to:

For each positive integer consider the point P with abscissa n on the curve y^(2)-x^(2)=1. If d_(n) represents the shortest distance from the point P to the line y=x then lim_(n rarr oo)(n.d_(n)) as the value equal to (A) (1)/(2sqrt(2))(B)(1)/(2)(C)(1)/(sqrt(2)) (D) 0

Q.8 For each positive integern. consider the point P with abscissa non the curve y2 x 2 1. Ifd represents the shortest distance from the point P to the line y then Lim (n dn) has the value equal to (B) (A) 3.77 (D)0

8 For each positive inte consider the point P with abscissa non the curve 2 x2 1.Ifd, represents y the shortest distance from the point P to the line y x then Lim(n dn) as the value equal to (D) 0 (C) V2 (B)

If the arithmetic mean of the product of all pairs of positive integers whose sum is n is A_n then lim_(n->oo) n^2/(A_n) equals to

If the arithmetic mean of the product of all pairs of positive integers whose sum is n is A_n then lim_(n->oo) n^2/(A_n) equals to

If the arithmetic mean of the product of all pairs of positive integers whose sum is n is A_n then lim_(n->oo) n^2/(A_n) equals to