If l, m, n denote the side of a pedal triangle, then `(l)/(a ^(2))+(m)/(b^(2))+(n)/(c ^(2))` is equal to

If g, h, k denotes the side of a pedal triangle, then prove that (g)/(a^(2))+ (h)/(b^(2))+ (k)/(c^(2))=(a^(2)+b^(2) +c^(2))/(2 abc)

Let M and N be two 3xx3 non singular skew-symmetric matrices such that M N=N Mdot If P^T denote the transpose of P , then M^2N^2(M^T N)^-1(MN^(-1))^T is equal to

If a tangent to the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 makes equal intercepts of length l on cordinates axes, then the values of l is

In DeltaABC the mid points of the sides AB, BC and CA are (l, 0, 0), (0, m, 0) and (0, 0,n) respectively. Then, (AB^2+BC^2+CA^2)/(l^2+m^2+n^2) is equal to

If m is the AM of two distinct real numbers l and n (l,ngt1) and G_(1),G_(2)" and "G_(3) are three geometric means between l and n, then G_(1)^(4)+2G_(2)^(4)+G_(3)^(4) equals

Prove that the pair of lines joining the origin to the intersection of the curve (x^2)/(a^2)+(y^2)/(b^2)=1 by the line lx+my+n=0 are coincident, if a a^2l^2+b^2m^2=n^2

if .^(2n)C_(2):^(n)C_(2)=9:2 and .^(n)C_(r)=10 , then r is equal to

A=[{:(l_(1),m_(1),n_(1)),(l_(2),m_(2),n_(2)),(l_(3),m_(3),n_(3)):}] and B=[{:(p_(1),q_(1),r_(1)),(p_(2),q_(2),r_(2)),(p_(3),q_(3),r_(3)):}] Where p_(i), q_(i),r_(i) are the co-factors of the elements l_(i), m_(i), n_(i) for i=1,2,3 . If (l_(1),m_(1),n_(1)),(l_(2),m_(2),n_(2)) and (l_(3),m_(3),n_(3)) are the direction cosines of three mutually perpendicular lines then (p_(1),q_(1), r_(1)),(p_(2),q_(2),r_(2)) and (p_(3),q_(),r_(3)) are

if .^(m+n)P_(2)=56 and .^(m-n)P_(3)=24 , then (.^(m)P_(3))/(.^(n)P_(2)) equals

If acostheta+bsintheta=mandasintheta-bcostheta=n , then show that, a^(2)+b^(2)=m^(2)+n^(2) .