Let p,q,r be the altitudes of a triangle with area S and permeter 2t . Then , the value of `(1)/(p)+(1)/(q)+(1)/(r)` is

The value of sqrt(p^(-1)q).sqt(q^(-1)r).sqrt(r^(-1) p) is

Let p,q r be three statements such that the truth value of (p ^^ q) to (q vv r) is F. Then the truth value of p,q r are respectively :

The area of the triangle formed by the points (p,(1)/(p)); (q,(1)/(q)) and (r,(1)/(r))

Let A=[(1, 2),(3, 4)] and B=[(p,q),(r,s)] are two matrices such that AB = BA and r ne 0 , then the value of (3p-3s)/(5q-4r) is equal to

Find the value of (p^(2)+q^(2))/(r^(2)+s^(2)) , if p:q=r:s

Consider a triangle ABC, G be the centroid , AB = c, BC= a, AC = b, p,q,r are the length of the angle bisectors of A,B,C respectively and p1,p2,p3 are the length of the Altitudes from vertices A,B,C respectively: Find 1. Value of sqrt ( p_1 ^(-2) + p_2 ^(-2) + p_3 ^(-2) ) ( Delta denotes area of triangle) is 2. The value of GA^2 + GB^2 + GC^2 is 3. The value of 1/p cos(A/2) + 1/q cos (B/2) + 1/r cos(C/2) is

If P_(1),P_(2),P_(3)=(k Delta^(2))/(R) then k^(3) is divisible by (where P_(1),P_(2),P_(3) are the altitudes of the triangle,R is the circumradius and is Delta is the area of the triangle)

If p and q are the roots of the equation x^2 - 15x + r = 0 and. p - q = 1 , then what is the value of r?