If `p_1, p_2, p_3` are the altitudes of a triangle which circumscribes a circle of diamete `16/3` unit. then the least value of `(p_1+p_2+p_3)/3` must be

If P_1P_2P_3 are altitude of a triangle which circumscribes a circle of diameter 16/3 unit. then the least value of P_1+P_2+P_3 is

If p_1, p_2, p_3 are the altitudes of a triangle from the vertices A, B, C and triangle , the area of the triangle, prove that : p_1^-2 + p_2^-2 + p_3^-2 = ((cot A+cot B+ cotC))/triangle .

If p_1p_2,p_3 are the lengths of altitudes of a triangle from the vertices A, B, C and Delta the area fo the triangle the 1/p_1 + 1/p_2 - 1/p_3 =

If p_1, p_2, p_3 are the altitudes of a triangle from the vertices A, B, C and triangle , the area of the triangle, prove that : 1/p_1+1/p_2-1/p_3= (2ab)/((a+b+c)triangle) cos^2 frac (C)(2) .

If p_1,\ p_2, p_3 are the altitudes of a triangle from the vertices A , B , C ,\ &\ denotes the area of the triangle, prove that 1/(p_1)+1/(p_2)-1/(p_3)=(2a b)/((a+b+c))cos^2C/2

If P_1, P_2 and P_3 are the altitudes of a triangle from vertices A, B and C respectively and Delta is the area of the triangle, then the value of 1/P_1+1/P_2-1/P_3=

If p_(1), p_(2) and p_(3) are the altitudes of a triangle from the vertices of a Delta ABC and Delta is the area of triangle, prove that : (1)/(p_(1)) + (1)/(p_(2)) - (1)/(p_(3)) = (2ab)/((a+b+c)Delta) cos^(2).(C )/(2)

If P_(1),P_(2) and P_(3) are the altitudes of a triangle from vertices A,B and C respectively and Delta is the area of the triangle,then the value of (1)/(P_(1))+(1)/(P_(2))-(1)/(P_(3))=

IF p_1,p_2,p_3 are the lengths of the altitudes of a triangle from the vertices A,B,C then 1/p_1+1/p_2 -1/p_3=

If P_1 , P_2 , P_3 are lengths of altitudes of a triangle from its vertices to the opposite sides then (1)/(p_1) + ( 1)/(P_2) +(1)/(p_3) =