Let `p`,`q`, `r in R^(+)` and `27pqr ge (p+q+r)^(3)` and `3p+4q+5r=12`. Then the value of `8p+4q-7r=`

If p:q = 5:7 and p-q = -4 , then find the value of 3p+4q.

If p : q = 5 : 7 " and " p - q = - 4 , then find the value of (3p + 4q) .

Let p,q,r be the altitudes of a triangle with area s and perimeter 2t. Then the value of 1/p+1/q+1/r is

Let p , q , r be the altiudes of triangles with area s and perimeter 2 t . Then the value of (1)/(p)+(1)/(q)+(1)/(r) is _

If p,q,r three complex nos. so that p+q+r =0 and abs(p)=abs(q)=absr=1 then the value of (1/p+1/q+1/r) is

If (2 , -3 , 1) is the centroid of the triangle ABC with vertices A (-3 , p , 2) , B (2 , -4 , q) and C (r , 3 , 5) , find the values of p , q , r .

Show that the points (p , q , r) , (q , r , p) and (r , p , q) are the vertices of an equilateral triangle.

The vertices of a triangle are (p q ,1/(p q)),(q r ,1/(q r)), and (r p ,1/(r p)), where p ,q and r are the roots of the equation y^3-3y^2+6y+1=0 . The coordinates of its centroid are

Suppose that vec(p), vec(q) and vec(r) are three non-coplanar vectors in R. Let the components of a vector vec(s) along vec(p), vec(q) and vec(r) be 4, 3 and 5 respectively. If the components of this vector vec(s) " along" (-vec(p) + vec(q) + vec(r)), (vec(p) - vec(q) + vec(r)) and (-vec(p) - vec(q) + vec(r)) are x,y and z respectively, then the value of 2x + y + z is

Let alpha,beta be the roots of the equation x^(2)-px+r=0 and alpha//2,2beta be the roots of the equation x^(2)-qx+r=0 , then the value of r is (1) (2)/(9)(p-q)(2q-p) (2) (2)/(9)(q-p)(2p-q) (3) (2)/(9)(q-2p)(2q-p) (4) (2)/(9)(2p-q)(2q-p)