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 a!=p ,b!=q ,c!=ra n d|p b c a q c a b r|=0, then find the value of p/(p-a)+q/(q-b)+r/(r-c)dot

Let alpha,beta be the roots of the equation x^2-p x+r=0a n dalpha//2,2beta be the roots of the equation x^2-q x+r=0. Then the value of r is 2/9(p-q)(2q-p) b. 2/9(q-p)(2q-p) c. 2/9(q-2p)(2q-p) d. 2/9(2p-q)(2q-p)

The vertices of a triangle are (p q ,1/(p q)),(q r ,1/(q r)), and (r q ,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 (1,2) (b) 2,-1) (1,-1) (d) 2,3)

Let px^(2)+qx+r=0 be a quadratic equation (p,q,r in R) such that its roots are alpha and beta . If p+q+rlt0,p-q+rlt0 and r gt0 , then the value of [alpha]+[beta] is (where[x] denotes the greatest integer x)________.

Let int dx/(x^(2008)+x) = 1/p In((x^(q))/(1+x^(r)))+C where p,q,r in N and need not be distinct, then the value of ((p+q)/r) equals

Show that (pvvq) to r -= (p to r) ^^ (q to r)

If p and q are true and r is false, then

If p, q, r are any real numbers, then (A) max (p, q) lt max (p, q, r) (B) min(p,q) =1/2 (p+q-|p-q|) (C) max (p, q) < min(p, q, r) (D) None of these

If a ,b ,a n dc are in A.P. p ,q ,a n dr are in H.P., and a p ,b q ,a n dc r are in G.P., then p/r+r/p is equal to a/c-c/a b. a/c+c/a c. b/q+q/b d. b/q-q/b