Prove that `a^p b & q >((a p+b p)/(p+q))^(p+q)dot`

Prove that a^p b^ q <((a p+b q)/(p+q))^(p+q)dot

Prove that q to p -= ~p to ~q

Prove that Q to P -= P to - Q

Prove that ~(~pto ~q) -=~p ^^q

If the p^("th"), q^("th") and r^("th") terms of a G.P. are a, b and c, respectively. Prove that a^(q – r) b^(r-p) c^(P - q) = 1.

Prove that ~((~p)^^q) -=pvv(~q) .

Sum of the first p, q and r terms of an A.P. are a, b and c, respectively. Prove that a/p(q-r)+b/q (r-p) +c/r (p-q)=0

Show that ~(p harr q) -= ( p ^^ ~q) vv(~p ^^q) .

Prove that p x^(q-r)+q x^(r-p)+r x^(p-q)> p+q+r ,w h e r ep ,q ,r are distinct and x!=1.

If the equation x^2 + px + q =0 and x^2 + p' x + q' =0 have common roots, show that it must be equal to (pq' - p'q)/(q-q') or (q-q')/(p'-p) .