If `1+9r^2+81r^4=256` and `1 + 3r + 9r^2= 32`, then find the value of `1 - 3r + 9r^2` .

If the sum to the infinity of the series 3+5r+7r^(2)+... is (44)/(9) then find the value of r

Simplify: 11r + 13 - 9r - 15

In triangle ABC ,if (r_(1))/(6)=(r_(2))/(3)=(r_(3))/(2) ,where, r_(1),r_(2) and r_(3) are ex-radii, then find the value of (a)/(b)+(b)/(c)+(c)/(a) ?

If sum_(r=1)^(n)T_(r)=n(2n^(2)+9n+13); then find the value of sum_(r=1)^(n)sqrt(T_(r))

If in a triangle ABC, r_(1)+r_(2)+r_(3)=9r , then the triangle is necessarily

If r,r_(1) ,r_(2), r_(3) have their usual meanings , the value of 1/(r_(1))+1/(r_(2))+1/(r_(3)) , is

(32^(32^32))/(9) find R.

If the sum to infinity of the series 1+2r+3r^(2)+4r^(3)+ is 9/4, then value of r is (a)1/2 b.1/3 c.1/4 d.none of these

Find the value of r if "^(n-1)P_r : ^nP_r = 2:3 and "^nC_r :^(n+1)C_r = 9:13 , then find n and r