If `|x| lt 1` then `(d)/(dx ) [1+ (px)/(q) + (p (p+q))/(2 !)((x)/(q))^(2) + (p(p+q) (p+ 2q))/(3!) ((x )/(q))+...]=`

(~q) ^^ p ^^ (p rArr q) is

(p ^^ ~q) ^^ (~p vv q) is

(6 + p + q) (6 -p - q) = ___

(d)/(dx) [(x +1)(x^2+1)(x ^(4) + 1) (x ^(8) +1)]=(15 x ^(p) -16x^q+1) (x-1) ^(-2) implies (p,q)=

[p ^^ (~ q)] ^^ [(~p) vv q] is

If x is nearly equal to 1 show that (a) (px^(p)-qx^(q))/(p-q)=x^(p+q) (nearly) (b) (px^(q)-qx^(p))/(x^(q)-x^(p)) =(1)/(1-x) (nearly) (Hint : Take x=1+delta x and proceed)

x (p-q) =____

If x nearly equal to 1 show that (px^p - qx^q)/(p-q) = x^(p+q) (nearly)

Find the product: (p^(2)+q^(2))(p-2q+3r)

((p+1/q)^p.(p-1/q)^q)/((q+1/p)^p.(q-1/p)^q)=(p/q)^x then x=