If x is nearly equal to 1, then the approximate value of
`(px^(q)-qx^(p))/(x^(q)-x^(p))` is

Find the derivative of (px + q) (r/x + s)

int(px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1)dx is equal to

If x^(2) + px + q = 0 has the roots alpha and beta , then the value of (alpha - beta)^(2) is equal to

Find the derivative of (a x^2 + sin x)(p + q cos x)

If a !=p, b !=q, c!=r and |(p,b,c),(a,q,c),(a,b,r)| = 0 then the value of (p)/(p-a)+(q)/(q-b)+(r)/(r-c) is equal to a)-1 b)1 c)-2 d)2

If AM and GM of x and y are in the ratio p: q, then x: y is : a) p - sqrt(p^(2)+ q^(2)) : p +sqrt (p^(2)+ q^(2)) b) p +sqrt(p^(2) - q^ (2) ) : p- sqrt(p^(2)-q^(2)) c) p : q d) p + sqrt(p^(2) + q^(2)) : p-sqrt(p^(2) + q^(2))

If one root of the equation x^(2)+px+12=0 is 4, while the equation x^(2)+px+q=0 has equal roots, then the value of q is a)4 b)12 c)3 d) (49)/(4)