Let `u(x) and v(x)` be differentiable functions such that `(u(x))/(v(x))=7` If `(u^(prime)(x))/(v^(prime)(x))=p and ((u(x))/(v(x)))^'=q ,then (p+q)/(p-q)` has the value
(a) 1 (b) 0 (c) 7 (d) `-7`

Differentiate the following functions : sin^P x cos ^q x

If x^(p)y^(q)=(x+y)^(p+q) , find (d^()y)/(dx^()) .

Let u(x) and v(x) be two continous functions satisfying the differential equations (du)(dx) +p(x)u=f(x) and (dv)/(dx)+p(x)v=g(x) , respectively. If u(x_(1)) gt v(x_(1)) for some x_(1) and f(x) gt g(x) for all x gt x_(1) , prove that any point (x,y) ,where x gt x_(1) , does not satisfy the equations y=u(x) and y=v(x) simultaneously.

Let z =x-iy and z^(1/3)= p+iq .Then (x/p+y/q)//(p^2+q^2) is equal to:

Let the derivative of f(x) be defined as D^(**)f(x)=lim_(hrarr0)(f^(2)(x+h)-f^(2)(x))/(h), where f^(2)(x)={f(x)}^(2) . If u=f(x),v=g(x) , then the value of D^(**)(u.v) is

Let the derivative of f(x) be defined as D^(**)f(x)=lim_(hto0)(f^(2)x+h-f^(2)(x))/(h), where f^(2)(x)={f(x)}^(2) . If u=f(x),v=g(x) , then the value of D^(**)((u)/(v)) is.

If u=f(x^3),v=g(x^2),f^(prime)(x)=cosx ,a n dg^(prime)(x)=sinx ,t h e n(d u)/(d v) is (a) 3/2xcosx^3cos e cx^2 (b) 2/3sinx^3secx^2 (c) tanx (d) none of these

The range of the function f(x) = "^(7-x)P_(x-3) is :

Let y= int_(u(x))^(y(x)) f (t) dt, let us define (dy)/(dx) as (dy)/(dx)=v'(x) f^(2) (v(x)) - u' (x) f^(2) (u(x)) and the equation of the tangent at (a,b) and y-b=((dy)/(dx))(a,b) (x-a) . If f(x)=int _(x)^(x^2) t^(2) dt " then" (d)/(dx) f(x) at x = 1 is

If x^(p) y^(q) = (x + y)^((p + q)) " then " (dy)/(dx)= ?