The integrating factor of the differential equation `(dy)/(dx)(x(log)_e x)+y=2(log)_e x` is given by (a) `( b ) x (c)` (d) (b) `( e ) (f) (g) e^(( h ) x (i))( j ) (k)` (l) (c) `( m ) (n) (o)(( p )log)_( q ) e (r) (s) x (t)` (u) (d) `( v ) (w) (x)(( y )log)_( z ) e (aa) (bb)(( c c )(( d d )log)_( e e ) e (ff) (gg) x)( h h )` (ii)

An integrating factor of the differential equation (dy)/(dx)(x log x)+2y=log x is

The integrating factor of the differential equation 3xlog_(e)x(dy)/(dx)+y=2log_(e)x is given by -

The integrating factor of the differential equation 3xlog_(e)x(dy)/(dx)+y=2 log_(e)x is given by

The general solution of the differential equation log_(e) ((dy)/(dx)) = x+y is

The solution of the differential equation (dy)/(dx)+(y)/(x log_(e )x)=(1)/(x) under the condition y=1 when x = e is

Separate the intervals of monotonocity for the function f(x)=((log)_e x)^2+((log)_e x)

A curve y=f(x) passes through point P(1,1) . The normal to the curve at P is a (y-1)+(x-1)=0 . If the slope of the tangent at any point on the curve is proportional to the ordinate of the point, then the equation of the curve is (a) ( b ) (c) y=( d ) e^(( e ) (f) K(( g ) (h) x-1( i ))( j ))( k ) (l) (m) (b) ( n ) (o) y=( p ) e^(( q ) (r) K e (s))( t ) (u) (v) (c) ( d ) (e) y=( f ) e^(( g ) (h) K(( i ) (j) x-2( k ))( l ))( m ) (n) (o) (d) None of these

Find the differentiation of f(x)=log(ax+b) w.r.t x.

Find (dy)/(dx) when : log(xy)=e^(x+y)+2