" A curve passing through "(2,3)" and satisfying the differential equation "int_(0)^(x)ty(t)dt=x^(2)y(x),(x>0)

A curve passing through (2,3) and satisfying the differential equation int_(0)^(x)ty(t)dt = x^(2)y(x), (x gt 0) is

A curve passing through (2,3) and satisfying the differential equation int_(0)^(t)ty(t)d = x^(2)y(x), (x gt 0) is

A curve passing through (2,3) and satisfying the differential equation int_0^x ty(t)dt=x^2y(x),(x >0) is

A curve passing through (2,3) and satisfying the differential equation int_0^x ty(t)dt=x^2y(x),(x >0) is (a) ( b ) (c) (d) x^(( e )2( f ))( g )+( h ) y^(( i )2( j ))( k )=13 (l) (m) (b) ( n ) (o) (p) y^(( q )2( r ))( s )=( t )9/( u )2( v ) (w) x (x) (y) (c) ( d ) (e) (f)(( g ) (h) x^(( i )2( j ))( k ))/( l )8( m ) (n)+( o )(( p ) (q) y^(( r )2( s ))( t ))/( u )(( v ) 18)( w ) (x)=1( y ) (z) (d) ( a a ) (bb) x y=6( c c ) (dd)

The equation of the curve passing through (3,4) and satisfying the differential equation. y((dy)/(dx))^(2)+(x-y)(dy)/(dx)-x=0 can be

The equation of the curve passing through (3,4) and satisfying the differential equation. y((dy)/(dx))^(2)+(x-y)(dy)/(dx)-x=0 can be

If int_(a)^(x)ty(t)dt=x^(2)+y(x), then find y(x)

Find the equation of the curve passing through origin and satisfying the differential equation 2xdy = (2x^(2) + x) dx .

Find the equation of the curve passing through origin and satisfying the differential equation 2xdy = (2x^(2) + x) dx .

The equation of the curve passing through the origin and satisfying the differential equation ((dy)/(dx))^(2)=(x-y)^(2) , is