A normal at `P(x , y)` on a curve meets the x-axis at `Q` and `N` is the foot of the ordinate at `Pdot` If `N Q=(x(1+y^2))/(1+x^2)` , then the equation of curve given that it passes through the point `(3,1)` is (a) `( b ) (c) (d) x^(( e )2( f ))( g )-( h ) y^(( i )2( j ))( k )=8( l )` (m) (b) `( n ) (o) (p) x^(( q )2( r ))( s )+2( t ) y^(( u )2( v ))( w )=11 (x)` (y) (c) `( d ) (e) (f) x^(( g )2( h ))( i )-5( j ) y^(( k )2( l ))( m )=4( n )` (o) (d) None of these

The equation of a curve passing through (1,0) for which the product of the abscissa of a point P and the intercept made by a normal at P on the x-axis equal twice the square of the radius vector of the point P is (a) ( b ) (c) (d) x^(( e )2( f ))( g )+( h ) y^(( i )2( j ))( k )=( l ) x^(( m )4( n ))( o ) (p) (q) (b) ( r ) (s) (t) x^(( u )2( v ))( w )+( x ) y^(( y )2( z ))( a a )=2( b b ) x^(( c c )4( d d ))( e e ) (ff) (gg) (c) ( d ) (e) (f) x^(( g )2( h ))( i )+( j ) y^(( k )2( l ))( m )=4( n ) x^(( o )4( p ))( q ) (r) (s) (d) None of these

Find the equation of the normal to the curve x^(2) = 4y which passes through the point (1, 2).

The circumcenter of the triangle formed by the line y=x ,y=2x , and y=3x+4 is (a) ( b ) (c)(( d ) (e)6,8( f ))( g ) (h) (b) ( i ) (j)(( k ) (l)6,8( m ))( n ) (o) (c) ( d ) (e)(( f ) (g)3,4( h ))( i ) (j) (d) ( k ) (l)(( m ) (n)-3,-4( o ))( p ) (q)

Find the equation of the curve whose slope is (y-1)/(x^(2)+x) and which passes through the point (1,0).

A curve is such that the mid-point of the portion of the tangent intercepted between the point where the tangent is drawn and the point where the tangent meets the y-axis lies on the line y=xdot If the curve passes through (1,0), then the curve is (a) ( b ) (c)2y=( d ) x^(( e )2( f ))( g )-x (h) (i) (b) ( j ) (k) y=( l ) x^(( m )2( n ))( o )-x (p) (q) (c) ( d ) (e) y=x-( f ) x^(( g )2( h ))( i ) (j) (k) (d) ( l ) (m) y=2(( n ) (o) x-( p ) x^(( q )2( r ))( s ) (t))( u ) (v)

Find the equation of a curve passing through (2,7/2) and having gradient 1-1/(x^2) at (x , y) is

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis and the y-axis in point A AND B , respectively, such that 1/(O A)+1/(O B) =1, where O is the origin. Find the equation of such a curve passing through (5, 4)

The slope of the tangent at (x , y) to a curve passing through a point (2,1) is (x^2+y^2)/(2x y) , then the equation of the curve is

The distance between the point ( acosalpha,asinalpha) and ( acosbeta,asinbeta) is (a) ( b ) (c) acos( d )(( e )alpha-beta)/( f )2( g ) (h) (i) (j) (b) ( k ) (l)2acos( m )(( n )alpha-beta)/( o )2( p ) (q) (r) (s) (c) ( d ) (e)2as in (f)(( g )alpha-beta)/( h )2( i ) (j)( k ) (l) (d) ( m ) (n) asin( o )(( p )alpha-beta)/( q )2( r ) (s) (t) (u)