If the tangent to the curve `xy+ax+by=0` at (1,1) is inclined at an angle `Tan^-1 2` with x-axis, then

If the tangent to the curve x y+a x+b y=0 at (1,1) is inclined at an angle tan^(-1)2 with x-axis, then find a and b ?

If the tangent to the curve x y+a x+b y=0 at (1,1) is inclined at an angle tan^(-1)2 with x-axis, then find a and b ?

If the tangent to the curve x y+a x+b y=0 at (1,1) is inclined at an angle tan^(-1)2 with x-axis, then find aa n db ?

If the tangent to the curve x y+a x+b y=0 at (1,1) is inclined at an angle tan^(-1)2 with x-axis, then find aa n db ?

(i) If the tangent to the curve xy+ax+by=0 at (1,1) is inclined at an angle tan^(-1) 2 with positive x-axis in anticlockwise then find a and b? (ii) The curve y=ax^(3) +bx^(2)+3x+5" touches "y=(x+2)^(2) " at "(-2,0) " then "|(a)/(2)+b|" is"

The tangent to the cureve xy+ax+by=0 at (1, 1) makes an angle with X - axis is tan^(-1)2 then ………….

If the tangent at each point of the curve y = x^3-ax^2 + x +1 is inclined at an acute angle with the positive direction of x-axis then find a.

If the slope of the tangent to the curve xy+ax=by at (1,1) is 2, then (a,b)=

The tangent to the curve y =x^3 +1 at (1,2) makes an angle theta with y-axis, then the value of tan theta is