If `2y=3x-1` is a tangent drawn to the curve `y^(2)=ax^(3)+b` at (1,1) where a, b are constants then (a,b)=

The slope of the curve 2y^(2)=ax^(2)+b at (1,-1) is -1 Find a,b

If y = m x +5 is a tangent to the curve x ^(3) y ^(3) = ax ^(3) +by^(3)at P (1,2), then

If the line x+y=0 touches the curve 2y^(2)=ax^(2)+b at (1,-1), then

If the tangent to the curve y^(2)=ax^(2)+b at the point (2,3) is y=4x-5, then (a,b)=

If 4x-y=5 is tangent to curve ax^(3)=y^(2)+b at (2,3) ,then:

A tangent is drawn to the curve y=8x^(2) at a point A(x_(1),y_(1)), where x_(1)=2. The tangent cuts the x-axis at the point B .Then the scalar product of the vectors vec AB and vec OB is: 3 b.-3 c.6d.-6

If the line x+y=0 touches the curve 2y^(2)=ax^(2)+b at (1, -1), find a and b.

If the line y=4x-5 touches the curve y^(2)=ax^(3)+b at the point (2,3) , then : (a, b)-=