" The curve orthogonal to "y^(3)=x^(2)" at "(1,1)" is "

The locus of the center of a circle which cuts orthogonally the parabola y^(2)=4x at (1,2) is a curve

The locus of the center of a circle which cuts orthogonally the parabola y^2=4x at (1,2) is a curve

The locus of the center of a circle which cuts orthogonally the parabola y^2=4x at (1,2) is a curve

A : The curve y=x^2,6y=7-x^3 cut orthogonally at (1,1) . R : Two curve cut each other orthogonally at their point of intersection P iff m_1m_2=-1 where m_1,m_2 are the gradiants of the two curves at P .

If the curve a y+x^2=7 and x^3=y cut orthogonally at (1,\ 1) , then a is equal to (a) 1 (b) -6 (c) 6 (d) 0

If the curve a y+x^2=7 and x^3=y cut orthogonally at (1,\ 1) , then a is equal to (a) 1 (b) -6 (c) 6 (d) 0

The number of values of 'a' for which the curves y^(2)=3x^(2)+a and y^(2)=4x intersects orthogonally

If the curves a y+x^2=7 and x^3=y cut orthogonally at (1,1) , then find the value adot

If the curves a y+x^2=7 and x^3=y cut orthogonally at (1,1) , then find the value adot