If the curves ay +`x^(2) =7` and `x^(3) =y` cut orthogonally at (1,1) then the value of a is

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

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 curves ay+x^(2)=7 and x^(3)=y cut orthogonally at (1,1) then a=(A)1(B)-6 (C) 6(D)(1)/(6)

If the curves y^(2)=4x and xy=a,a>0 cut orthogonally,then a is

The curves x=y^(2) and xy =a^(3) cut orthogonally at a point, then a =

If 4x^(2)+ py^(2) =45 and x^(2)-4y^(2) =5 cut orthogonally, then the value of p is

If curve y=1-ax^(2) and y=x^(2) intersect orthogonally then the value of a is

If curve x^(2)=9a(9-y) and x^(2)=a(y+1) intersect orthogonally then value of 'a' is

If the curve ax^(2) + 3y^(2) = 1 and 2x^2 + 6y^2 = 1 cut each other orthogonally then the value of 2a :

Show that x^2=y and x^3+6y=7 intersect orthogonally at (1,\ 1)