If the tangent at the point `(p, q)` to the curve `x^3 + y^2 = k` meets the curve again at the point (a, b), then

If the tangent at the point (a,b) on the curve x^(3)+y^(3)=a^(3)+b^(3) meets the curve again at the point (p,q) then show that bp+aq+ab=0

If the tangent at the point (a,b) on the curve x^(3)+y^(3)=a^(3)+b^(3) meets the curve again at the point (p,q) then 1) ab+pq=0 2) bq+ab+ap=0 3) bp+aq+ab=0 4) bq+pq+ap=0

If the tangent at the point (at^2,at^3) on the curve ay^2=x^3 meets the curve again at Q , then q=

If the tangent at the point (at^(2),at^(3)) on the curve ay^(2)=x^(3) meets the curve again at

If the tangent at the point (at^(2),at^(3)) on the curve ay^(2)=x^(3) meets the curve again at:

If the tangent to the curve 4x^(3)=27y^(2) at the point (3,2) meets the curve again at the point (a,b) . Then |a|+|b| is equal to -

If tangent at point P(a,b) to the curve x^3+y^3=c^3 meet the curve agins at Q(a_1, b_1) then (a_1)/a +b_1/b=