Prove that the curves y^(2)=4ax and xy=c...

Prove that the curves `y^(2)=4ax and xy=c^(2)` cut at right angles if `c^(4)=32a^(4)`.

AI Generated Solution

APPLICATIONS OF DERIVATIVES
MODERN PUBLICATION|Exercise EXERCISE 6 (d) (Long Answer Type Questions (I))|46 Videos
APPLICATIONS OF DERIVATIVES
MODERN PUBLICATION|Exercise EXERCISE 1 (e) (Short Answer Type Questions)|16 Videos
APPLICATIONS OF DERIVATIVES
MODERN PUBLICATION|Exercise EXERCISE 6 (c) (Long Answer Type Questions (I))|42 Videos
APPLICATIONS OF THE INTEGRALS
MODERN PUBLICATION|Exercise CHAPTER TEST|12 Videos

Similar Questions

Explore conceptually related problems

Show that the curves x=y^(2) and xy=k cut at right angles; if 8k^(2)=1

Prove that the curves x=y^(2) and xy=k intersect at right angles if 8k^(2)=1

Show that the curves x=y^(2) and xy=k cut at right angles,if 8k^(2)=1

Show that the curves 2x=y^(2) and 2xy=k cut at right angles,if k^(2)=8.

Show that the curves 2x=y^2 and 2x y=k cut at right angles, if k^2=8 .

Show that the curves 4x=y^2 and 4x y=k cut at right angles, if k^2=512 .

If the curves y^(2)=4ax and xy=c^(2) cut orthogonally then (c^(4))/(a^(4))=

Show that the curves 2x=y^(2) and 2xy=k cut each other at right angles if k^(2)=8

Prove that the curves x=y^(2) and cut at right angles* if cut at right angles* if 8k^(2)=1

Prove that x^(2)-y^(2)=16 and xy=25 cut each other at right angles.