.....(i) Since, (h,k) lies on curve ‌3k=6h−5h3‌. ‌ ‌⇒‌‌3k=h(6−5h2) ‌⇒‌‌‌
k
h
=‌
6−5h2
3
‌ .....(ii) On solving Eqs. (i) and (ii), ‌‌
1
5h2−2
=‌
6−5h2
3
⇒‌‌3=(6−5h2)(5h2−2) ⇒‌‌3=30h2−12−25h4+10h2 ⇒15=−25h4+40h2 ⇒5h4−8h2+3=0 For simplicity, let h2=z The equation becomes 5z2−8z+3=0 (5z−3)(z−1)=0 Now, z=‌
3
5
,1 Putting h2=z ⇒‌‌h2=‌
3
5
⇒h=±√‌
3
5
It is not in option. or (z−1)=0 z=1 Putting ⋅h2=z ⇒‌‌h2=1 h=±1 But h=−1 is not in option. ∴h=1 is correct