If the curves (x2/4)+(y2/9)=1 and (x2/16)-(y2/k)=1 cut each other orthogonally, then k=

Question

If the curves (x2/4)+(y2/9)=1 and (x2/16)-(y2/k)=1 cut each other orthogonally, then k= (A) 144 (B) -9 (C) 25 (D) -21

Tardigrade Admin · Accepted Answer

We have, (x2/4)+(y2/9)=1 and (x2/16)-(y2/k)=1 On solving these equation, we get x2=(144+16 k/36+k) and y2=(-27 k/36+k) ...(i) Now, (x2/4)+(y2/9)=1 ⇒ (2 x/4)+(2 y y'/9)=0 ⇒ y'=-(9/4) (x/y) ...(ii) Again, (x2/16)-(y2/k)=1 ⇒ (2 x/16)-(2 y y'/k)=0 ⇒ y'=(k/16) (x/y) ...(iii) Since both curves are orthogonal ∴ (-9/4) (x/y) × (k/16) (x/y)=-1 ⇒ 9 k x2=64 y2 From Eq. (i), we have 9 k((144+16 k/36+k))=64((-27 k/36+k))⇒ k=-21

Q. If the curves 4x2​+9y2​=1 and 16x2​−ky2​=1 cut each other orthogonally, then k=

144

-9

25

-21

Q. If the curves $\frac{x ^{2}}{4} + \frac{y ^{2}}{9} = 1$ and $\frac{x ^{2}}{16} - \frac{y ^{2}}{k} = 1$ cut each other orthogonally, then $k =$