Let A B is the latus rectum of the hyperbola (x2/a2)-(y2/b2)=1 such that triangle O A B is equilateral where ' O ' is origin and under this condition eccentricity of the hyperbola is given as (1+√p/2 √q) (where p, q are prime numbers) then p-q is

Question

Let A B is the latus rectum of the hyperbola (x2/a2)-(y2/b2)=1 such that triangle O A B is equilateral where ' O ' is origin and under this condition eccentricity of the hyperbola is given as (1+√p/2 √q) (where p, q are prime numbers) then p-q is (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Since O A=A B (equilateral triangle) ∴ a2 e2+(b4/a2)=4 ⋅ (b4/a2) ⇒ a2 e2=3 ⋅ (b4/a2) ⇒ e2=3 ⋅ (b4/a4) ....(1) <img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/c4235d657a89555ee1be8db8c6d05a54-.png" /> Also e2=1+(b2/a2) ⇒ e2=1+(e/√3) (using (1)) ⇒ √3 e2-e-√3=0 ⇒ e=(1+√13/2 √3) ∴ p-q=13-3=10

Q. Let AB is the latus rectum of the hyperbola a2x2​−b2y2​=1 such that triangle OAB is equilateral where ' O ' is origin and under this condition eccentricity of the hyperbola is given as 2q​1+p​​ (where p,q are prime numbers) then p−q is

Since OA=AB (equilateral triangle) ∴a2e2+a2b4​=4⋅a2b4​ ⇒a2e2=3⋅a2b4​ ⇒e2=3⋅a4b4​ ....(1) Also e2=1+a2b2​ ⇒e2=1+3​e​ (using (1)) ⇒3​e2−e−3​=0 ⇒e=23​1+13​​ ∴p−q=13−3=10