Question

If $\alpha$ and $\beta$ are the eccentric angles of the extremities of a focal chord of an ellipse of eccentricity e then $\cos \left(\frac{\alpha -\beta }{2}\right)=$

• A. $e\cos \left(\frac{\alpha -\beta }{2}\right)$
• B. $e\cos \left(\frac{\alpha +\beta }{2}\right)$
• C. $e\cos \left(\frac{\alpha -\beta }{3}\right)$
• D. $e\cos \left(\frac{2\alpha +2\beta }{2}\right)$

Answer 1

The correct option is B $e\cos \left(\frac{\alpha +\beta }{2}\right)$

Equation of the chord joining the points $\alpha ,\beta$ on the ellipse is $y-bsin\alpha =-\frac{bcos\left(\frac{\alpha +\beta }{2}\right)}{asin\left(\frac{\alpha +\beta }{2}\right)}(x-acos\alpha )$
This line passes through the focus (ae, 0) then we have $\cos \left(\frac{\alpha -\beta }{2}\right)=e\cos \left(\frac{\alpha +\beta }{2}\right)$ after simplification