The focus of hyperbola is f, a is the right vertex, the intersection of left quasilinear x-axis is B, and a is the midpoint of FB
Because the Quasilinear equation of hyperbola is x = positive and negative a ^ 2 / C, the equation of its left quasilinear is x = negative a ^ 2 / C, and from the meaning of the title, we get f (C, 0) a (a, 0) (just draw the image), so AF = AB, that is: A ^ 2 / C + a = C-A, which is reduced to: A ^ 2 + 2ac-c ^ 2 = 0.1, because e = C / a divide 1 by AC to get: 1 / E-E + 2 = 0
RELATED INFORMATIONS
- 1. Make a straight line through the left focus F of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 and the imaginary axis endpoint B (0, b). It is known that the distance from the right vertex a to the straight line FB is equal to B / root 7 Make a straight line through the left focus F of the hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 and the imaginary axis endpoint B (0, b). It is known that the distance from the right vertex a to the straight line FB is equal to B / root 7, and calculate the eccentricity e of the hyperbola
- 2. It is known that F1 and F2 are two focal points of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0). Take line F1F2 as an edge to make an equilateral triangle, If the midpoint of edge MF1 is on the hyperbola, then the eccentricity of the hyperbola is?
- 3. 5. (2010 Shangrao senior two test) it is known that F1 and F2 are the two focuses of hyperbola x * 2 / A * 2-y * 2 / b * 2 = 1 (a > 0, b > 0). Take the line F1F2 as the edge to make the regular triangle mf1f2. If the midpoint P of the edge MF1 is on the hyperbola, then the eccentricity of the hyperbola is ()
- 4. If the common focus of ellipse X225 + y216 = 1 and hyperbola x24 − Y25 = 1 is F1, F2, P is an intersection of two curves, then the value of | Pf1 | · | PF2 | is______ .
- 5. Hyperbola problem: F1 and F2 are the left and right focus of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0), Given that F1 and F2 are the left and right focus of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0), if there is a point a on the right branch, so that the distance between point F2 and straight line AF1 is 2a, then the value range of eccentricity of the hyperbola is Given that F1 and F2 are the left and right focus of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0), if there is a point a on the right branch, so that the distance between point F2 and straight line AF1 is 2a, what is the range of eccentricity of the hyperbola
- 6. Given that P is a point on the right branch of hyperbola x ^ 2 / 16-y ^ 2 / 9 = 1, F1 and F2 are the left and right focuses of hyperbola respectively If s △ mpf1 = s △ mpf2 + MS △ mf1f2 holds, then the value of M is
- 7. Let the two focal points of the hyperbola be f 1. F 2. If | pf 2 | = 2 | f 1F 2 |, then the eccentricity of the hyperbola is zero
- 8. F 1 and F 2 are the focus of hyperbola, if there is P point in the right branch of hyperbola, which satisfies | PF2 | = | F1F2 | and F 1 and circle x ^ 2 + y ^ 2 = a ^ 2 F1 and F2 are the focus of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1. If the right branch of hyperbola has P point, satisfying | PF2 | = | F1F2 | and F1 is tangent to circle x ^ 2 + y ^ 2 = a ^ 2, then the asymptote equation of hyperbola is 4x±3y=0 Wrong number. Pf1 is tangent to the circle x ^ 2 + y ^ 2 = a ^ 2
- 9. The left and right focus of the hyperbola x2a2 − y2b2 = 1 is F1, F2, P is a point on the hyperbola, satisfying | PF2 | = | F1F2 |, and the straight line Pf1 is tangent to the circle x2 + y2 = A2, then the eccentricity e of the hyperbola is () A. 3B. 233C. 53D. 54
- 10. It is known that F1 and F2 are the two focuses of the hyperbola x ^ 2 / 16 - y ^ 2 / 9 = 1, and P is a point on the hyperbola, It is known that F1 and F2 are two focal points of hyperbola x ^ 2 / 16 - y ^ 2 / 9 = 1, P is a point on hyperbola, and Pf1 ⊥ PF2. Find the area of △ pf1f2
- 11. The left focus F and the right vertex a of the hyperbola, the straight line L passing through F and perpendicular to the X axis, the intersection of L and the hyperbola at B and C, if the triangle ABC is an acute triangle, the value range of the eccentricity of the hyperbola is calculated
- 12. It is known that the left vertex of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0) is a, and the right focus is f, Through the point F, make a straight line perpendicular to the x-axis, intersect the hyperbola at two points B and C, and AF = 3, BC = 6 (1) Find the equation of hyperbola (2) the left branch D and the right branch e of the l-intersection hyperbola passing through F. P is the midpoint of de. if a circle with diameter AF just passes through P, find the equation of line L
- 13. Let f and a be the left focus and right vertex of hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0) respectively, and point B (0, b) satisfy vector FB * vector AB = 0, then the eccentricity of the hyperbola is?
- 14. Given that the left focus of hyperbola X-Y = 1 is f, point P is on the hyperbola, and the ordinate of point P is less than 0, then the value range of the slope of the straight line pf?
- 15. It is known that the left focus of the hyperbola x ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 is f, the right vertex is a, the point P is on the hyperbola, and PF is perpendicular to the X axis, and the line AP intersects the Y axis at the point M. if the vector MP = 2, the vector am, what is the eccentricity of the hyperbola
- 16. Given that a focus of hyperbola x ^ 2 / A ^ 2-y ^ 2 = 1 coincides with the focus of parabola x = 1 / 8y ^ 2, what is the eccentricity of this hyperbola
- 17. It is known that F 1 F 2 is the focus of hyperbola ^ 2 / A ^ 2-y ^ 2 / b ^ 2 = 1 (a > 0, b > 0). The chord AB passes through F 1 and the two points of a and B are on the same branch if | af2 | + | BF2 | = 2 | ab| Then the value of | ab | is
- 18. Given that the left and right focal points of hyperbola x ^ 2 / 64-y ^ 2 / 36 = 1 are F1 and F2 respectively, the straight line L passes through point F1, the left branch of intersection hyperbola is at two points a and B, and the absolute value of AB = m, the perimeter of triangle abf2 is calculated
- 19. If the major axis of a hyperbola is 2a, F1 and F2 are its two focal points, and AF1, AB and BF2 form an arithmetic sequence, then AB equals () Why?
- 20. The two focal points of hyperbola y ^ 2 / 9-x ^ 2 / b ^ 2 = 1 are F1 and F2 respectively. If the length of chord AB passing through F1 is 4, the perimeter of triangle abf2 is 4