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RELATED INFORMATIONS
- 1. It is known that the center of the ellipse is at the origin and the focus is on the x-axis. The area of the quadrilateral obtained by connecting its four vertices is 42. Connect a point on the ellipse (except the vertex) and the four vertices of the ellipse respectively. The product of the slopes of the four straight lines where the line segment is located is 14. The standard equation of the ellipse is obtained
- 2. On ellipses The coordinates of two fixed points a and B of triangle ABC are respectively - 6060. The product of the slope of the straight line where AC BC is located is equal to - 9 / 4. Find the trajectory equation of fixed point C
- 3. 1. The A.B.C of the ellipse is known to be an equal ratio sequence, and the eccentricity is calculated 2. If the endpoint of the minor axis of the ellipse and the two focal points form an isosceles right triangle, calculate the eccentricity
- 4. Is there a point Q on the positive half axis of the x-axis for the motion of the moving point P on the ellipse with the equation x ^ 2 / 9 + y ^ 2 / 4 = 1, so that the shortest distance between the point on the trajectory equation of Q and P is 1? If there is, find the Q coordinate. If not, explain the reason
- 5. The divisor of 120, All divisors of 120 (except 1) are written as the product of prime factors of 120
- 6. How many positive divisors does 75600 have? How many odd divisors? Point out the ideas, thank you!
- 7. The natural number n has 45 positive divisors. The minimum value of n is______ .
- 8. There is a mathematical problem: a natural number a, a total of 10 divisors, including 1 and a, to find the product of these divisors
- 9. Given a + B + C = 0, prove AB + BC + AC = 1
- 10. In △ ABC. Ab ⊥ AC, ad ⊥ BC in D, the proof: 1 / ad ^ 2 = 1 / AB ^ 2 + 1 / AC ^ 2 So in the tetrahedral ABCD, what kind of conjecture can you get by analogy with the above conclusion, and explain the reason
- 11. 1、 Let the vector OA = (3, - root 3), OB = (COS a.sin a), where 0 is less than or equal to a, less than or equal to two-thirds, if the vector AB = root 13, find the value of Tan A / find the maximum area of triangle AOB two, known sequence {an} is the equal ratio sequence of first term A1 = 1, and an > 0, {BN} is the arithmetic sequence of first term 1, and A5 + B3 = 21, A3 + B5 = 13, find the general term formula of {an} {BN}, Finding the first n terms and Sn of sequence {molecule BN denominator 2An}
- 12. Let the point P (5.2) F1 (- 6.0) F2 (6.0) be p ` F1 ` F2 'respectively with respect to the symmetrical point of the straight line y = x, and find the standard equation of the hyperbola with the focus of F1 ` F2' and passing through the point P '.
- 13. 1. It is known that the two vertices of triangle ABC are a (0,0) B (6,0), and vertex C moves on the curve (xsquare / 16) - (ysquare / 9) = 1-------- 2. If the points P and Q are on the parabola y square = 4 (x square), O is the origin of the coordinates, and (OP vector) x (OQ vector) = 0, then the fixed-point coordinates of the straight line are--------- 3. Given triangle ABC, if Mn is the midpoint of AB and AC respectively, then the product of eccentricity of ellipse and hyperbola with B and C as focus and passing through M and N is--------
- 14. Higher number -- the idea of proving the limit of sequence by definition ”Let {xn} be a sequence of numbers. If there is a constant a, for any given positive number ε (no matter how small it is), there is always a positive integer n, so that when n > N, the inequality | xn-a | n "can be described in language, what it stands for
- 15. How to understand the concept of limit in higher numbers When we calculate the area of a trapezoid with curved edges, we divide it into n rectangles. When n →∞, we can think that the area of these n rectangles is equal to the area of the trapezoid with curved edges. However, no matter how large N is, there is always a "gap" that can not be covered by the rectangle. In this way, is the area we calculate not too small?
- 16. When m is the value, the solution of equation 2 (2x-3) = 2x is the same as that of equation 8-m = 2 (one third x + m)
- 17. The walking speed ratio of Party A and Party B is 13:11. If Party A and Party B set out from both places at the same time and walk in opposite directions, they will meet in 2.5 hours. If they walk in the same direction,
- 18. If a times 1 / 9 = B times 5 = C times 1 / C (C is not equal to 0), then what are a and B respectively?
- 19. From a to B, it takes 8 hours for a bus and 12 hours for a truck. Now the two cars travel from a to B at the same time. How many hours have the two cars gone through the whole journey?
- 20. If point P (2,1) is the midpoint of a string ab of parabola y ^ 2 = 4x, the equation of AB is solved The coordinate of the point with the smallest distance from the parabola y = x ^ 2 + 2x + 1 to the straight line y = 2x-2 is?