The first question needs to pass through point C according to the known conditions, set the analytical formula of parabola as y=ax2+bx+2, and then get the result according to points A and B;
The second problem is that △ABE with a and b as right-angle vertices does not exist, so △ABE can only be a triangle with point E as right-angle vertex.
The third problem, as shown in Figure 2, is to connect AC, so that the DE⊥x axis is at point E, BF⊥ad is at point F, BC∑AD is assumed to be y=kx+b, and AD is assumed to be Y = Kx+N. By using the undetermined coefficient method, the analytical expression of a linear function can be obtained, so that the coordinates of point D can be obtained.
Solution: (1)∫ The parabola passes through point C (0,2),
∴ Let the analytical expression of this parabola be y = AX2+BX+2.
Substitute A (- 1, 0) and B (4, 0).
This is a detailed answer/exercise/math /798568, which contains detailed ideas and answering process. Known parabola y=ax? +bx+c(a≠0) passes through a (- 1, 0), b (4 4,0) and c (0,2).
(1) Find the analytical expression of this parabola;
(2)E is a moving point on a parabola. Is there a point e that makes a triangle with vertices a, b and e similar to △COB? If it exists, try to find the coordinates of point e; If it does not exist, please explain the reason;
Honey, if you don't understand, you can keep asking me. Come on ~ I hope it can be adopted if it helps!