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Reflection property of parabolas Consider the parabola y 4p with its focus at F(0, p) (see figure). The goal is to show that the angle of incidence between the ray € and the tangent line L (æ in the figure) equals the angle of reflection between the line PF and L (B in the figure). If these two angles are equal, then the reflec- tion property is proved because e is reflected through F. a. Let P(xp. Yo) be a point on the parabola. Show that the slope of the line tangent to the curve at Pis tan 0 P – Yo 2p b. Show that tan ọ = c. Show that a = 0; therefore, tan a = cot 0. 2 d. Note that B = 0 + p. Use the tangent addition tan 0 + tan o %3D formula tan (0 + p) to show that 1 - tan 0 tan o 2p tan a = tan B e. Conclude that because a and B are acute angles, a = B. F(0, p) Yo