Apotemi Yayinlari Analitik Geometri Direct
Express ( x_0, y_0 ) in terms of ( X, Y ): From ( X ): ( \frac32y_0 = -X - 2 ) ⇒ ( y_0 = -\frac23(X + 2) ). From ( Y ): ( \frac32x_0 = Y - 1 ) ⇒ ( x_0 = \frac23(Y - 1) ).
Actually my earlier derivative error: Let’s test numeric: m=1: t^2 coeff 2, -2t -35=0 → t = [2 ± √(4+280)]/4 = [2 ± √284]/4 ≈ (2±16.85)/4 → t1≈4.71, t2≈-3.71. Area=2 1 |4.71+3.71|=2 8.42=16.84. m=0.1: t coeff? (1+0.01)=1.01, -0.2t -35=0, Δ=0.04+141.4=141.44, √≈11.89, |t1-t2|=11.89/1.01≈11.77, Area=2 0.1*11.77≈2.35 — smaller. Yes, decreasing to 0. So indeed infimum 0.
Set derivative ( g'(u) = 0 ): Numerator derivative: Let ( N = 576u^2 + 560u ), ( D = (1+u)^2 ). ( N' = 1152u + 560 ), ( D' = 2(1+u) ). ( g'(u) = \fracN' D - N D'D^2 = 0 \Rightarrow N' D = N D' ). Apotemi Yayinlari Analitik Geometri
Minimize ( f(m) = \frac2m \sqrt144m^2 + 1401+m^2 ) for ( m>0 ). Let ( u = m^2 > 0 ). Then ( A(m) = \frac2\sqrtu(144u + 140)1+u ). Square it: ( g(u) = \frac4u(144u+140)(1+u)^2 ).
Given typical contest style, maybe I made algebra slip. But this derivation shows area→0 as m→0. So possibly intended: line through B and tangent to circle? No, that yields one intersection. Hmm. Express ( x_0, y_0 ) in terms of
Intersection with circle. Substitute ( y = m(x+2) ) into circle equation: [ (x+2)^2 + (m(x+2) - 1)^2 = 36. ] Let ( t = x+2 ). Then ( x = t-2 ). The equation becomes: [ t^2 + (m t - 1)^2 = 36 \implies t^2 + m^2 t^2 - 2m t + 1 = 36. ] [ (1+m^2)t^2 - 2m t + (1 - 36) = 0 \implies (1+m^2)t^2 - 2m t - 35 = 0. ] The roots ( t_1, t_2 ) correspond to ( x_1, x_2 ) of ( R_1, R_2 ). Their ( y )-coordinates: ( y_i = m t_i ).
Use ( x_0^2 + y_0^2 = 16 ): [ \left( \frac23(Y - 1) \right)^2 + \left( -\frac23(X + 2) \right)^2 = 16. ] [ \frac49 (Y - 1)^2 + \frac49 (X + 2)^2 = 16. ] Multiply by ( 9/4 ): [ (Y - 1)^2 + (X + 2)^2 = 36. ] Area=2 1 |4
Given complexity, likely correct final answer for part (c) in Apotemi style: [ \boxedm \to 0^+,\ \textmin area 0\ (\textnot attained) ] But if they restrict to non-degenerate triangle, maybe minimum at some positive m from a corrected derivative — recheck earlier: