Apotemi Yayinlari Analitik | Geometri
( |t_1 - t_2| = \frac\sqrt\Delta ), where ( \Delta = (-2m)^2 - 4(1+m^2)(-35) = 4m^2 + 140(1+m^2) = 4m^2 + 140 + 140m^2 = 144m^2 + 140 ). So ( |t_1 - t_2| = \frac\sqrt144m^2 + 1401+m^2 ). Thus [ \textArea(m) = 2m \cdot \frac\sqrt144m^2 + 1401+m^2. ]
Expand LHS: ( 144u^3 + 288u^2 + 144u + 70u^2 + 140u + 70 = 144u^3 + (288+70)u^2 + (144+140)u + 70 ) ( = 144u^3 + 358u^2 + 284u + 70 ). Apotemi Yayinlari Analitik Geometri
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: ( |t_1 - t_2| = \frac\sqrt\Delta ), where
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' ). ] Expand LHS: ( 144u^3 + 288u^2 +
Set numerator=0: ( (288u+140)(u^2+2u+1) = (144u^2+140u) \cdot 2(u+1) ). Divide both sides by 2: ( (144u+70)(u^2+2u+1) = (144u^2+140u)(u+1) ).
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) ).
[ \text(a) (x+2)^2+(y-1)^2=36 \quad \text(b) Circle, center (-2,1),\ r=6 \quad \text(c) \inf \text area =0 \text as m\to 0^+ ]