Analitik Geometri | Apotemi Yayinlari

Cancel ( 1152u^2 ) both sides: ( 1712u + 560 = 1120u \implies 592u = -560 ) — impossible for ( u>0 ).

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 ). Apotemi Yayinlari Analitik Geometri

Compute: ( (1152u+560)(1+u)^2 = (576u^2+560u) \cdot 2(1+u) ). Divide both sides by ( 2(1+u) ) (since ( u>0 )): ( (1152u+560)(1+u) = 2(576u^2+560u) ). Expand LHS: ( 1152u + 1152u^2 + 560 + 560u = 1152u^2 + 1712u + 560 ). RHS: ( 1152u^2 + 1120u ). Cancel ( 1152u^2 ) both sides: ( 1712u

Thus final: minimal area 0 as m→0, but triangle degenerates. For non-degenerate, no minimum, but if they ask for minimizing area among non-degenerate, it's arbitrarily small. Then ( A(m) = \frac2\sqrtu(144u + 140)1+u )

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 ).

[ \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^+ ]