Apotemi Yayinlari Analitik Geometri May 2026
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.
That means ( h'(u) ) never zero for ( u>0 ) — so minimum at boundary ( u\to 0^+ ) or ( u\to\infty ). Check: As ( u\to 0^+ ), ( h(u) \sim 140u / 1 \to 0 ). As ( u\to\infty ), ( h(u) \sim 144u^2 / u^2 = 144 ). So ( h(u) ) increases from 0 to 144. So minimal area → 0 as ( m\to 0^+ ). But slope ( m>0 ), line through ( B(-2,0) ) — as ( m\to 0 ), line is horizontal ( y=0 ), intersects circle at two points symmetric about center’s vertical line? Wait, ( m=0 ) gives ( y=0 ), circle: ( (x+2)^2 + 1 = 36 ) ⇒ ( (x+2)^2 = 35 ) ⇒ two intersections. Then area formula: ( A=2m|t_1-t_2| ) with ( m=0 ) → area 0? But triangle degenerates? Yes, all points on x-axis: ( A(2,0) ) and ( R_1,R_2 ) on x-axis → collinear → area 0. But ( m>0 ) strictly? Problem says ( m>0 ), so infimum is 0 but not attained. Likely they expect answer for minimal positive area? Then no min, only infimum. Apotemi Yayinlari Analitik Geometri
Discriminant: ( 72^2 - 4\cdot 37 \cdot 35 = 5184 - 5180 = 4 ). So ( u = \frac-72 \pm 274 ). Positive root: ( u = \frac-7074 ) (neg) or ( u = \frac-7474 = -1 ) (neg). No positive ( u )? Thus final: minimal area 0 as m→0, but
Better: Minimize ( h(u) = \fracu(144u+140)(1+u)^2 ). ( h(u) = \frac144u^2+140uu^2+2u+1 ). Derivative: ( h'(u) = \frac(288u+140)(u^2+2u+1) - (144u^2+140u)(2u+2)(1+u)^4 ). Check: As ( u\to 0^+ ), ( h(u) \sim 140u / 1 \to 0 )
Area of triangle ( A(2,0), R_1, R_2 ): Use determinant formula: [ \textArea = \frac12 | x_A(y_1 - y_2) + x_1(y_2 - y_A) + x_2(y_A - y_1) |. ] Better: shift coordinates to simplify. Let ( u = x-2, v = y ) (translate so ( A ) at origin). Then ( A'=(0,0) ), ( R_i' = (t_i - 4, m t_i) ). Area = ( \frac12 | (t_1-4)(m t_2) - (t_2-4)(m t_1) | ) (since ( \frac12 |x_1 y_2 - x_2 y_1| ) in translated coords). Simplify: [ (t_1-4)m t_2 - (t_2-4)m t_1 = m[ t_1 t_2 - 4 t_2 - t_1 t_2 + 4 t_1 ] = m[ 4(t_1 - t_2) ]. ] So Area = ( \frac12 | 4m (t_1 - t_2) | = 2m |t_1 - t_2| ).