Trên một mặt phẳng với hệ tọa độ Oxy cho hai đường thẳng $d_{1}$: 2x - 3y - 3 = 0 và $d_{2}$: 5x + 2y - 17 = 0. Đường thẳng d đi qua giao điểm của $d_{1}$ và $d_{2}$ cắt hai trục Ox,Oy lần lượt tại A và B. Vieets phương trình đường thẳng d sao cho $\frac{AB^{2}}{S^{2}_{OAB}}$ nhỏ nhất. 

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