Question: For one point (3, y) on the plane 30y, let's denote the distances between this point and the lines :1: = 0. y = 0
For one point (3, y) on the plane 30y, let's denote the distances between this point and the lines :1: = 0. y = 0 and 2': + 21; = 16 by a, b, c respectively. Find the point that can minimize the value of a2 + b2 + (:2. Select one: 0 a. [0.81 1.6) O b. (3.21 6.4) O c. There are more than one point. 0 d. (0, 0) 0 e. (1.6, 3.2)
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