Find the point P(x,y)P(x, y)P(x,y) that lies on the line y=3x−1y = 3x - 1y=3x−1 and is closest to the origin (0,0)(0, 0)(0,0).
(310,−110)(\frac{3}{10}, -\frac{1}{10})(103,−101)
(310,110)(\frac{3}{10}, \frac{1}{10})(103,101)
(110,−710)(\frac{1}{10}, -\frac{7}{10})(101,−107)
(110,−110)(\frac{1}{10}, -\frac{1}{10})(101,−101)