In which ratio (3, 4) divides the line segment joining (1, 2) and (4, 5) internally?(a) 1:2(b) 2:1(c) 3:4(d) 4:3I had been asked this question in unit test.Origin of the question is Slope of a Line in section Straight Lines of Mathematics – Class 11

In which ratio (3, 4) divides the line segment joining (1, 2) and (4,

1.	In which ratio (3, 4) divides the line segment joining (1, 2) and (4, 5) internally?(a) 1:2(b) 2:1(c) 3:4(d) 4:3I had been asked this question in unit test.Origin of the question is Slope of a Line in section Straight Lines of Mathematics – Class 11
Answer» Right option is (b) 2:1 The best explanation: The coordinates of a POINT dividing the line segment joining (x1, Y1) and (X2, y2) internally in the ratio m: n is \((\FRAC{mx_2+nx_1}{m+n},\frac{my_2+ny_1}{m+n})\). Let the ratio be k: 1.So, the coordinates of a point dividing the line segment joining (1, 2) and (4, 5) internally in the ratio k: 1 is \((\frac{k4+11}{k+1},\frac{k5+12}{k+1})\) => \((\frac{k4+11}{k+1},\frac{k5+12}{k+1})\) is same as (3, 4). => (4k+1)/(k+1) = 3 => 4k+1 = 3k+3 => k = 2 So, ratio is 2:1.

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