Web4 aug. 2024 · Hence, the required ratio is 2/3:1 i.e., 2:3 Putting K=2/3 in the coordinates of R We get, (0,1) Let the point P divide AB in the ratio K:1 Then, the coordinates of P are But the coordinates of P are given as (−5,−21/5) Hence, the point P divides AB in the ratio 2/3:1 => 2:3 ← Prev Question Next Question → Find MCQs & Mock Test Web3 jan. 2024 · Find the ratio in which the point `P((3)/(4), (5)/(12))` divides the line segment joining the points `A((1)/(2), (3)/(2))` and B(2, -5).

Formula of line segment joining 2 points - Mathematics Stack …

WebIn what ratio is the line joining (2, -3) and (5, 6) divided by the x-axis. CISCE ICSE Class 10. Question Papers 359. Textbook Solutions 25655. MCQ Online Mock Tests 6. … Web1 okt. 2024 · Therefore, ratio in which point(-1, 6) divides the line segment joining (-3, 10), (6, -8) is 2:7 Midpoint Formula Midpoint is defined as the point that divides a line … oxigen landscape architects

In what ratio is the line joining A(0, 3) and B (4, -1) divided by …

Web14 dec. 2012 · Find the ratio in which the line segment joining the points P (3,-6) and Q (5,3) is divided by the x-axis. Asked by Manisha Vadagave 14 Dec, 2012, 08:19: PM Expert Answer Let the ratio be k:1. The coordinates of the point that divides PQ in the ratio k:1 are (5k+3/ k+1, 3k-6/ k+1) This point lies on x-axis its ordinate is zero. Hence, WebGiven, the line y = 0 divides the line joining the points (3, -5) and (-4, 7). consider, the line y = 0 divides the line joining the points (3, -5) and (-4, 7) at point P (x, y) in the ratio λ: 1. Now find the value of λ A = (3 ,5) = (x 1 ,y 1) and B = (- … WebAnswer: Let the ratio in which x-axis divides the line segment joining (–4, –6) and (–1, 7) = 1: k. Then, x-coordinate becomes, \frac {\left (-1-4k\right)} { (k+1)} (k+1)(−1−4k) y-coordinate becomes, \frac {\left (7-6k\right)} { (k+1)} (k+1)(7−6k) Since P lies on x-axis, y coordinate = 0 jefferson county ky ami