Solved The Line Segment Joining The Points 3 4 And 1 2 Is

The Line Segment Joining The Points 3 4 And 1 2 Is Trisected At To solve the problem of finding the ratio in which the y axis divides the line segment joining the points ( 3, 4) and (1, 2), we can use the section formula. here’s a step by step solution:. Find an answer to your question the line segment joining the points (3, 4)and (1,2)is trisected at the point of p and q if the coordinates of p and q are (p, 2)….

Solved The Line Segment Joining The Points 3 4 And 1 2 Is We have two points a (3,−4) and b (1, 2). there are two points p (,−2) and q (5 3, q) which trisect the line segment joining a and b. p(x,y)=( (nx1 mx2) (m n)","(ny1 my2) (m n)) the point p is the point of trisection of the line segment ab. so, p divides ab in the ratio 1: 2. Let the points (− 3, − 4) and (1, − 2) be divided by y axis at (0, t) in the ratio m:n. ∴ \ (\big (\frac {m 3n} {m n},\frac { 2m 4n} {m n}\big) \) = (0,t) ⇒ 0 = \ (\frac {m 3n} {m n}\) ⇒ m:n = 3:1. Let say a (3, 4) and b (1,2) makes a line segment ab. the line segment ab is trisected at points p and q. so, we will apply section formula both at point p and q. as, p divides line segment ab in ratio 1:2. as, q divides the line segment ab in the ratio 2:1. so, the correct options are (a) and (c). The line segment joining the points a (3,−4) and b (1,2) is trisected at the points p (p,−2) and q (53,q). find the values of p and q.

Solved The Line Segment Joining The Points 3 4 And 1 2 Is Let say a (3, 4) and b (1,2) makes a line segment ab. the line segment ab is trisected at points p and q. so, we will apply section formula both at point p and q. as, p divides line segment ab in ratio 1:2. as, q divides the line segment ab in the ratio 2:1. so, the correct options are (a) and (c). The line segment joining the points a (3,−4) and b (1,2) is trisected at the points p (p,−2) and q (53,q). find the values of p and q. To find the coordinates of the trisection points p and q for the line segment between the points (3, 4) and (1, 2), we first calculate the distance between these two points and how they are divided. To find the ratio in which the line segment joining the points ( 3, 4) and (1, 2) is divided by the y axis, we can follow these steps: step 1: identify the points. Here you can find the meaning of the line segment joining points 3 4 and 1 2 is divided by y axis in the ratio? defined & explained in the simplest way possible. To find the points p and q that trisect the line segment joining the points (3, 4) and (1,2), we first need to determine the coordinates of these points using the section formula.