Find the ratio in which the y-axis divides the line segment joining the pointsA(-4, 2) and B(3, 9). Also find the coordinates of the point of division. About the author Everleigh
Step-by-step explanation: Using the section formula, if a point (x,y) divides the line joining the points (x 1 ,y 1 ) and (x 2 ,y 2 ) in the ratio m:n, then (x,y)=( m+n mx 2 +nx 1 , m+n my 2 +ny 1 ) Let y−axis divides the line joining points A(−4,−6) and B(10,12) in ratio y:1 Then, as per section formula the coordinates of point which divides the line is y+1 10y−4 , y+1 12y−6 We know that coordinate at y−axis of point of x is zero Then, y+1 10y−4 =0 ⇒10y−4=0 ⇒10y=4 ⇒y= 4 10 = 2 5 Then, ratio is 5 2 :1⇒2:5 Substitute the value of y in y− coordinates, we get 5 2 +1 12 5 2 −6 = 2−5 24−30 = −3 −6 =2 Then, coordinates of point which divides the line joining A and B is (0,2) and ratio 5 2 Reply
Step-by-step explanation:
Using the section formula, if a point (x,y) divides the line joining the points (x
1
,y
1
) and (x
2
,y
2
) in the ratio m:n, then
(x,y)=(
m+n
mx
2
+nx
1
,
m+n
my
2
+ny
1
)
Let y−axis divides the line joining points A(−4,−6) and B(10,12) in ratio y:1
Then, as per section formula the coordinates of point which divides the line is
y+1
10y−4 ,
y+1
12y−6
We know that coordinate at y−axis of point of x is zero
Then,
y+1
10y−4
=0
⇒10y−4=0
⇒10y=4
⇒y=
4
10
=
2
5
Then, ratio is
5
2
:1⇒2:5
Substitute the value of y in y− coordinates, we get
5
2
+1
12
5
2
−6
=
2−5
24−30
=
−3
−6
=2
Then, coordinates of point which divides the line joining A and B is (0,2) and ratio
5
2