Question

Find the ratio in which the point P(3/4,5/12) divides the line segment joining the point A(1/2,3/2)

and B (2, - 5).

guys plz answer fast ... ​

Answer 1

Answer:

Step-by-step explanation:

We know that by section formula, the co-ordinates of the points which divide internally  the line segment joining the points (x  

1

​  

,y  

1

​  

) and (x  

2

​  

,y  

2

​  

) in the ratio m:n is

P(x,y)=(  

m+n

mx  

2

​  

+nx  

1

​  

 

​  

,  

m+n

my  

2

​  

+ny  

1

​  

 

​  

)

Let point P divide AB in the ratio 1:k

Then, by section formula,

(  

4

3

​  

,  

12

5

​  

)≡  

⎝

⎜

⎜

⎜

⎛

​  

 

k+1

k(  

2

1

​  

)+1(2)

​  

,  

k+1

k(  

2

3

​  

)+1(−5)

​  

 

⎠

⎟

⎟

⎟

⎞

​  

 

Equating x and y coordinates, we get

k+1

k/2+2

​  

=  

4

3

​  

,  

k+1

3k/2−5

​  

=  

12

5

​  

 

⇒2k+8=3k+3,18k−60=5k+5

⇒k=5

Hence P divides AB in the ratio 1:5

solution