Question

A point G divides a line segment in the ratio 3:7. The segment starts at the origin and ends at a point k having 20 as its abscissa and 40 as its ordinate. Given that is closer to the origin than to point which of the following are the coordinates of point G ?​
a.14,28
b.28,14
c.12,6
d.6,12

Answer 1

Answer:

answe will be A 14, 28

Answer 2

Given : A point G divides a line segment in the ratio 3:7.

The segment starts at the origin and ends at a point k having 20 as its abscissa and 40 as its ordinate.

To Find : the coordinates of point G

Solution:

Origin = ( 0 , 0)

abscissa is x coordinate and ordinate is y coordinate

K = ( 20 , 40)

G  Divided in 3 : 7 ratio

=> G  =  ( 3 * 20  + 7 * 0 )/( 3+ 7)  ,  ( 3  * 40 + 7 * 0)/ (3 + 7)

=> G =  (6  ,  12)

coordinates of point G are 6 , 12

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