Math, asked by lua77, 2 days ago

The point which divides the line segment joining the points P(-1, 7) and Q(4, -3) in the ratio of 2:3 is
i) ( -1 , 3 )
ii) ( -1 , -3 ) 
iii) ( 1 , - 3 ) 
iv) ( 1 , 3 ) ​

Answers

Answered by vanshsaini0777
1

Answer:

iv) (1,3)

Step-by-step explanation:

By section formula

Answered by hukam0685
0

Step-by-step explanation:

Given:P(-1,7) and Q(4,-3)

To find:Find the point which divides the line segment in ratio 2:3 is:

(a) (-1,3)

(b) (1, -3)

(c) (1, -3)

(d) (1,3)

Solution:

Tip: Section formula

If line segment by joining the points P(x_1,y_1) and Q(x_2,y_2) is divided by the R(x,y) in m:n ratio,then coordinates of R are given by

\boxed{\bold{\red{x =  \frac{mx_1 + nx_2}{m + n} }}} \\  \\ \boxed{\bold{\green{y =  \frac{my_1 + ny_2}{m + n}}}}  \\

Here,

Points are P(-1,7) and Q(4,-3) ,ratio is 2:3

apply the values in the formula

x =  \frac{2(4) + 3( - 1)}{2 + 3}  \\

x =  \frac{8 - 3}{5}  \\

x =  \frac{5}{5}  \\

\bold{\red{x = 1 }}\\

by the same way,find y

y =  \frac{3 (7)+ 2( - 3)}{3 + 2}  \\

y =  \frac{21 - 6}{5}  \\

y =  \frac{15}{5}  \\

\bold{\green{y = 3 }}\\

Coordinates of R are (1,3).

Option D is correct.

Final answer:

Coordinates of R are (1,3).

Option D is correct.

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