Respuesta :
If [tex] J(x_1,y_1) [/tex] and [tex] K(x_2,y_2) [/tex] are two points, then [tex] P(\frac{nx_1+mx_2}{m+n},\frac{ny_1+my_2}{m+n}) [/tex] partitions JK in the ratio, [tex] m:n [/tex].
The y-coordinate of P is
[tex] y=\frac{ny_1+my_2}{m+n}=\frac{7*1+3*5}{3+7}=\frac{11}{5} [/tex]
Answer:
2.2
Step-by-step explanation:
We have been given that point J(-2,1) and point K(4,5) form line segment JK. The point P partitions JK in the ratio 3:7.
To find the y-coordinate of point P we will use section formula, when a point A divides a segment JK internally in the ratio m:n.
[tex][x=\frac{mx_2+nx_1}{m+n},y=\frac{my_2+ny_1}{m+n}][/tex]
Upon substituting our given values in above formula we will get,
[tex][x=\frac{3*4+7*-2}{3+7},y=\frac{3*5+7*1}{3+7}][/tex]
[tex][x=\frac{12-14}{10},y=\frac{15+7}{10}][/tex]
[tex][x=\frac{-2}{10},y=\frac{22}{10}][/tex]
[tex][x=-0.2,y=2.2][/tex]
Therefore, the y-coordinate of point P is 2.2.
