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In the diagram, point D divides line segment AB in the ratio of 5:3. If line segment AC is vertical and line segment CD is horizontal, what are the coordinates of point C?



A.
(2, -3)
B.
(5, -3)
C.
(7, -1)
D.
(2, -1)

In the diagram point D divides line segment AB in the ratio of 53 If line segment AC is vertical and line segment CD is horizontal what are the coordinates of p class=

Respuesta :

frika

Answer:

D

Step-by-step explanation:

First, find the coordinates of pointD if A(2,-6), B(10,2) and point D divides line segment AB in the ratio of 5:3.

If point D divides the segment AB in the ratio m:n, then

[tex]D\left(\dfrac{nx_A+mx_B}{m+n},\dfrac{ny_A+my_B}{m+n}\right)[/tex]

So

[tex]D\left(\dfrac{3\cdot 2+5\cdot 10}{5+3},\dfrac{3\cdot (-6)+5\cdot 2B}{5+3}\right)=D(7,-1)[/tex]

Point C has the x-coordinate the same as point A and the y-coordinate the same as point D.

Thus, C(2,-1)

david8644

Answer:

D.(2, -1)

Step-by-step explanation:

As you can see you only need to calculate the Y of the point C since the X can be reasoned out from the fact that it is a vertical line that goes up from point A which is located on (2,-6), so point C will be in x=2 as well, now we jsut have to calculate where is located on the Y point D, since point C and D are horizontally placed on the same line, they will share value for Y.

If AB= (2-(-6) = (2+6)=8, and AB is divided by point D in a ratio of 5:3, this means that from A to D on the Y vector there are 5 units of difference so you just add them up: -6+5=-1, and you´ve found the Y.

So the point C is located in (2,-1).

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