A(3,4),B(5,8),C(7,8) are the vertices of ABC, prove that the line passing through the mid point of AB and AC is parallel to BC

Question

asked Jun 8, 2021 114k views

1 Answer

← Prev Question Next Question →

Ask a Question

Ethan Hermsey · Answer 1 · 2021-06-15T01:31:55+0000

Step-by-step explanation:

$The \ midpoint \ formula \ of \ the \ line \ segment \\ that \ joins \ the \ two \ points \ (x_(1),y_(1)) \ and \ (x_(2),y_(2)) \ is \\ given \ by \ the \ following \ Midpoint \ Formula:\\ \\ Midpoint=((x_(1)+x_(2))/(2),(y_(1)+y_(2))/(2))$

Let's name the mid point of
as

Let's name the mid point of
as

Then:

$c=((3+5)/(2),(4+8)/(2)) \\ \\ c=((8)/(2),(12)/(2)) \\ \\ c=(4,6) \\ \\ \\ p=((3+7)/(2),(4+8)/(2)) \\ \\ p=((10)/(2),(12)/(2)) \\ \\ p=(5,6)$

So the slope of the line that passes through
$c \ and \ p$ is:

$m=(y_(2)-y_(1))/(x_(2)-x_(1)) \\ \\ m_(cp)=(6-6)/(5-4)=0$

And the slope for BC is:

m_(BC)=(8-8)/(7-5)=0

As you can see, both slopes are zero, so these are horizontal lines.

A(3,4),B(5,8),C(7,8) are the vertices of ABC, prove that the line passing through the mid point of AB and AC is parallel to BC

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

Step-by-step explanation:

Please log in or register to add a comment.

No related questions found

Other Questions

A(3,4),B(5,8),C(7,8) are the vertices of ABC, prove that the line passing through the mid point of AB and AC is parallel to BC ​

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

Step-by-step explanation:

Please log in or register to add a comment.

No related questions found

Other Questions

A(3,4),B(5,8),C(7,8) are the vertices of ABC, prove that the line passing through the mid point of AB and AC is parallel to BC