1st find the midpoint -- (4, 1/2)
Now slope -- 1/2 divided by 4 = 1/8
y-intercept = 0 (origin)
y = (1/8)x <--- answer
It is (3.5, -2.5)
85
For triangle ABC, find the midpoint of side BC. Then, find the slope of side BC and use its negative reciprocal (since the negative reciprocal slope is the slope of the right bisector joining side BC and the opposite vertex). Finally, substitute the midpoint and negative reciprocal slope into the y=mx+b equation to get "b", then write the equation. :)
Mid Point Definition: The point halfway between the endpoints of a line segment is called the midpoint. A midpoint divides a line segment into two equal parts. Mid Point Formula: MidPoint where (x1, y1) (x2, y2) be the end points of a line segment. MidPoint Diagram Mid Point Example: Find the coordinates of the midpoint of the line joining (-1, -3), (-5, -7). x1 = -1, y1 = -3 and x2 = -5, y2 = -7 Substitute in the formula as : The above example will clearly illustrates how to calculate the Coordinates of MidPoint manually.
Joining straight line of any two alternate vertices.
It will have no y intercept and it is: y = 0.125x
It is the midpoint of the straight line joining E and A.
A triangle is not a segment joining a vertex and the midpoint of the side opposite the vertex.
The midpoint is (2,3)
Points: (13, 17) and (19, 23) Midpoint: (16, 20) Slope of required equation: 5/4 Its equation: 4y = 5x or as y = 1.25x Its distance from (0, 0) to (16, 20) = 4 times sq rt 41
it depends on how long or how many joining segments it has. normally one line segment contains only one midpoint. Unless it has a joining segment there is only one midpoint.
Length = 13 units Midpoint = (0, 3.5)
It is in its general form: 2x+7y-14 = 0
It is (3.5, -2.5)
85
For triangle ABC, find the midpoint of side BC. Then, find the slope of side BC and use its negative reciprocal (since the negative reciprocal slope is the slope of the right bisector joining side BC and the opposite vertex). Finally, substitute the midpoint and negative reciprocal slope into the y=mx+b equation to get "b", then write the equation. :)
In geometry, a median of a triangle is a line segment joining a vertex to the midpoint of the opposing side.