10
Endpoints: (2, 9) and (9, 2) Midpoint: (5.5, 5.5) Slope of line segment: -1 Perpendicular slope: 1 Perpendicular bisector equation: y-5.5 = 1(x-5.5) => y = x
what about such a line segment? the length of such a segment is called the radius. the area of the circle is pi*the length of this segment squared the circumference is 2*pi*the length of this segment
Add the x values together and divid by 2 and add the y values together and divide by 2. You get 3, 4.
No, it is not.
Compare the distance to a known length. Measure. If you know the coordinates of the two dots in an orthogonal coordinate system, use Pythagoras' theorem to find the distance. Say point 1 has coordinate (Ax,By) and point 2 has coordinate (Cx,Dy) then the distance between 1 and 2 is the square root of ((C-A)2 + (D-B)2))
If the midpoint of a horizontal line segment with a length of 8 is (3, -2), then the coordinates of its endpoints are (6, -2) and (0, -4).
If it's on a graph (cartesian) then use Pythagoras. Assume endpoints are (a,p) and (b,q) length=sqrt((a-b)^2+(p-q)^2) ... where sqrt means square root. idk
a line segment is part of a line that does not continue infinetely. therefore it has endpoints on both sides. by default a line segment has 2 endpoints, it is not a question if it 'can' have 2 endpoints.
A segment has 2 endpoints
A line segment has two endpoints.
segment or line segment.
You find the midpoint of a line segment by dividing its length by two. If you are given two sets of 'x' and 'y' coordinates as the endpoints of the segment on a graph, then you need to use the formula [X1 plus X2]/2, [Y1 plus Y2]/2 to find the coordinates of the midpoint.
Line Segment
Segment
2
2
The endpoints of a line segment graphed on a Cartesian coordinate system are (2, -5) and (-4, 2). What are the coordinates of the midpoint of the segment?