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The two lines are identical.
There are an infinity of points 4cm from a given line. These points form 2 lines parallel to and either side of the original line. Equally, there are an infinite number of points 4cm from a given point on the original line. These points lie on the circumference of a circle radius 4cm with its centre at the given point. There are only 2 points that fulfil both conditions. These points are found on the circumference of the circle where a diameter perpendicular to the original line and passing through the given point meets the circumference of the circle. These two points are also where the two parallel lines form tangents with the circle.
In any triangle that is not equilateral, the Euler line is the straight line passing through the orthocentre, circumcentre and centroid. In an equilateral triangle these three points are coincident and so do not define a line.Orthocentre = point of intersection of altitudes.Circumcentre = point of intersection of perpendicular bisector of the sides.Centroid = point of intersection of medians.Euler proved the collinearity of the above three. However, there are several other important points that also lie on these lines. Amongst them,Nine-point Centre = centre of the circle that passes through the bottoms of the altitudes, midpoints of the sides and the points half-way between the orthocentre and the vertices.
Two points can always be connected by one, and only one, straight line segment.In other words, two points always define a line.And since they defined it, they're both on it.
Lines intersect if the meet at one point. Perpendicular lines also meet at one point, but their intersection is a right angle. Intersecting lines in the plane do not meet at two points.
The two lines are indentical ...yt: 2ktay highlights
The two lines are identical.
Two points determine a line. Also there is one and only line perpendicular to given line through a given point on the line,. and There is one and only line parallel to given line through a given point not on the line.
Points:22.8 Steals:2.8 Rebounds:5.5 games played:80 Assists:11.6 Minutes:38.5 Feild goal percentage:.503 Blocks:.1 3 point percetage:.369 Free Throw percentage:.868 Games started:80
There are an infinity of points 4cm from a given line. These points form 2 lines parallel to and either side of the original line. Equally, there are an infinite number of points 4cm from a given point on the original line. These points lie on the circumference of a circle radius 4cm with its centre at the given point. There are only 2 points that fulfil both conditions. These points are found on the circumference of the circle where a diameter perpendicular to the original line and passing through the given point meets the circumference of the circle. These two points are also where the two parallel lines form tangents with the circle.
A plane. A circle can also pass through three non-co-linear points.
Nope! Basketball uses a point system with each basket earning that player or team 2 points. If it makes it in while the player is outside of the 3-point line, they earn 3 points! :)
Typically, a team receives 7 points from scoring a touchdown (6 points), and then kicking the foot ball through the posts for an extra point. It is also possible through other means such as a field goal (3 points) and two 2-point safeties, or a touchdown and a 1-point offensive safety.
When you score a touchdown in American football, Six points are awarded. You then have the choice to either kick the ball ball through the goalposts for one extra point, or run another play for two extra points.
6 and 1 point for kicking it through the goal post or 2 points extra for running a normal ofence play
In any triangle that is not equilateral, the Euler line is the straight line passing through the orthocentre, circumcentre and centroid. In an equilateral triangle these three points are coincident and so do not define a line.Orthocentre = point of intersection of altitudes.Circumcentre = point of intersection of perpendicular bisector of the sides.Centroid = point of intersection of medians.Euler proved the collinearity of the above three. However, there are several other important points that also lie on these lines. Amongst them,Nine-point Centre = centre of the circle that passes through the bottoms of the altitudes, midpoints of the sides and the points half-way between the orthocentre and the vertices.
If three points all lie on the same line, then the points are said to be "collinear". This is also true if the slope from each point to the next is the same.