Difference between revisions of "Construction"

(hm)
 
Line 1: Line 1:
 
'''Constructions''' with straight edge and compass (i.e. the ability to mark off segments, draw circles and arcs, and draw straight lines) are a branch of [[geometry]] that rely on the use of basic geometrical [[axiom]]s to create various figures in the [[Euclid]]ean plane.
 
'''Constructions''' with straight edge and compass (i.e. the ability to mark off segments, draw circles and arcs, and draw straight lines) are a branch of [[geometry]] that rely on the use of basic geometrical [[axiom]]s to create various figures in the [[Euclid]]ean plane.
  
{{stub}}
+
A '''compass''' is a tool that can draw circles and arcs of circles.
 +
 
 +
A '''straightedge''' is an unmarked ruler that can draw line segments.
 +
 
 +
No other tools are allowed in a construction. However, the two basic tools alone can allow one to:
 +
 
 +
1. Duplicate a line segment.
 +
2. Copy an angle.
 +
3. Construct an angle bisector.
 +
4. Construct a perpendicular bisector.
 +
5. Construct a perpendicular from a point to a line.
 +
6. Construct a triangle with side lengths a, b, and c.
 +
7. Partition a line segment into <math>n</math> different parts.
 +
8. Construct length <math>ab</math> given lengths <math>a</math> and <math>b</math>.
 +
9. Construct <math>a/b</math> and <math>\sqrt{ab}</math>.
 +
10. Construct a tangent to a circle.
 +
11. Construct a common tangents to two circles.
 +
12. Construct a parallelogram with side lengths a and b.
 +
 
 +
These basic constructions should be easy to accomplish.
 +
Now, try these:
 +
 
 +
13. Construct a line passing through a point <math>P</math> parallel to line <math>l</math>.
 +
14. Construct a square circumscribed on a circle.
 +
15. Construct a regular hexagon inside a given circle.
 +
16. Construct the [[Inversion|inverse]] of a point P with respect to circle C.
 +
17. Construct a square, all of whose vertices are on a given triangle.
 +
18. Construct a regular pentagon.
 +
19. Construct the [[radical axis]] of two circles.
 +
20. Given two chords of a circle intersecting in the interior of the circle, construct another circle tangent to the chords and internally tangent to the original circle.
 +
 
 +
Good luck!
  
 
[[Category:Definition]]
 
[[Category:Definition]]
 
[[Category:Geometry]]
 
[[Category:Geometry]]

Revision as of 12:32, 15 June 2014

Constructions with straight edge and compass (i.e. the ability to mark off segments, draw circles and arcs, and draw straight lines) are a branch of geometry that rely on the use of basic geometrical axioms to create various figures in the Euclidean plane.

A compass is a tool that can draw circles and arcs of circles.

A straightedge is an unmarked ruler that can draw line segments.

No other tools are allowed in a construction. However, the two basic tools alone can allow one to:

1. Duplicate a line segment. 2. Copy an angle. 3. Construct an angle bisector. 4. Construct a perpendicular bisector. 5. Construct a perpendicular from a point to a line. 6. Construct a triangle with side lengths a, b, and c. 7. Partition a line segment into $n$ different parts. 8. Construct length $ab$ given lengths $a$ and $b$. 9. Construct $a/b$ and $\sqrt{ab}$. 10. Construct a tangent to a circle. 11. Construct a common tangents to two circles. 12. Construct a parallelogram with side lengths a and b.

These basic constructions should be easy to accomplish. Now, try these:

13. Construct a line passing through a point $P$ parallel to line $l$. 14. Construct a square circumscribed on a circle. 15. Construct a regular hexagon inside a given circle. 16. Construct the inverse of a point P with respect to circle C. 17. Construct a square, all of whose vertices are on a given triangle. 18. Construct a regular pentagon. 19. Construct the radical axis of two circles. 20. Given two chords of a circle intersecting in the interior of the circle, construct another circle tangent to the chords and internally tangent to the original circle.

Good luck!