EXPLORE
LATEST
ABOUT
AUTHORING AREA
PARTICIPATE
Your browser does not support JavaScript or it may be disabled!
Subscribe to RSS feed
Plane Geometry
«
PREVIOUS
|
1
...
13
|
14
|
15
|
16
|
17
|
18
|
19
...
74
|
NEXT
»
Demonstrations 301 - 320 of 1465
Constructing a Parabola from Tangent Circles
Moser Spindles, Golomb Graphs and Root 33
Elliptic Epitrochoid
Tomahawk Quinsector
23. Construct a Triangle Given Two Sides and the Inradius
22. Construct a Triangle Given the Hypotenuse and the Length of an Angle Bisector
Given a Segment, Construct Its Perpendicular Bisector; Given a Triangle, Construct Its Circumcircle
27b. Construct a Triangle Given Its Perimeter, an Angle and the Length of the Altitude to the Side Opposite the Angle
27a. Construct a Triangle Given a Side, the Length of the Altitude to It and the Opposite Angle
26c. Construct a Triangle Given the Length of Its Base, the Angle Opposite the Base and the Length of That Angle's Bisector
26b. Construct a Triangle Given the Length of Its Base, the Angle Opposite the Base and the Length of That Angle's Bisector
25. Construct a Triangle Given Its Base, the Difference of the Base Angles and the Length of One of Three Line Segments
24c. Construct a Triangle Given the Difference of Base Angles, Length of the Altitude from the Base and the Sum of the Lengths of the Other Two Sides
24b. Construct a Triangle Given the Length of the Altitude to the Base, the Difference of Base Angles and the Sum of the Lengths of the Other Sides
24a. Construct a Triangle Given the Length of the Altitude to the Base, the Difference of Base Angles and the Sum of the Lengths of the Other Sides
20. Construct a Triangle Given the Length of Its Base, the Difference of Its Base Angles and a Line Containing the Third Vertex
21. Construct a Triangle with Equal Base Angles That Are Each Double the Third Angle
19. Construct a Triangle Given the Length of Its Base, the Difference of Its Base Angles and a Special Point of Intersection
18. Construct a Triangle Given the Length of Its Base, the Difference of Angles at Its Base and the Point of Intersection of an Angle Bisector with Its Base
Vieta's Solution of a Cubic Equation
«
PREVIOUS
|
1
...
13
|
14
|
15
|
16
|
17
|
18
|
19
...
74
|
NEXT
»
Note: To run this Demonstration you need Mathematica 7+ or the free Mathematica Player 7EX
Download or upgrade to
Mathematica Player 7EX
I already have
Mathematica Player
or
Mathematica 7+