.
. centre de ressources dilemmes et doutes le visage humain de mathématiques Qui sommes-nous Problème de mois activités de promotion babillard
Centrale des maths - centraledesmaths.uregina.ca
Dilemmes & doutes
« D & D »
. .
topic card  

Sujet:

circle geometry

liste de
sujets
. .
nouvelle recherche

5 articles trouvés pour ce sujet.
 
Page
1/1
Two circles 2011-12-04
Luke pose la question :
Two fixed circles intersect at A and B.
P is a variable point on one circle.
PA and PB when produced meet the other circle at M and N respectively.
Prove that MN is of constant length.
Thanks!
p.s. I also sent the question with a figure via email.

Chris Fisher lui répond.
Circle Geometry 2007-08-14
Robin pose la question :
In a triangle ABC, angle A=75 and B=60. A circle circumscribes the triangle. The tangents of the at points A and B meet in a point D outside the circle. Show that ABD is an isosceles triangle with a right angle at D. Diagram included.
Stephen La Rocque lui répond.
Circle Geometry III 2007-07-17
Sean pose la question :
Two rays are drawn from the same point A outside a circle, and intersect the circle as shown in the picture. Prove that the measure of angle A is one-half the difference between the measures of arcs BD and CE.
Stephen La Rocque lui répond.
Circle Geometry II 2007-07-17
Sean pose la question :
Let M be a point outside a circle, and let a line through M be tangent to the circle at point P. Let the line through M and the center of the circle intersect the circle in points Q, R.
Prove that │PM│2 = │MQ│ x │MR│

Stephen La Rocque lui répond.
Circle Geometry - Quadrilateral circumscribing a circle 2007-07-17
Sean pose la question :
Four lines are tangent to a circle that form a quadrilateral. It appears that the quadrilateral is a trapeziod but this is not a given. Prove that the combined lengths of two opposing sides of the quadrilateral are equal to the combined lengths of the other two opposing sides of the quadrilateral.
Stephen La Rocque lui répond.
 
Page
1/1

 

 


Centrale des maths reçoit une aide financière de l’Université de Regina et de The Pacific Institute for the Mathematical Sciences.

CMS
.

 

accueil centre de ressources accueil Société mathématique du Canada l'Université de Regina PIMS