Примери за използване на Circumcircle на Английски и техните преводи на Български
{-}
-
Colloquial
-
Official
-
Medicine
-
Ecclesiastic
-
Ecclesiastic
-
Computer
Let be a diameter of the circumcircle.
Is on circumcircle of that is diameter.
Extend to intersect the circumcircle of at.
The circumcircle of triangle meets at(apart from).
Extend to intersect the circumcircle of at.
Хората също превеждат
The circumcircle of triangle is tangent to segment at.
Furthermore let a point on the circumcircle of the triangle.
Point lies on the circumcircle of triangle and is the midpoint of the arc not containing.
Let be a triangle, and the center of its circumcircle.
With center, the circumcircle of the triangle and.
(c) Show that the power of wrt the circumcircle of is.
Let meet the circumcircle of triangle at point.
Prove that if andonly if lies on the circumcircle of triangle. 2.
The line meets the circumcircle of triangle at a point(apart from).
Prove that the lines and intersect on the circumcircle of the triangle.
Prove that the circumcircle of the triangle is tangent to the circumcircle of. 8.
Prove that midpoint of,point and center of circumcircle are collinear. 3.
Let the circumcircle of triangle meet the line at a point(apart from), and let the circumcircle of triangle meet the line at a point(apart from).
Let be the center of the circumcircle of the quadrilateral.
Let be a point on the small arc of the triangle's circumcircle.
A smaller arc of a circumcircle of in a point.
France Team Selection Test 2006 1 Let be a square and let be the circumcircle of.
The points and on the circumcircle of an acute triangle are such that.
Vietnam Team Selection Tests 2005 1 Let be the incircle,and, respectiely, circumcircle of.
The internal bisector of the angle meets the circumcircle of the triangle again at the point.
Let be a triangle with orthocenter, incenter and centroid, andlet be the diameter of the circumcircle of triangle.
Is a triangle, the bisector of angle meets the circumcircle of triangle in, points and are defined similarly.
Two right angled triangles are given,such that the incircle of the first one is equal to the circumcircle of the second one.
Let be the foot of the altitude from and the circumcircle of the triangle.
Let be an acute triangle with, andbeing its incircle, circumcircle, and circumradius, respectively.