"Circumcentersfor" Example Sentences
1. The circumcenters for the triangle were accurately calculated.
2. We learned how to find the circumcenters for different polygons in math class.
3. The circumcenters for the quadrilateral were located at the intersection of perpendicular bisectors.
4. The circumcenters for each triangle in the figure were marked with a red dot.
5. The student used a compass to find the circumcenters for the hexagon.
6. The circumcenters for the circle were determined by finding the midpoint of the chord.
7. The circumcenters for the tangential quadrilateral were found at the intersection of diagonal extensions.
8. The circumcenters for the pentagon were located using the perpendicular bisector of each side.
9. The circumcenters for the obtuse triangle were not as easy to locate compared to an acute triangle.
10. The circumcenters for the isosceles triangle are equidistant from each vertex.
11. The circumcenters for the triangle were plotted on the coordinate plane.
12. The circumcenters for the complex polygon required a bit more calculation.
13. The circumcenters for a right-angled triangle lie on the midpoint of the hypothenuse.
14. The circumcenters for the equilateral triangle are the same as the centroid and orthocenter.
15. The circumcenters for a triangle inscribed in a circle is the center of the circle.
16. The circumcenters for the scalene triangle were the most challenging to locate.
17. The circumcenters for the parallelogram lie on the midpoint of each side.
18. The circumcenters for a trapezoid can be found using the extensions of the parallel sides.
19. The circumcenters for a regular polygon are equidistant from each vertex.
20. The circumcenters for a cyclic quadrilateral are the same as the center of the circle inscribed within it.
21. The circumcenters for the five-pointed star are located at the intersection of diagonal extensions.
22. The circumcenters for the kite-shaped quadrilateral are the same as the midpoint of the longer diagonal.
23. The circumcenters for the irregular polygon were located manually.
24. The circumcenters for the rhombus are found at the intersection of perpendicular bisectors.
25. The circumcenters for the concave polygon were located outside the shape.
26. The circumcenters for the convex polygon were located inside the shape.
27. The circumcenters for the hexagon were equidistant from each of its six vertices.
28. The circumcenters for the trapezium were located using the median of the parallel sides.
29. The circumcenters for the heptagon were found using the perpendicular bisector of each side.
30. The circumcenters for the octagon were located using the midpoint of each side.
Common Phases
1. Finding the circumcenters for a triangle;
2. Using circumcenters for triangulation;
3. Determining circumcenters for regular polygons;
4. Applying circumcenters for angle bisectors;
5. Evaluating circumcenters for circumcircles;
6. Calculating circumcenters for equilateral triangles;
7. Solving problems using circumcenters for perpendicular bisectors;
8. Working with circumcenters for isosceles triangles;
9. Exploring circumcenters for convex polygons;
10. Using circumcenters for geometric constructions.