| 1 |
The centro id of a triangle divides each one of the medians in the ratio: |
- A. 1:1
- B. 1:2
- C. 2:1
- D. 2:2
|
| 2 |
A line segment that bisects and angles of the triangle and has its other end on the side opposite to that angle is called: |
- A. altitude of the triangle
- B. incenter of the triangle
- C. angle bisector if the triangle
- D. median of the triangle
|
| 3 |
A line segment joining a vertex to the midpoint of the side opposite to the vertex is called: |
- A. altitude to the triangle
- B. side bisector of the triangle
- C. angle bisector if the triangle
- D. median to the triangle
|
| 4 |
The number of angle bisectors of a triangle is: |
|
| 5 |
The point of intersection of the perpendicular bisectors of he sides of a triangle meet is called |
- A. circum-center of the triangle
- B. incenter of he triangle
- C. centroid of the triangle
- D. orthocenter of the triangle
|
| 6 |
All the altitudes are equal of an: |
- A. rectangle
- B. scalene triangle
- C. isosceles triangle
- D. equilateral triangle
|
| 7 |
Median to the equal sides of an isosceles triangle are: |
- A. congruent
- B. equal
- C. similar
- D. unequal
|
| 8 |
The point at which the three angle-bisector of a triangle meet is called: |
- A. circum-cneter of the triangle
- B. incenter of the triangle
- C. centroid of the triangle
- D. orthocenter of the triangle
|
| 9 |
If the centers of two circles lie in either side of the common tangent then it is called: |
- A. external tangent
- B. internal tangent
- C. concyclic tangent
- D. concentric tangent
|
| 10 |
The midpoint of the diameter of a circle is called: |
- A. radius
- B. chord
- C. center
- D. tangent
|
