Geometryeasy · Past Paper
The midpoint of the segment joining (2a, 0) and (0, 2b) is:
A(a, b)
B(2a, 2b)
C(a/2, b/2)
D(0, 0)
✓ Correct Answer: A — (a, b)
((2a+0)/2, (0+2b)/2) = (a, b).
Share this question
More from Geometry
- In a triangle ABC, if 2*angle A = 3*angle B = 6*angle C, find angle A.
- The point where the three medians of a triangle intersect is called the:
- If two parallel lines are cut by a transversal, the corresponding angles are:
- The equation of a line passing through the origin with slope m is:
- The angle between a tangent and its chord is 50 degrees. What is the angle in the alternate segment?