Respuesta :
Here, the statement is true, the altitude and median can exist exactly in an equilateral triangle.
What is an equilateral triangle?
Yes, the altitude and median can exist exactly in a triangle. for instance, consider an equilateral triangle, the median which divides the side in similar exists also perpendicular to the side and hence the altitude and the median exists the exact.
In the case of an equilateral triangle, all the measurements drawn exist median as well and vice versa.
In the case of an isosceles triangle, the altitude is drawn from the vertex (where the equivalent sides meet) to the unequal side exists the median.
The altitude and median are not exact in a triangle. An altitude exists as a perpendicular bisector on any side of a triangle and it estimates the distance between the vertex and the line which exists on the opposite side whereas, a median exists as a line segment that connects a vertex to the central point of the opposite side.
To learn more about an equilateral triangle
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