- Tracing the medians and finding the intersection between them. - Tracing a median and finding the point that divides it in two lengths of ratio 2:1 between each other. - Using the formula that averages the x and y coordinates of each vertex of the triangle.What...
Step 1: Understand the triangle and its properties- We have triangle ABC with sides AB = 15 cm, BC = 18 cm, and AC = 25 cm.- D is the midpoint of BC, so BD = DC = 9 cm. Hint: Remember that the centroid divides each median in a 2:1 ratio. Step 2: Calculate the lengths...
A centroid divides the median from vertex to the midpoint of the opposite sides in the length ratio of 2:1 Answer and Explanation: Given triangle ABC, and centroid D is on the median line segment AM. Also, AD = x+4 and DM = 2x-4 Clearly, {eq...
The centroid is a point in the triangle that represents the intersection of the three medians. One of the centroid's properties is that it divides each median by the ratio of 2:1, which means that the longer side of the median is {eq}\dfrac{2}{3} {/eq...