Answer:
[tex]24[/tex] [tex]\text{cm}[/tex]
Step-by-step explanation:
Given: The distance from the centroid of a triangle to its vertices are [tex]16\text{cm}[/tex], [tex]17\text{cm}[/tex], and [tex]18\text{cm}[/tex].
To Find: Length of shortest median.
Solution:
Consider the figure attached
A centroid is an intersection point of medians of a triangle.
Also,
A centroid divides a median in a ratio of 2:1.
Let G be the centroid, and vertices are A,B and C.
length of [tex]\text{AG}[/tex] [tex]=16\text{cm}[/tex]
length of [tex]\text{BG}[/tex] [tex]=17\text{cm}[/tex]
length of [tex]\text{CG}[/tex] [tex]=18\text{cm}[/tex]
as centrod divides median in ratio of [tex]2:1[/tex]
length of [tex]\text{AD}[/tex] [tex]=\frac{3}{2}\text{AG}[/tex]
[tex]=\frac{3}{2}\times16[/tex]
[tex]=24\text{cm}[/tex]
length of [tex]\text{BE}[/tex] [tex]=\frac{3}{2}\text{BG}[/tex]
[tex]=\frac{3}{2}\times17[/tex]
[tex]=\frac{51}{2}\text{cm}[/tex]
length of [tex]\text{CF}[/tex] [tex]=\frac{3}{2}\text{CG}[/tex]
[tex]=\frac{3}{2}\times18[/tex]
[tex]=27\text{cm}[/tex]
Hence the shortest median is [tex]\text{AD}[/tex] of length [tex]24\text{cm}[/tex]
