Ask a New Question
Menu

Triangle ABC, AB=8, BC=10, and AC=12, M is the midpoint of AB, and N is the midpoint of BC. What is the length of MN?

3 answers

Triangle ABC is similar to triangle MBN. Therefore, the corresponding sides are proportional:

MN/AC = BM/AB,
MN/12 = 4/8,
Cross multiply:
8MN = 48,
MN = 6.
By mid point theorem, mn would equal half ac and would be parallel to ac. Thus mn equals 6. The lengths of ab and bc are not required to answer this question. It can be solved by similarity or basic proportionality theorem also.
Thanks monkeys
Similar Questions
  1. Triangle DiagramIn triangle upper R upper S upper T, U is the midpoint of modifying above upper R upper S with bar, V is the
    1. answers icon 0 answers
  2. Triangle DiagramIn triangle upper R upper S upper T, U is the midpoint of modifying above upper R upper S with bar, V is the
    1. answers icon 1 answer
  3. Triangle DiagramIn triangle upper R upper S upper T, U is the midpoint of modifying above upper R upper S with bar, V is the
    1. answers icon 1 answer
  4. Triangle DiagramIn triangle upper R upper S upper T, U is the midpoint of modifying above upper R upper S with bar, V is the
    1. answers icon 1 answer
more similar questions