Solution: This is a multiset permutation problem with 7 drones: 3 identical multispectral (M), 2 thermal (T), and 2 LiDAR (L). The number of distinct sequences is: - RoadRUNNER Motorcycle Touring & Travel Magazine

Solution to the Multiset Permutation Problem: Arranging 7 Drones with Repeated Types

In combinatorics, permutations of objects where some items are identical pose an important challenge—especially in real-world scenarios like drone fleet scheduling, delivery routing, or surveillance operations. This article solves a specific multiset permutation problem featuring 7 drones: 3 multispectral (M), 2 thermal (T), and 2 LiDAR (L) units. Understanding how to calculate the number of distinct sequences unlocks deeper insights into planning efficient drone deployment sequences.

Understanding the Context

Problem Statement

We are tasked with determining the number of distinct ways to arrange a multiset of 7 drones composed of:
- 3 identical multispectral drones (M),
- 2 identical thermal drones (T),
- 2 identical LiDAR drones (L).

We seek the exact formula and step-by-step solution to compute the number of unique permutations.

DJI Mavic 3M (Multispectral) - Sky Drones Inc.

Image Gallery

Mavic 3 Multispectral - Kara Company, Inc.

Mavic 3 Multispectral Camera - Maverick Drones & Technologies

Key Insights

Understanding Multiset Permutations

When all items in a set are distinct, the number of permutations is simply \( n! \) (factorial of total items). However, when duplicates exist (like identical drones), repeated permutations occur, reducing the count.

The general formula for permutations of a multiset is:

\[
\frac{n!}{n_1! \ imes n_2! \ imes \cdots \ imes n_k!}
\]

where:
- \( n \) is the total number of items,
- \( n_1, n_2, \ldots, n_k \) are the counts of each distinct type.

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Final Thoughts

Applying the Formula to Our Problem

From the data:

Total drones, \( n = 3 + 2 + 2 = 7 \)
- Multispectral drones (M): count = 3
- Thermal drones (T): count = 2
- LiDAR drones (L): count = 2

Plug into the formula:

\[
\ ext{Number of distinct sequences} = \frac{7!}{3! \ imes 2! \ imes 2!}
\]

Step-by-step Calculation

Compute \( 7! \):
\( 7! = 7 \ imes 6 \ imes 5 \ imes 4 \ imes 3 \ imes 2 \ imes 1 = 5040 \)
Compute factorials of identical items:
\( 3! = 6 \)
\( 2! = 2 \) (for both T and L)