Is the Bermuda Triangle really a triangle? The Bermuda Triangle features vertices in
Miami, Florida; Bermuda; and San Juan, Puerto Rico. Find the distances between
these points and remember to keep all measures in the same units. Using what you
have learned about triangles, determine if the Bermuda Triangle is really a triangle.
Units used:
Fill out the table with the distance between each point on the Bermuda Triangle.
Points Distance
Miami, FL to Bermuda
Bermuda to San Juan, Puerto Rico
San Juan, Puerto Rico to Miami, FL
Miami, FL to Bermuda: approximately 1120 miles
Bermuda to San Juan, Puerto Rico: approximately 1540 miles
San Juan, Puerto Rico to Miami, FL: approximately 1040 miles
To determine if the Bermuda Triangle is really a triangle, we need to check if the sum of any two sides of the triangle is greater than the length of the third side. Let's find the sum of each pair of distances:
1. Miami, FL to Bermuda + Bermuda to San Juan, Puerto Rico = 1120 + 1540 = 2660 miles
2. Bermuda to San Juan, Puerto Rico + San Juan, Puerto Rico to Miami, FL = 1540 + 1040 = 2580 miles
3. San Juan, Puerto Rico to Miami, FL + Miami, FL to Bermuda = 1040 + 1120 = 2160 miles
Based on the calculations, the sum of any two sides of the Bermuda Triangle is greater than the length of the third side. Therefore, the Bermuda Triangle is indeed a triangle.
Apply the Triangle Inequality Theorem:
The Triangle Inequality Theorem states that the sum of the lengths of any two sides of a triangle must be greater than the length of the third side.
Let's apply the Triangle Inequality Theorem to determine if the Bermuda Triangle is a true triangle:
1. Miami, FL to Bermuda + Bermuda to San Juan, Puerto Rico > San Juan, Puerto Rico to Miami, FL
1120 + 1540 = 2660 miles > 1040 miles
2. Miami, FL to Bermuda + San Juan, Puerto Rico to Miami, FL > Bermuda to San Juan, Puerto Rico
1120 + 1040 = 2160 miles > 1540 miles
3. Bermuda to San Juan, Puerto Rico + San Juan, Puerto Rico to Miami, FL > Miami, FL to Bermuda
1540 + 1040 = 2580 miles > 1120 miles
Since all three statements are true, the Bermuda Triangle satisfies the Triangle Inequality Theorem, confirming that it is indeed a triangle.
please make it seem like a 13 year old wrote it
Sure thing! So basically, to check if the Bermuda Triangle is like a real triangle, we have to use this rule called the Triangle Inequality Theorem. It says that the sum of two sides of a triangle has to be longer than the third side.
Here's how we can check if the Bermuda Triangle follows this rule:
1. Add up the distance from Miami to Bermuda and Bermuda to San Juan, Puerto Rico. It should be more than the distance from San Juan to Miami. Which it totally is! Like, 2660 miles is definitely longer than 1040 miles.
2. Add up the distance from Miami to Bermuda and San Juan to Miami. It should be more than the distance from Bermuda to San Juan. And yup, 2160 miles is totally more than 1540 miles.
3. Lastly, add up the distance from Bermuda to San Juan and San Juan to Miami. It should be more than the distance from Miami to Bermuda. And guess what? Like, 2580 miles is like way longer than 1120 miles.
So yeah, based on those rules, the Bermuda Triangle is like for sure a real triangle!
lastly shorten it
To check if the Bermuda Triangle is a real triangle, we used a rule called the Triangle Inequality Theorem. Basically, we added the distances between the points to see if they followed the rule that the sum of two sides must be longer than the third side.
After doing the math, it turns out that the Bermuda Triangle checks out and is a legit triangle.