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Let def be an equilateral triangle with side length 3 At random, a point g is chosen inside the triangle. Compute the probability that the length dg is less than or equal to 1

 

 

also

 

A stick has a length of 5 units. The stick is then broken at two points, chosen at random. What is the probability that all three resulting pieces are shorter than 3 units?

 

 

and

 

 

Right triangle XYZ has legs of length XY = 12 and YZ  6. Point D is chosen at random within the triangle XYZ. What is the probability that the area of triangle XYD is at most 12?

 

HELP!!!!!!!

 Apr 13, 2022
edited by Guest  Apr 13, 2022
 #1
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+1

This question has been answered by Alan before:

 

Check it out, it is a great explanation in my opinion:

 

https://web2.0calc.com/questions/let-triangle-abc-be-equilateral-where-the-side-length

 Apr 13, 2022
 #2
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that was wrong...

Guest Apr 13, 2022
 #3
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thats wrong....

Guest Apr 13, 2022
 #4
avatar+65 
-1

 i got u let me se if i can solve this

 Apr 13, 2022

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