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Triangle Q T S is shown. Angle A T S is a right angle. An altitude is drawn from point T to point R on side Q S to form a right angle. The length of T S is 3 x, the length of Q R is 6, and the length of R S is 12.
What is the length of side TS?

2 StartRoot 6 EndRoot units
6 StartRoot 6 EndRoot units
24 units
8 units

Answer :

Answer:

6sqrt6 = 14.69    sqrt14,69 = 3.83

closest divider to 4.12 as <4.5 TS <3.5

Step-by-step explanation:

RS can be formed as a square so that = 12 can be used for other sides of that square to find the diagonal

Where diagonal square = TS side

12^2 x 12^2 = sqrt 144 + sq rt 144 =  TS^2  

TS^2 = sq rt 288 = 16.9705627 = 17

We then look at the choice answers  1, 2, 3, 4

sq rt 16.97 = 4.12310563  sq rt 17 = 4.11 where

2 sqrt 6 = 4.898989 so is incorrect.

AA010002GO

Answer:

B. 6[tex]\sqrt{6}[/tex]

Step-by-step explanation:

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