2 Answers

Nasmorn · Answer 1 · 2019-02-04T10:43:34+0000

$tangent=(opposite)/(adjacent)\\\\\tan60^o=(y)/(8)\ \ \ |\tan60^o=\sqrt3\\\\(y)/(8)=\sqrt3\ \ \ \ |\cdot8\\\\\boxed{y=8\sqrt3}\to\boxed{y\approx13.9}$

Other method.

Two such triangles form an equilateral triangle (look at the picture).

The formula of a height of an equilateral triangle:

$h=(a\sqrt3)/(2)$

We have

$a=2\cdot8=16;\ h=y$

Substitute:

$y=(16\sqrt3)/(2)=8\sqrt3\approx13.9$

Terese · Answer 2 · 2019-02-06T15:03:19+0000

Note that this is a 30-60-90 triangle, in which 8 is in the one's place, and y is in the √3 place (1, √3 , 2)

Multiply

8 x √3 = 8√3 = 13.85, or 13.9 (rounded)

B) 13.9 is your answer

hope this helps

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