Mathematics
Grade9
Easy
Question
Find x.
![](data:image/png;base64,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)
- 20
- 5.9
- 33
- 42
Hint:
tan x = opposite side / adjacent side
The correct answer is: 33
tan x = opposite side / adjacent side
tan 67 = X / 14
tan 67 = 2.355
X = 2.355 x 14
X = 32.9
X = 33(approx)
sin x = opposite side / hypotenuse side
cos x = adjacent side / hypotenuse side
tan x = sin x / cos x