Mathematics
Grade9
Easy
Question
Find the tangent ratio for Angle A.
![](data:image/png;base64,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)
![BC over AC](data:image/png;base64,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)
![AB over BC](data:image/png;base64,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)
![AC over BC](data:image/png;base64,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)
- BC
Hint:
tan x = opposite side /adjacent side
The correct answer is: ![BC over AC](data:image/png;base64,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)
tan x = opposite side /adjacent side
tangent ratio for Angle A =![BC over AC](data:image/png;base64,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)
sin x = opposite side / hypotenuse side
cos x = adjacent side / hypotenuse side
tan x = sin x / cos x