How do you find the exact value: $(tan 325° - tan 25°) / (1 + tan 325°(tan 25°))$ ?

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How do you find the exact value: $(tan 325° - tan 25°) / (1 + tan 325°(tan 25°))$ ?

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Answer 1 · 2016-08-26T03:36:04

$-sqrt3$

Explanation:

Note that this is the tangent angle subtraction formula in reverse:

$tan(a-b)=(tana-tanb)/(1+tanatanb)$

Thus:

$tan(325˚-25˚)=(tan325˚-tan25˚)/(1+tan325˚(tan25˚))=tan(300˚)$

Note that $300˚$ is in the fourth quadrant, where tangent is negative. $300˚$ also has a reference angle of $60˚$ , so we see that $tan(300˚)=-tan(60˚)=-sqrt3$ .

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How do you find the exact value: $(tan 325° - tan 25°) / (1 + tan 325°(tan 25°))$ ?

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

How do you find the exact value: (tan 325° - tan 25°) / (1 + tan 325°(tan 25°))(tan 325° - tan 25°) / (1 + tan 325°(tan 25°))?

1 Answer

Explanation:

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How do you find the exact value: $(tan 325° - tan 25°) / (1 + tan 325°(tan 25°))$ ?