How do you evaluate ${tan}^{- 1} (- \sqrt{3})$ $tan^-1 (-sqrt3)$ without a calculator?

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How do you evaluate ${tan}^{- 1} (- \sqrt{3})$ $tan^-1 (-sqrt3)$ without a calculator?

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Answer 1 · 2018-05-22T04:53:08

$x = \frac{2 π}{3} + k π$ $x = (2pi)/3 + kpi$

Explanation:

$tan x = - \sqrt{3}$ $tan x = - sqrt3$ . Find arc x.
Trig table and unit circle give:
$x = \frac{2 π}{3} + k π$ $x = (2pi)/3 + kpi$

Answer 2 · 2018-05-24T12:26:24

$arctan(-sqrt{3}) = 120^circ + 180^circ k quad$ integer $k$

The principal value is $-60^circ$

Explanation:

Students are only expected to know two triangles, 30/60/90, and 45/45/90, and be able to figure them out in all four quadrants.

It's a goofy way to structure an entire course, but once you understand it problems become easier.

Rule of thumb, $sqrt{3}$ means 30/60/90 and $sqrt{2}$ means 45/45/90.

We know 30 and 60 degrees have sine and cosine $1/2$ and $sqrt{3}/2.$

Tangent is slope, sine over cosine, so we have a sine of $-sqrt{3}/2$ and a cosine of $1/2$ or a sine of $sqrt{3}/2$ and a cosine of $-1/2$ . So fourth or second quadrant. When the sine is bigger, that's $60^circ,$ so we're looking at $-60^circ$ and $120^circ.$

The principal value is in the fourth quadrant, $-60^circ$ . I prefer to treat $arctan$ as the multivalued inverse,

$arctan(-sqrt{3}) = 120^circ + 180^circ k quad$ integer $k$

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How do you evaluate ${tan}^{- 1} (- \sqrt{3})$ $tan^-1 (-sqrt3)$ without a calculator?

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Explanation:

Explanation:

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How do you evaluate ${tan}^{- 1} (- \sqrt{3})$ $tan^-1 (-sqrt3)$ without a calculator?