How do you calculate $tan (arccos (- \frac{9}{10}))$ $tan(arccos(-9/10))$ ?

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How do you calculate $tan (arccos (- \frac{9}{10}))$ $tan(arccos(-9/10))$ ?

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Answer 1 · 2015-05-01T12:16:39

In this way.

We have to calculate $tan α$ $tanalpha$ , where alpha is:

$α = arccos (- \frac{9}{10})$ $alpha=arccos(-9/10)$ .

Since the range of the function $y = arccos x$ $y=arccosx$ is $[0, π]$ $[0,pi]$ and the value negative $- \frac{9}{10}$ $-9/10$ , the angle is in the second quadrant, in which the sinus is positive. So:

$cos α = - \frac{9}{10}$ $cosalpha=-9/10$ ,

$sin α = + \sqrt{1 - {cos}^{2} α} = + \sqrt{1 - \frac{81}{100}} = \frac{\sqrt{19}}{10}$ $sinalpha=+sqrt(1-cos^2alpha)=+sqrt(1-81/100)=sqrt19/10$ .

Than:

$tan α = \frac{sin α}{cos α} = \frac{\frac{\sqrt{19}}{10}}{- \frac{9}{10}} = - \frac{\sqrt{19}}{10} \cdot \frac{10}{9} =$ $tanalpha=sinalpha/cosalpha=(sqrt19/10)/(-9/10)=-sqrt19/10*10/9=$

$= - \frac{\sqrt{19}}{9}$ $=-sqrt19/9$ .

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How do you calculate $tan (arccos (- \frac{9}{10}))$ $tan(arccos(-9/10))$ ?

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