How do you simplify $sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]$ ?

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How do you simplify $sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]$ ?

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Answer 1 · 2016-05-26T17:28:01

$=+-0.7 sqrt 2 and +-1/sqrt 2=+-0.98995 and +-0.70711$ , nearly.

Explanation:

Let $a = cos^(-1)(-sqrt 5/5)$ . Then $cos a = -sqrt 5/5=-1/sqrt 5<0$ . so, a is in the 2nd quadrant or in the 4th. Accordingly, $sin a = +-2/sqrt 5$ .

Let $b = tan^(-1)(-1/3)$ . Then $tan b = -1/3<0$ . So, b is in the 2nd quadrant or in the 4th. Accordingly, $sin b = +-1/sqrt 10 and cos b = 3/sqrt 10$ . Also, sin b and cos b have opposite signs.

Now, the given expression is

sin ( a + b ) = sin a cos b + cos a sin b

$=(+-2/sqrt 5)(+-3/sqrt 10)-(-1/sqrt 5)(+-1/sqrt 10)$

$=+-6/sqrt 50$ $-$ or + $1/sqrt 50$

$=(sqrt 2/10)(+-6+-1)$

$=+-0.7 sqrt 2 and +-1/ sqrt 2$

In each case, the angles a and b can be obtained separately. .

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How do you simplify $sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]$ ?

1 Answer

Explanation:

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How do you simplify sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]?

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How do you simplify $sin[cos^-1( - sqrt5 / 5 ) + tan^-1 ( - 1 / 3) ]$ ?