How do you find the exact value of $cos^-1(1/2)$ ?

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How do you find the exact value of $cos^-1(1/2)$ ?

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Answer 1 · 2018-05-01T17:43:42

$cos^(-1)(1/2) = pi/3+2npi$ , $foralln in ZZ$

Explanation:

Let $theta = cos^(-1)(1/2)$ . In other words,
$cos(theta)=1/2$
But we know that $theta=pi/3$ is a solution to this equality;
$cos(pi/3)=1/2$

Now, since $cos$ is a periodic function with period $2npi$ , for integer $n$ , we can rewrite this as:

$cos(pi/3+2npi)=1/2$
Or
$pi/3+2npi=cos^(-1)(1/2)$ , $forall n in ZZ$ .

Answer 2 · 2018-05-01T17:58:59

$pi/3 + 2kpi$
$(5pi)/3 + 2kpi$

Explanation:

Find arc x knowing cos x = 1/2
Trig table and unit circle give 2 solutions:
$x = +- pi/3 + 2kpi$
Note that $(-pi/3)$ is co-terminal to $(5pi)/3$ .
Answers for $(0, 2pi)$ :
$pi/3, and (5pi)/3$
General answers:
$x = pi/3 + 2kpi$
$x = (5pi)/3 + 2kpi$

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How do you find the exact value of $cos^-1(1/2)$ ?

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