An acute angle θ is in a right triangle with sin θ = 6/7 . What is the value of cot θ?

Question

asked Jun 5, 2017 104k views

2 Answers

Jackson Lee · Answer 1 · 2017-06-07T08:16:01+0000

sin t = 6/7
cot t = cos t / sin t
cos t = √(1 - (6/7)²) = √( 1 - 36/49) = √(13/49) = √13/7
cot t = √13/7 / 6/7 = √13 / 6

Mariann · Answer 2 · 2017-06-11T01:35:18+0000

Answer:

$cot\theta=(√(13))/(6)$

Explanation:

Step 1

Find the value of the
$cos\theta$

we have that

$sin\theta=(6)/(7)$

Remember that

$sin^(2) \theta+cos^(2) \theta=1$

Substitute the value of
$sin\theta$

$(6)/(7)^(2)+cos^(2) \theta=1$

$(36)/(49)+cos^(2) \theta=1$

$cos^(2) \theta=1-(36)/(49)$

$cos^(2) \theta=(13)/(49)$

square root both sides

$cos \theta=(√(13))/(7)$

Step 2

Find the value of
$cot\theta$

we know that

$cot\theta=(cos\theta)/(sin\theta)$

substitute the values

$cot\theta=((√(13))/(7))/((6)/(7))=(√(13))/(6)$