Given that sec 0= -37/12, what is the value of cot 0, for pi/2 < 0 pi?

Question

asked Jun 17, 2020 144k views

2 Answers

Jjimenez · Answer 1 · 2020-06-19T14:03:13+0000

Answer:

-(12)/(35)

Explanation:

Given,

$sec\theta = -(37)/(12)$

We know that,

$sec \theta = (H)/(B)$

Where, H is the hypotenuse of a right triangle and B is its base,

By making diagram,

By applying pythagoras theorem,

The Perpendicular of the triangle,

P=√(H^2-B^2)=√(37^2-12^2)=√(1369-144)=√(1225)=35

Hence,
$cot \theta = -(B)/(P)=-(12)/(35)$

( We took the negative sign because
$(\pi)/(2)< \theta < \pi$ )

Slepox · Answer 2 · 2020-06-23T23:12:55+0000

Answer:

cot(θ) = -12/35

Explanation:

cot(θ) = -1/√(sec(θ)^2 -1) . . . . negative in the second quadrant

= -1/√((-37/12)^2 -1) = -1/(35/12)

cot(θ) = -12/35