1 Answer

Martin Kool · Answer 1 · 2022-02-18T02:58:26+0000

Answer:

$\cos(\theta) = -(√(17))/(6)$

Explanation:

Given

$\tan(\theta) = -\sqrt{(19)/(17)}$

Required

Determine
$\cos(\theta)$

We have:

$\tan(\theta) = -\sqrt{(19)/(17)}$

Split

$\tan(\theta) = -(√(19))/(√(17))$

tan is calculated as:

$\tan(theta) = (opposite)/(adjacent)$

So:

$Opposite = -\sqrt{19$

$Adjacent = \sqrt{17$

And:

Hypotenuse^2 = Opposite^2 + Adjacent^2 --- Pythagoras theorem

Hypotenuse^2 = (-√(19))^2 + (√(17))^2

Hypotenuse^2 = 19 + 17

Hypotenuse^2 = 36

Take square roots

Hypotenuse = 6

$\cos(\theta) = (Adjacent)/(Hypotenuse)$

$\cos(\theta) = (√(17))/(6)$

Since it is in the second quadrant, then:

$\cos(\theta) = -(√(17))/(6)$

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