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Nellbryant · Answer 1 · 2021-07-11T01:26:42+0000

Answer:

Sides:

.
$b \approx 99$ .
.

Angles:

$\angle A \approx 39^\circ$ .
$\angle B \approx 37^\circ$ .
$\angle C = 104^\circ$ .

Explanation:

Angle A

Apply the law of sines to find the sine of
$\angle A$ :

$\displaystyle (sin(A))/(sin(C)) = (a)/(c)$ .

$\displaystyle\sin A = (a)/(c) \cdot sin(C) = (103)/(159) * \left(\sin{104^(\circ)}\right) \approx 0.628556$ .

Therefore:

$\angle A = \displaystyle\arcsin (\sin A) \approx \arcsin(0.628556) \approx 38.9^\circ$ .

Angle B

The three internal angles of a triangle should add up to
$180^\circ$ . In other words:

$\angle A + \angle B + \angle C = 180^\circ$ .

The measures of both
$\angle A$ and
$\angle C$ are now available. Therefore:

$\angle B = 180^\circ - \angle A - \angle C \approx 37.1^\circ$ .

Side b

Apply the law of sines (again) to find the length of side
:

$\displaystyle(b)/(c) = (\sin \angle B)/(\sin \angle C)$ .

$\displaystyle b = c \cdot \left((\sin \angle B)/(\sin \angle C)\right) \approx 159* (\sin \left(37.1^\circ\right))/(\sin\left(104^\circ\right)) \approx 98.8$ .

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