A triangle has sides A, B, and C. The angle between sides A and B is $\frac{π}{6}$ $pi/6$ . If side C has a length of $25$ $25$ and the angle between sides B and C is $\frac{π}{12}$ $pi/12$ , what is the length of side A?

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A triangle has sides A, B, and C. The angle between sides A and B is $\frac{π}{6}$ $pi/6$ . If side C has a length of $25$ $25$ and the angle between sides B and C is $\frac{π}{12}$ $pi/12$ , what is the length of side A?

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Answer 1 · 2017-05-05T15:18:16

Use the Law of Sines

Explanation:

In general, the Law of Sine states that if a, b, and c are the lengths of the sides opposite angles $α, β, γ$ $alpha, beta, gamma$ (in that order), then
$\frac{a}{sin (α)} = \frac{b}{sin (β)} = \frac{c}{sin (γ)}$ $a/sin(alpha) = b/sin(beta) = c/sin(gamma)$ .

We only use the Law one pair of angles at a time. In this case, we know that the angle between A and B is $γ$ $gamma$ , and the angle between B and C is $α$ $alpha$ . Therefore,

a = unknown
c = 25
$α = \frac{π}{12}$ $alpha = pi/12$
$γ = \frac{π}{6}$ $gamma = pi/6$

Using the Law:

$\frac{a}{sin (\frac{π}{12})} = \frac{25}{sin (\frac{π}{6})}$ $a/sin(pi/12) = 25/sin(pi/6)$

$\frac{π}{6}$ $pi/6$ is one of the standard angles. $sin (\frac{π}{6}) = \frac{1}{2}$ $sin(pi/6) = 1/2$ .

The value of $sin (\frac{π}{12})$ $sin(pi/12)$ may be found using the difference formula for sine:

$sin (\frac{π}{12}) = sin (\frac{3 π}{12} - \frac{2 π}{12})$ $sin(pi/12) = sin((3pi)/12 - (2pi)/12)$
$= sin (\frac{3 π}{12}) cos (\frac{2 π}{12}) - cos (\frac{3 π}{12}) sin (\frac{2 π}{12})$ $= sin((3pi)/12)cos((2pi)/12)- cos((3pi)/12)sin((2pi)/12)$
$= sin (\frac{π}{4}) cos (\frac{π}{6}) - cos (\frac{π}{4}) sin (\frac{π}{6})$ $= sin(pi/4)cos(pi/6)- cos(pi/4)sin(pi/6)$
$= (\frac{\sqrt{2}}{2}) (\frac{\sqrt{3}}{2}) - (\frac{\sqrt{2}}{2}) (\frac{1}{2})$ $= (sqrt2/2)(sqrt3/2) - (sqrt2/2)(1/2)$
$= \frac{\sqrt{6} - \sqrt{2}}{4}$ $= (sqrt6 - sqrt2)/4$

Solving the proportion:

$\frac{a}{sin (\frac{π}{12})} = \frac{25}{sin (\frac{π}{6})}$ $a/sin(pi/12) = 25/sin(pi/6)$

$a = \frac{(25) (sin (\frac{π}{12}))}{sin (\frac{π}{6})}$ $a = ((25)(sin(pi/12)))/sin(pi/6)$

$a = \frac{(25) \frac{\sqrt{6} - \sqrt{2}}{4}}{\frac{1}{2}}$ $a = ((25)(sqrt6 - sqrt2)/4)/(1/2)$

$a = \frac{(25) (\sqrt{6} - \sqrt{2})}{2}$ $a = ((25)(sqrt6 - sqrt2))/2$

$a = \frac{25 (\sqrt{6} - \sqrt{2})}{2}$ $a = (25(sqrt6 - sqrt2))/2$

NOTE: If we use the half-angle formula for sine instead of the difference formula, we obtain an answer that looks different but is equal to the above.

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A triangle has sides A, B, and C. The angle between sides A and B is $\frac{π}{6}$ $pi/6$ . If side C has a length of $25$ $25$ and the angle between sides B and C is $\frac{π}{12}$ $pi/12$ , what is the length of side A?

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A triangle has sides A, B, and C. The angle between sides A and B is $\frac{π}{6}$ $pi/6$ . If side C has a length of $25$ $25$ and the angle between sides B and C is $\frac{π}{12}$ $pi/12$ , what is the length of side A?