A triangle has sides A, B, and C. The angle between sides A and B is (pi)/2π2 and the angle between sides B and C is pi/12π12. If side B has a length of 37, what is the area of the triangle?

1 Answer
Aviv S.
Jan 26, 2018

About 183.41 "units"^2183.41units2 (exact answer below).

Explanation:

A given angle is pi/2π2. To convert from radians to degrees, you must multiply by the conversion factor (180º)/pi:

cancel(pi)/2*(180º)/cancel(pi) = 90º

Now we now that this triangle is a right triangle because it contains a 90º angle. Another given angle is pi/12, so we do the same conversion:

cancel(pi)/12*(180º)/cancel(pi)=(180º)/12 = 15º

The tangent trigonometric function tan(theta) is defined as the ratio between the side opposite the angle theta and the side adjacent to theta. So we can say that:

tan(15º) = A/B

And since B = 37:

tan(15º) = A/37

Now we can solve for A, the height of the triangle, and get:

A=37*tan(15º)~~9.91

Now we can find the area of our triangle by using the formula for the area of triangles and plugging in our values:

A_"triangle" = (b*h)/2

= (37*(37*tan(15º)))/2

=(37^2*tan(15º))/2

=(1369*tan(15º))/2

~~183.41

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