Answer:
Step-by-step explanation:
This is the sum identity for tangent(x + y), where x and y are angles measured in radians. The formula for tan(x + y) is [tex]\frac{tan(x)+tan(y)}{1-tan(x)tan(y)}[/tex]
The first order of business is to find which 2 angles, when expressed in terms of the denominator 12, add up to equal [tex]\frac{5\pi}{12}[/tex]
We will use the first quadrant angles, and only the "important" ones:
[tex]\frac{\pi}{4},\frac{\pi}{3},\frac{\pi}{6},\frac{\pi}{2},\pi[/tex]
When expressed in terms of the denominator of 12, these angles have the equivalent angles, in order from above:
[tex]\frac{3\pi}{12},\frac{4\pi}{12},\frac{2\pi}{12},\frac{6\pi}{12},\frac{12\pi}{12}[/tex]
We need to find the 2 whose numerators add up to a 5. That would be:
[tex]\frac{3\pi}{12} +\frac{2\pi}{12}=\frac{5\pi}{12}[/tex]
Remember that
[tex]\frac{3\pi}{12}=\frac{\pi}{4}[/tex] and [tex]\frac{2\pi}{12}=\frac{\pi}{6}[/tex] so
angle x is [tex]\frac{\pi}{4}[/tex] and angle y is [tex]\frac{\pi}{6}[/tex], making our tangent sum:
[tex]tan(\frac{\pi}{4}+\frac{\pi}{6})[/tex]
Filling that into our formula for the sum of tan(x + y):
[tex]tan(\frac{\pi}{4}+\frac{\pi}{6})=\frac{tan(\frac{\pi}{4})+tan(\frac{\pi}{6}) }{1-tan(\frac{\pi}{4})tan(\frac{\pi}{6}) }[/tex]
It just so happens that
[tex]tan(\frac{\pi}{4})=1[/tex] and
[tex]tan(\frac{\pi}{6})=\frac{\sqrt{3} }{3}[/tex] so our formula then becomes
[tex]tan(\frac{\pi}{4}+ \frac{\pi}{6})=\frac{1+\frac{\sqrt{3} }{3} }{1-(1)(\frac{\sqrt{3} }{3}) }[/tex] which simplifies to
[tex]\frac{\frac{3+\sqrt{3} }{3} }{\frac{3-\sqrt{3} }{3} }[/tex] and then bring up the lower fraction and flip it to multiply giving you:
[tex]tan(\frac{\pi}{4} +\frac{\pi}{6} )=\frac{3+\sqrt{3} }{3-\sqrt{3} }[/tex]
I have the feeling that you need to rationalize that denominator, and if you do that, the final answer will be:
[tex]2+\sqrt{3}[/tex]
I know I kind of left you hanging at the very end with rationalizing, but there was so much already that went into this problem in such depth, that I didn't want to risk possibly confusing you even more than I may have already done so. Try and follow the best that you can.
