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Use this identify to solve the question:
tan4Q =
Find the polynomial of least degree that has zeroes , , ,
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So, according to the problem formulation, I should accept the given identity "as is", and based on it,
to construct the polynomial.
Since this problem is designed/intendent for advanced students, I will only show the major idea and the major steps
without going in details.
Let me start noticing that of four numbers , , , ,
the first is equal to the third, while the second is equal to the fourth.
So, I will construct the polynomial which has two zeroes as the first and the second numbers of the four numbers listed:
then the third and the fourth numbers will be the roots of this polynomial automatically . . .
Take Q = . Then 4Q = and tan(4Q) = = .
According to the given identity, I have then
= or
= . (2)
Next, in (2), I will replace (tan(Q))^2 by x everywhere (at each appearance).
I will get then
= . (3)
Now, for there is the formula (the known expression)
= (see the link https://brainly.in/question/9263846 )
and/or
= (see the link https://mathworld.wolfram.com/TrigonometryAnglesPi24.html)
Replacing in formula (3) by any of these constant expressions (they are equal (!)),
I get the polynomial of the degree 2
= , (4)
whose two roots are and .
If you want to have the polynomial with the roots and ,
simply replace x in the polynomial (4) by and transform the obtained rational function to the form
of the ratio with polynomials P(x) and Q(x).
Then the polynomial P(x) will be the answer to the problem's question.
Probably, it is more correctly in English to say "a polynomial P(x)", because every product of such a polynomial by a constant
satisfies the problem's conditions, too.
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Solved and explained.
In such problems, knowing the way is more important than gettting the exact answer.