<PRE><B>Question 1165987</B>
.
Use this identify to solve the question:


tan4Q = {{{(4tanQ-4(tanQ)^3)/(1-6(tanQ)^2+(tanQ)^4)}}}


Find the polynomial of least degree that has zeroes {{{(cot(pi/24))^2}}}, {{{(cot(7pi/24))^2}}}, {{{(cot(13pi/24))^2}}}, {{{(cot(19pi/24))^2)}}}
~~~~~~~~~~~~~~~~~~~~~~



So, &amp;nbsp;according to the problem formulation, &amp;nbsp;I should accept the given identity &amp;nbsp;&quot;as is&quot;, &amp;nbsp;and based on it,
to construct the polynomial.


Since this problem is designed/intendent for advanced students, &amp;nbsp;I will only show the major idea and the major steps
without going in details.



Let me start noticing that of four numbers  &amp;nbsp;{{{(cot(pi/24))^2}}}, &amp;nbsp;{{{(cot(7pi/24))^2}}}, &amp;nbsp;{{{(cot(13pi/24))^2}}}, &amp;nbsp;{{{(cot(19pi/24))^2)}}}, 

the first is equal to the third, &amp;nbsp;while the second is equal to the fourth.


So, &amp;nbsp;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 . . . 



&lt;pre&gt;
Take Q = {{{pi/24}}}.  Then  4Q = {{{pi/6}}}  and  tan(4Q) = {{{tan(pi/6)}}} = {{{sqrt(3)/3}}}.


According to the given identity, I have then


    {{{sqrt(3)/3}}} = {{{(4tan(Q)-4(tan(Q))^3)/(1-6(tan(Q))^2+(tan(Q))^4)}}}  or

    {{{sqrt(3)*(1-6(tan(Q))^2+(tan(Q))^4)}}} = {{{3*(4tan(Q)-4(tan(Q))^3)}}}.    (2)


Next, in (2), I will replace (tan(Q))^2  by x everywhere (at each appearance).

I will get then


    {{{sqrt(3)*(1 - 6x + x^2)}}} = {{{12*tan(Q)*(1-x)}}}.    (3)


Now, for {{{tan(pi/24)}}}  there is the formula (the known expression)  

         {{{tan(pi/24)}}} = {{{-2 - sqrt(3) + 2*sqrt(2 + sqrt(3))}}}  (see the link  https://brainly.in/question/9263846 )

and/or   

         {{{tan(pi/24)}}} = {{{-2 + sqrt(2) - sqrt(3) + sqrt(6)}}}  (see the link  https://mathworld.wolfram.com/TrigonometryAnglesPi24.html)


Replacing  {{{tan(pi/24)}}}  in  formula  (3)  by any of these constant expressions (they are equal (!)),

I get the polynomial of the degree 2


    {{{sqrt(3)*(1 - 6x + x^2)}}} = {{{12c(1-x)}}},           (4)


whose two roots are  {{{(tan(pi/24))^2}}}  and  {{{(tan(7pi/24))^2}}}.


If you want to have the polynomial with the roots  {{{(cot(pi/24))^2}}}  and  {{{(cot(7pi/24))^2}}},

simply replace x in the polynomial (4) by {{{1/x}}}  and transform the obtained rational function to the form

of the ratio  {{{P(x)/Q(x)}}}  with polynomials  P(x) and Q(x).


Then the polynomial  P(x)  will be the answer to the problem&#39;s question.


Probably, it is more correctly in English to say &quot;a polynomial P(x)&quot;, because every product of such a polynomial by a constant
satisfies the problem&#39;s conditions, too.
&lt;/pre&gt;

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Solved and explained.


In such problems, &amp;nbsp;knowing the way is more important than gettting the exact answer.



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