Question 1136685
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<pre>
The condition says that  x^2 - px + 20 = 0  has the root 4.


Then the other root is  {{{20/4}}} = 5,  according to Vieta's theorem.


It implies (via Vieta's theorem, again) that  p  is equal to the sum of the roots  5+4 = 9:  p = 9.


So, the second equation is


    x^2 - qx + 9 = 0.


Since it has equal roots,  these roots are EITHER


    a)  both are equal to  {{{sqrt(9)}}} =  3   (Vieta;s theorem).

OR

    b)  both are equal to  {{{-sqrt(9)}}} = -3   (Vieta;s theorem).


In case a),  q= 3 + 3 = 6.   (Vieta;s theorem, again)    <U>ANSWER</U>

In case b),  q = (-3) + (-3) = -6.


So, the problem has TWO answers:  q = 6  and/or  q = -6.
</pre>

Again :  one possible answer is q = 6;  the other possible answer is q = -6.


Solved.


This problem is to apply Vieta's theorem 4 times.