SOLUTION: Without solving the given equation, find an equation whose roots are the squares of the roots of x^2 + 4x + 2 = 0.

Algebra.Com
Question 1068750: Without solving the given equation, find an equation whose roots are the squares of the roots of x^2 + 4x + 2 = 0.
Found 2 solutions by josgarithmetic, ikleyn:
Answer by josgarithmetic(39617)   (Show Source): You can put this solution on YOUR website!
x^2+4x+2=0 has roots and ;
or
and .

To make the equation whose roots are the squares of each of those,
the new roots would be and .
THe equation starts as . Then one more small step.
Answer by ikleyn(52781)   (Show Source): You can put this solution on YOUR website!
.
Without solving the given equation, find an equation whose roots are the squares of the roots of x^2 + 4x + 2 = 0.
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

The trick and the focus is to find the second equation without solving the first.

In this sense the solution by "josgarithmetic" is "out of the target".

I will show you how to strike EXACTLY to the target. 

It is about the Vieta's theorem, whether it is included or not included to the school math curriculum. 

Let "s" and "t" be the roots of the quadratic polynomial

p(x) =  

with the leading coefficient 1 at . Then the Vieta's theorem says:

s + t = -p   and  s*t = q.


For the given equation 

 = 

it means that if "s" and "t" are its roots, then

s + t = -4,    (1)    and
s*t    = 2.    (2)

Next, if (1) and (2) are held, then

 =  =  = 16;  hence,  = 16 - 2s*t = 16 - 2*2 = 12,   and

 =  =  = 4.


Hence, by applying the Vieta;s theorem once again, you see that  and  are the roots of the polynomial

g(x) = .

It is the answer to the problem's question.  The problem is solved !!


Notice, we get the answer without solving the original equation.
Exactly as assigned by the condition.
All we did we manipulated with coefficients and used the Vieta's theorem.


On the way you learned about Vieta's theorem for quadratic equations and polynomials.

Happy learning !!



RELATED QUESTIONS

The roots of the equation 4x^2-x+36=0 are (alpha)^2 and (beta)^2. Find: (a) an equation (answered by josmiceli)
Find an equation whose roots are the reciprocals of the roots of the equation 5x^2 + 15x... (answered by solver91311)
Find the quadratic equation with roots which are the squares of the roots of x^2 -5x -3 (answered by richwmiller)
Find the equation whose roots are each two more than the roots of... (answered by MathLover1)
form a quadratic equation in x whose roots are the squares of the roots of... (answered by MathLover1)
Find a quadratic equation with integral coefficients whose roots are the squares of the... (answered by Alan3354)
Let the roots of the equation x2 -4x+2=0 be alpha and beta. find the quadratic equation... (answered by josgarithmetic)
find the quadratic equation whose roots is; square root of the roots of... (answered by Theo)
Given that r and s are roots of the quadratic equation 3(x^2)+1=7x, find (r^3)s+r(s^3),... (answered by drk)