If the sum of zeros of the polynomial P of x is equal to (K^2-14 )x^2 - 2x -12 is 1 then find the value of k.
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Answer:
The values of k are -4 and 4
Step-by-step explanation:
The given polynomial is (k^2-14)x^2-2x-12(k
2
−14)x
2
−2x−12
The sum of zeros of a quadratic equation is -\frac{b}{a}−
a
b
Hence, the sum of the zeros of the given quadratic is
\begin{gathered}-\frac{-2}{(k^2-14}\\\\\frac{2}{(k^2-14}\end{gathered}
−
(k
2
−14
−2
(k
2
−14
2
Now, from the given directions, this expression should be equal to 1.
\begin{gathered}\frac{2}{(k^2-14}=1\\\\k^2-14=2\\\\k^2=16\\\\k=\pm\sqrt{16}\\\\k=\pm4\end{gathered}
(k
2
−14
2
=1
k
2
−14=2
k
2
=16
k=±
16
k=±4
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