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13 votes
13 votes
For which values of the parameter "p" the equation

"8x^2 - 4x + 1 - p = 0" (with unknown x) has two different real roots less than 1?

Can you please explain in detail how this problem is solved?

User Kousalya
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1 Answer

14 votes
14 votes

Answer:


\frac12 < p < 5

Explanation:

To solve this, we need to use the discriminant.

Discriminant


b^2-4ac\quad\textsf{when}\:ax^2+bx+c=0


\textsf{when }\:b^2-4ac > 0 \implies \textsf{two real roots}


\textsf{when }\:b^2-4ac=0 \implies \textsf{one real root}


\textsf{when }\:b^2-4ac < 0 \implies \textsf{no real roots}

If the given equation has 2 real roots, then we need to use:


b^2-4ac > 0

Given equation:
8x^2-4x+1-p=0


\implies a=8, \quad b=-4, \quad c=(1-p)

Substituting these values into
b^2-4ac > 0 and solve for p:


\implies (-4)^2-4(8)(1-p) > 0


\implies 16-32(1-p) > 0


\implies 16-32+32p > 0


\implies -16+32p > 0


\implies 32p > 16


\implies p > (16)/(32)


\implies p > \frac12

For the roots to be less than 1, first find the value of p when the root is 1.

If the root is 1, then
(x-1) will be a factor, so
f(1)=0

Substitute
x=1 into the given equation and solve for p:


\implies 8(1)^2-4(1)+1-p=0


\implies 5-p=0


\implies p=5

Therefore, the values of p for which the given equation has two different real roots less than 1 are:


\frac12 < p < 5

User Pzelasko
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3.0k points