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Determine the discriminant for the quadratic equation -3=x2+4x+1. Based on the discriminant value, how many real number solutions does the equation have? Discriminant = b2-4ac

User Mushahid Khatri
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1 Answer

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26 votes

Answer:

Discriminant is 0, 1 real solution

Explanation:

Set the equation in form of
\displaystyle \large{ax^2+bx+c=0}:


\displaystyle \large{x^2+4x+1+3=0}\\\\\displaystyle \large{x^2+4x+4=0}

Apply discriminant formula which is
\displaystyle \large{b^2-4ac}:


\displaystyle \large{D=4^2-4(1)(4)}\\\\\displaystyle \large{D=16-16}\\\\\displaystyle \large{D=0}

Therefore, the discriminant is 0. Since D = 0, it’s defined that there are only 1 real solution.

User RivieraKid
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