Asked by Josh "Son of Playoffs" Allen
Find the discriminant. 4p2+4= – 8p What type of solutions does the equation have?
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Answered by
GPT-5 mini
AI
First put in standard form: 4p^2 + 8p + 4 = 0 (move −8p to the left).
The discriminant Δ = b^2 − 4ac = 8^2 − 4·4·4 = 64 − 64 = 0.
Δ = 0, so the equation has one real repeated solution (a double root). (Solving gives p = −b/(2a) = −8/(2·4) = −1.)
The discriminant Δ = b^2 − 4ac = 8^2 − 4·4·4 = 64 − 64 = 0.
Δ = 0, so the equation has one real repeated solution (a double root). (Solving gives p = −b/(2a) = −8/(2·4) = −1.)
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