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Solve using the quadratic formula.\newlinep2+9p+7=0p^2 + 9p + 7 = 0\newlineWrite your answers as integers, proper or improper fractions in simplest form, or decimals rounded to the nearest hundredth.\newlinep=p = _____ or p=p = _____

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Q. Solve using the quadratic formula.\newlinep2+9p+7=0p^2 + 9p + 7 = 0\newlineWrite your answers as integers, proper or improper fractions in simplest form, or decimals rounded to the nearest hundredth.\newlinep=p = _____ or p=p = _____
  1. Quadratic Formula Explanation: The quadratic formula is given by p=b±b24ac2ap = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}, where aa, bb, and cc are the coefficients of the terms in the quadratic equation ap2+bp+c=0ap^2 + bp + c = 0. In this case, a=1a = 1, b=9b = 9, and c=7c = 7.
  2. Calculate Discriminant: First, calculate the discriminant, which is the part under the square root in the quadratic formula: b24acb^2 - 4ac. Here, it is 924(1)(7)9^2 - 4(1)(7).
  3. Discriminant Calculation: Perform the calculation: 814(1)(7)=8128=5381 - 4(1)(7) = 81 - 28 = 53. The discriminant is 5353.
  4. Plug Values into Formula: Now, plug the values of aa, bb, and the discriminant into the quadratic formula to find the two possible values for pp.\newlinep=9±532×1p = \frac{-9 \pm \sqrt{53}}{2 \times 1}
  5. Simplify Expressions: Simplify the expression by calculating the two possible values for pp.\newlineFirst solution: p=9+532p = \frac{-9 + \sqrt{53}}{2}\newlineSecond solution: p=9532p = \frac{-9 - \sqrt{53}}{2}
  6. Find Solutions: The question asks for the solutions as integers, proper or improper fractions in simplest form, or decimals rounded to the nearest hundredth. Since the discriminant is not a perfect square, the solutions will be in decimal form.\newlineFirst solution rounded to the nearest hundredth: p(9+53)/2(9+7.28)/21.72/20.86p \approx (-9 + \sqrt{53}) / 2 \approx (-9 + 7.28) / 2 \approx -1.72 / 2 \approx -0.86\newlineSecond solution rounded to the nearest hundredth: p(953)/2(97.28)/216.28/28.14p \approx (-9 - \sqrt{53}) / 2 \approx (-9 - 7.28) / 2 \approx -16.28 / 2 \approx -8.14

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