| 31. | Let the roots of the standard quadratic equation be and.
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| 32. | Here is the value of that solves the quadratic equation.
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| 33. | We can find quadratic residues or verify them using the above formula.
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| 34. | The quadratic functional is the second variation of and is denoted by,
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| 35. | He further gave two equivalent solutions to the general quadratic equation
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| 36. | A quadratic equation, for example, has two solutions.
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| 37. | This means that 3 is a quadratic nonresidue modulo M _ p.
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| 38. | For the quadratic Casimir invariant, this is the Laplacian.
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| 39. | Quadratic plane vector fields with four limit cycles are known.
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| 40. | The matrix of the quadratic form in ( x, y ).
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