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3 March, 04:05

Calculate the discriminant and use it to determine how many real-number roots the equation has

3x^ (2) - 6x+4=0

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Answers (2)
  1. 3 March, 06:44
    0
    The quadratic formula is:

    x = (-b±√ (b^2-4ac)) / (2a) for the quadratic of the form ax^2+bx+c

    The discriminant is the (b^2-4ac) part of the quadratic formula.

    Let d = (b^2-4ac). If:

    d<0: There are no real roots.

    d=0: There is one real root.

    d>0: There are two real roots.

    In this case the discriminant is:

    (-6) ^2-4*3*4

    36-48

    -12

    Since - 12<0 there are no real roots for the equation 3x^2-6x+4.
  2. 3 March, 07:39
    0
    Discriminant = b^2 - 4ac

    = (-6) ^2 - (4*3*4)

    = - 12

    Discriminant < 0

    Thus it implies, No real roots for the equation.
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