Easy factor problem!?

factor -2w^2 + 5w = 0

Comments

  • Start by taking our the common factor, which is w.

    w (-2w + 5) = 0

    Solve both factor for w, by setting each equal to zero, since at least one of the factors must equal zero for the whole thing to equal zero.

    w = 0 and

    -2w +5 = 0

    -2w = -5

    w = 5/2 or 2.5

    Your solutions then are w = 0 and w = 2.5

  • -2w^2 + 5w = 0

    Factor out a w.

    w( -2w + 5 ) = 0

    Set each side to zero ( since X * Y = 0, X or Y must be 0).

    w = 0 or -2w + 5 = 0 -> -2w = -5 -> w = 5/2 ( w = 2.5 )

    Answer: w = 0, 2.5

  • -2w² + 5w = 0

    w(-2w + 5) = 0

    w = 0 or

    -2w + 5 = 0 → 2w = 5 → w = 2½

  • question type a million For this polynomial equation x^2 -14*x -fifty one = 0, answer right here questions : A. resolve by using Factorization answer For question a million x^2 -14*x -fifty one = 0 And we get P(x)=x^2 -14*x -fifty one Now, we are able to seek for the roots of P(x) utilising fairly some set of rules : 1A. resolve by using Factorization x^2 -14*x -fifty one = 0 Separate : ( x^2 +3*x ) + ( -17*x -fifty one ) = 0 Commutative regulation : ( x^2 -17*x ) + ( 3*x -fifty one ) = 0 Distributive regulation : x*( x -17 ) + 3*( x -17 ) = 0 ingredient : ( x +3 )*( x -17 ) So the Polynomial have 2 roots : x1 = -3 x2 = 17

  • -w(2w-5)=0

    w=0

    w=5/2

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