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5 January, 08:54

Can you think of a number k for which k^2 < k is true?

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  1. 5 January, 09:38
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    Some k's that will work:

    1/2

    1/3

    1/4

    (There are infinitely many answers.)

    Step-by-step explanation:

    Obviously 5 won't work because 25<5 is not true.

    What about a negative? - 5?

    25<-5 is not true.

    How about 1/3? 1/9<1/3 is true so 1/3 works.

    Note: Think of a number between 0 and 1.

    1/4<1/2 is true and (1/2) ^2=1/4.

    1/16<1/4 is true and (1/4) ^2=1/16.

    You can solve k^2
    Subtract k on both sides.

    k^2-k<0

    Factor.

    k (k-1) <0.

    So k^2-k is a parabola with x-intercepts (k-intercepts) at k=0 and k=1.

    The parabola is open up so any number between 0 and 1 will satisfy k^2
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