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27 June, 00:11

To two decimal places, find the value of k that will make the function f (x) continuous everywhere. 3x+k

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  1. 27 June, 01:35
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    solution:

    we are consider the following function,

    f (x) = 3x+k, x/leq 3

    =kx^{2}-6, x>3

    /lim_{x/rightarrow 3^-} (3x+k) = 9+k

    /lim_{x/rightarrow3^+}

    (kx^{2}-6) = 9k-6

    so the left and right limits are equal.

    therefore, the function is continuous at x=3

    so, the therom of the function is continous at x=3

    9k-6=9+k

    8k=15

    k=15/8

    =1.875

    therefore, the value of k=1.875
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