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21 June, 11:18

Which is the equation of a hyperbola with directrices at x = ±3 and foci at (4, 0) and (-4, 0) ?

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  1. 21 June, 11:33
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    x^2/12 - y^2/4 = 1

    Step-by-step explanation:

    As the diretrices have simetrical values of x and have y = 0, the center is located at (0,0)

    The formula for the diretrices is:

    x1 = - a/e and x2 = a/e

    And the foci is located at (a*e, 0) and (-a*e, 0)

    So we have that:

    a/e = 3

    a*e = 4

    From the first equation, we have a = 3e. Using this in the second equation, we have:

    3e*e = 4

    e^2 = 4/3

    e = 1.1547

    Now finding the value of a, we have:

    a = 3*1.1547 = 3.4641

    Now, as we have that b^2 = a^2 * (e^2 - 1), we can find the value of b:

    b^2 = 3.4641^2 * (1.1547^2 - 1) = 4

    b = 2

    So the equation of the hyperbola (with vertical diretrices and center in (0,0)) is:

    x^2/a^2 - y^2/b^2 = 1

    x^2/12 - y^2/4 = 1
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