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Find the equation of a quartic polynomial whose graph is symmetric about the y-axis and has local maxima at (−1,1) and (1,1) an...Asked by Sal
Find the equation of a quartic polynomial whose graph is symmetric about the y-axis and has local maxima at (−3,3) and (3,3) and a y-intercept of 2.
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Answered by
oobleck
you know that y' = ax(x-3)(x+3) = a(x^3-9x)
That makes
y = a(1/4 x^4 - 9/2 x^2) + C
Since y(0) = 2, C=2 and you have
y = ax^2(1/4 x^2 - 9/2) + 2
Since y(3)=3, you have
9a(9/4 * 9 - 9/2) + 2 = 3
a = -4/81
and so you have
y = -4/81 x^2 (1/4 x^2 - 9/2) + 2
see the graph and its properties at
https://www.wolframalpha.com/input/?i=-4%2F81+x%5E2+%281%2F4+x%5E2+-+9%2F2%29+%2B+2
That makes
y = a(1/4 x^4 - 9/2 x^2) + C
Since y(0) = 2, C=2 and you have
y = ax^2(1/4 x^2 - 9/2) + 2
Since y(3)=3, you have
9a(9/4 * 9 - 9/2) + 2 = 3
a = -4/81
and so you have
y = -4/81 x^2 (1/4 x^2 - 9/2) + 2
see the graph and its properties at
https://www.wolframalpha.com/input/?i=-4%2F81+x%5E2+%281%2F4+x%5E2+-+9%2F2%29+%2B+2
Answered by
Sal
thank you so much! :)
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