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Here is a graph of the function y, both continuous and differentiable. For approximately what values of x between -5 and 5 is the second derivative zero?
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Here is a graph of the function y, both continuous and differentiable. For approximately what values of x between -5 and 5 is the second derivative zero?

Here is a graph of the function y, both continuous and differentiable. For approximately-example-1
User Sikan
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1 Answer

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From the graph you can determine the first derivative by looking at the turning points. These are where the first derivative is zero.


y' = x(x-2)(x+2)(x-5)(x+5) \\ \\ y' = x^5 -29x^3 +100x

Take derivative to get 2nd derivative and set equal to zero:

y'' = 5x^4 -87x^2 +100 = 0

Solve for x:

x^2 = (87 \pm √(87^2 -2000))/(10) \\ \\ x = \pm 1.11, \pm 4.02
User Nerf
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