Question

Math help!

Answer 1

Do you know calculus? Or do you need to graph to solve?

Answer 2

I know calculus. I have to get the second derivative of this equation correct? And then set it equal to 0 and find the x-values?

Answer 3

If x is an inflection point for y then the second derivative, y″(x), is equal to zero if it exists, but this condition does not provide a sufficient definition of a point of inflection.

That's to say that if it y″(x) = 0, then it is not necessarily an inflection point.

You are looking for the point where the function goes from concave up to concave down or vice versa. See red in this graph - https://en.wikipedia.org/wiki/Inflection_point#/media/File:Animated_illustration_of_inflection_point.gif

Answer 4

Here is a graph of your function. You can see where your function is concave up and concave down. Where it switches (from down to up or vice versa) is where you will test that in fact the second derivative is zero at that point and confirm that it is an inflection point.

Answer 5

Wheres the graph of the function?

Answer 6

It concaves up at 3

Answer 7

Where it goes from Concave down to Concave up is your inflection point

Answer 8

Now take the second derivative and set equal to zero. The point in that vicinity is the inflection point.

Answer 9

I got -3 and 0

Answer 10

The second derivative set equal to zero is
d^2/dx^2(x^3+18 x^2-3 x+4) = 6 (x+6) =0

So x = -6, right?

Answer 11

A little cleaner --
$$
\frac{d^2}{dx^2}\left (x^3+18 x^2-3 x+4 \right )=6(x+6)=0
$$
This is your equation, right?

Answer 12

Here is the second derivative -
http://www.wolframalpha.com/input/?i=d%5E2%2Fdx%5E2+%28x%5E3+%2B+18x%5E2+%E2%80%93+3x+%2B+4%29

Answer 13

Does this make sense?

Answer 14

Okay yeah I messed up when deriving

Answer 15

Thank you!

Answer 16

You're welcome