We see the answer is  when we use the product rule.

If  is decreasing, then its derivative is negative. The derivative of  is , so this is telling us that  is negative.

For  to be decreasing,  would have to be negative, which we don't know.

 being negative has nothing to do with its slope. 

For  to be decreasing, its derivative  would need to be negative, or, alternatively  would have to be concave down, which we don't know.

Thus, the only correct answer is that  is negative.

The question is asking when the derivative is negative and the second derivative is positive. First, taking the derivative, we get

Solving for the zero's, we see  hits zero at  and . Constructing an interval test,

, we want to know the sign's in each of these intervals. Thus, we pick a value in each of the intervals and plug it into the derivative to see if it's negative or positive. We've chosen -5, 0, and 1 to be our three values.

Thus, we can see that the derivative is only negative on the interval .

Repeating the process for the second derivative,

The reader can verify that this equation hits 0 at -4/3. Thus, the intervals to test for the second derivative are 

.  Plugging in -2 and 0, we can see that the first interval is negative and the second is positive.

Because we want the interval where the second derivative is positive and the first derivative is negative, we need to take the intersection or overlap of the two intervals we got:

If this step is confusing, try drawing it out on a number line -- the first interval is from -3 to 1/3, the second from -4/3 to infinity. They only overlap on the smaller interval of -4/3 to 1/3.

Thus, our final answer is .

The second derivative is essentially a derivative of the first derivative.  Information we get from the first derivative is, if the first derivative is increasing, then the function is also increasing and concave up.  If the second derivative has a positive sign, then the first derivative is increasing and the function is concave up.  Similarly if the function is concave down, the first derivative is decreasing, and the second derivative is negative.

To find the second derivative we must first find the first derivative.

Now that we have found the first derivative we will take the derivative of it.

And so the second derivative is 

If we think about the original function, this tells us the distance.  We take the derivative of the position (we are finding the rate of change of the position) and we have the velocity.  The rate of change of positions, gives us velocity.  We would know which direction we are moving in.  And now, to find the second derivative, we take the derivative of the velocity (finding the rate of change of the velocity) and we are left with the acceleration.  Finding the rate of change of the velocity will tell us at what magnitude we are moving at.

We begin by finding the first derivative.

Now we will take the derivative of the first derivative.

The sign of the second derivative tells us what the concavity of the original function is.  If the second derivative is positive, then the function is concave up.  If the second derivative is negative, the function is concave down.  So if the second derivative is positive, then the function would be concave up.

We will solve for this by finding the higher order derivatives up until we reach the fourth order derivative.

We begin by finding the third order derivative.

And since the third order derivative is  it does not exist.  So this solution does not exist.