To provide a calculus-based justification for why h is increasing when x > 0.

To find the maximum value of h.

To determine the points of inflection of h.

To calculate the integral of h over a given interval.

Because it does not involve any calculations.

Because it requires advanced calculus knowledge.

Because it does not use the derivative.

Because it is too time-consuming.

The function is concave up.

The derivative of the function is positive.

The function is continuous.

The function has a maximum point.

It means the function has a local maximum.

It shows the slope of the tangent line is positive.

It indicates the function is concave down.

It suggests the function is periodic.

The slope is undefined.

The slope is positive.

The slope is zero.

The slope is negative.

It determines the function's domain.

It helps find the maximum value.

It indicates the function's continuity.

It shows the rate of change is positive.

The derivative being increasing does not necessarily mean h is increasing.

The student used incorrect calculus terminology.

The derivative must be decreasing for h to be increasing.

The student did not mention the graph of h.

It was not a calculus-based justification.

It was incorrect because h is decreasing.

It did not mention the derivative.

It was too vague.

It was a correct justification.

It was irrelevant to the problem.

It was too complex.

It needed more precise language.

The derivative of h is negative when x > 0.

The derivative of h is zero when x > 0.

The derivative of h is positive when x > 0.

The derivative of h is undefined when x > 0.