Probability Density Functions and Integrals

It only applies to discrete events.

It is always normally distributed.

It can take any value within a range.

It has distinct, separate values.

By counting the number of outcomes.

By integrating the probability density function over that range.

By using a histogram.

By using a probability mass function.

The integral has no lower bound.

The function is not continuous.

The probability is always zero.

The integral has no upper bound.

To ensure the function is continuous.

To avoid integrating over non-existent values.

To ensure the function is discrete.

To simplify the calculation process.

A point where the probability is zero.

A point that is inferred from the context of the problem.

A point that is explicitly stated in the problem.

A point where the function is undefined.

The median value of the random variable.

The average value of the random variable.

The minimum possible value of the random variable.

The maximum possible value of the random variable.

By counting the number of outcomes.

By integrating from the lower bound to the given value.

By using a probability mass function.

By using a cumulative distribution function.

Integrate from zero to the given value.

Count the number of outcomes.

Use a probability mass function.

Integrate from the given value to the upper bound.

To simplify the calculation process.

To avoid integrating over non-existent values.

To ensure the function is continuous.

To ensure the function is discrete.

Overlooking domain restrictions.

Assuming the function is discrete.

Using the wrong type of function.

Ignoring the need for integration.