If the angle -1500o is in standard position, state the quadrant in which it's terminal side lies.

-1500/360 = -4 with a remainder of -60°

So we would have 4 clockwise rotations with and angle of 60 into quadrant IV

Assume that the data in question 25 reflects a highly skewed interval variable. a. What statistics would you compute to summarize these conditions b. compute them to be 14, 12, 8.5, respectively. What conclusion about the study should you draw? c. What conclusion would you draw about the populations produced by the experiment.

First, if you have a question, it is much better to put it in as a separate post in <Post a New Question> rather than attaching it to a previous question, where it is more likely to be overlooked.

Second, we do not have the "data in question 25."

To determine the quadrant in which the terminal side of an angle lies in standard position, we can follow these steps:

1. Convert the angle to its equivalent positive angle within one full revolution (360 degrees or 2π radians).
- In this case, we need to add 360 degrees to -1500 degrees to get an equivalent positive angle within one full revolution.
- -1500 + 360 = -1140 degrees

2. Determine the quadrant based on the converted positive angle:
- Quadrant I: 0° < angle < 90° (0 < angle < π/2)
- Quadrant II: 90° < angle < 180° (π/2 < angle < π)
- Quadrant III: 180° < angle < 270° (π < angle < 3π/2)
- Quadrant IV: 270° < angle < 360° (3π/2 < angle < 2π)

Since the converted angle is -1140 degrees, it falls into Quadrant IV (270° < angle < 360° or 3π/2 < angle < 2π). Therefore, the terminal side of the angle -1500° lies in Quadrant IV.