Final answer:
The student is asked to find the measure of each angle. Angles that are greater than 360° represent more than one full rotation, and their measure can be found by subtracting multiples of 360° from the total degrees given.
Step-by-step explanation:
The question appears to ask for the measure of each angle indicated: 93°, 703°, 37°, and 1403°. When finding the measure of angles, it's important to consider that the measure of an angle is the amount of rotation required to get one side of the angle to the other, measured in degrees ( ° ). A full rotation is 360°. If an angle's measure is more than 360°, it means it is doing one or more full rotations plus the additional degrees.
For example, for the angle measuring 703°, you can see that it's equivalent to one full rotation (360°) plus an additional 343°. Similarly, for 1403°, it's equivalent to three full rotations (3 x 360° = 1080°) plus an additional 323°. Therefore, the actual angles that we would draw or measure would be 343° for 703° and 323° for 1403°, considering that we usually depict angles between 0° to 360°.