1. **State the problem:** We need to find the bearing of point D from point C using the protractor diagram. 2. **Understanding bearings:** Bearings are measured clockwise from the north direction (0° or 360°) to the line connecting the two points. 3. **Given information:** The protractor shows 0° at the bottom right, increasing counterclockwise to 180° at the top middle (north). Point C is at the center bottom (0°), and point D is at approximately 150° on the protractor arc. 4. **Convert the given angle to bearing:** Since bearings are measured clockwise from north (180° on this protractor), and D is at 150° counterclockwise from 0°, the angle from north clockwise to D is: $$\text{Bearing} = 360^\circ - 150^\circ = 210^\circ$$ 5. **Interpretation:** The bearing of D from C is $210^\circ$, meaning from north, rotate clockwise 210° to point towards D. **Final answer:** The bearing of D from C is $210^\circ$.