Final answer:
The statement is true. When the three bullets shot from the center of a circle are 120° apart, all three quadrants of the circle are covered.
Step-by-step explanation:
This statement is indeed true. When you have three bullets being fired simultaneously in three different directions from the center of a circle, and when these directions are 120° apart, this arrangement would effectively cover the entire 360° of the circle. Here's how: if you place the first direction along the x-axis, the second bullet would be fired in a direction that is 120° away from the x-axis. This means that the second bullet is fired toward the second quadrant of the circular diagram. Lastly, the third bullet would be fired in a direction that's 240° away from the x-axis, pointing to the third quadrant. This process would ensure that all three quadrants of the circle are covered, each by a single bullet.
The statement is true. When three guns are aimed at the center of a circle and each fires a bullet simultaneously, the directions in which they fire are 120° apart. This forms an equilateral triangle in the circle with each side being the radius of the circle. Since the angles of an equilateral triangle are all 60°, the angles between the lines connecting the center of the circle and the points where the bullets hit are also 60°.
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