In Exercises 41–56, use the circle shown in the rectangular co...

Question

In Exercises 41–56, use the circle shown in the rectangular coordinate system to draw each angle in standard position. State the quadrant in which the angle lies. When an angle's measure is given in radians, work the exercise without converting to degrees.

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Circle in rectangular coordinates for measuring angles in standard position.

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Accepted Answer

Hello, everyone. We are asked for the given angle to identify the quadrant where it lies and sketch it in standard position on the unit circle. Provided the angle we are given is 29 pi divided by six. We are given a blank unit circle. So 29 pi divided by six, looking at it, I can say that this is greater than one full rotation around the circle. Recalling that a full rotation around a unit circle is too high. So I'm gonna subtract two pie from 29 pi divided by six. And when I do that using a common denominator, I have 29 pi divided by six minus 12 pi divided by six. And that will give me 17 pi divided by six. Knowing that two pi is equivalent to 12 pie divided by six. I know that this is still greater than our standard form. So I'm gonna subtract another 12 pi divided by six. So that way my angle is between zero and two pi and when I do so we get five pi divided by six. This is the angle we're gonna work with five pi divided by six. So now that I know what I'm working with. I need to figure out where does it fall? Well, knowing that in standard position, one side of my angle is on the positive side of the x axis, I need to find where the other side of the angle falls. Recalling that the distance between the positive side of the X axis and the positive side of the y axis is pi divided by two. And that the full half circle is pi I can change those measurements in terms of a denominator of six and see if that is where five pi divided by six falls. So pi divided by two would be the same as three pi divided by six. So I know that five pi divided by six is not in the first quadrant. We need to keep going. Pie is equivalent to six pi divided by six. And since five pi divided by six would fall between three pi divided by six and six pi divided by six, I know that this is in quadrant two. So now to find where it would be on my unit circle, it is going to be closer to six pi divided by six than three pi divided by six. And it does work out to be this third blank line that we have in the second quadrant. And I apologize for the lack of straightness in my sketch, but that's why it's a sketch, right? So we have an angle that is five pi divided by six. Once we put it in standard form, it falls in the second quadrant and it's a little bit further up than the X axis. Have a nice day.

In Exercises 41–56, use the circle shown in the rectangular coordinate system to draw each angle in standard position. State the quadrant in which the angle lies. When an angle's measure is given in radians, work the exercise without converting to degrees.

14𝜋/3

Key Concepts

Angles in Standard Position

Radian Measure and Circle Rotation

Quadrants of the Coordinate Plane

Watch next

In Exercises 41–56, use the circle shown in the rectangular coordinate system to draw each angle in standard position. State the quadrant in which the angle lies. When an angle's measure is given in radians, work the exercise without converting to degrees.14𝜋/3

Key Concepts

Angles in Standard Position

Radian Measure and Circle Rotation

Quadrants of the Coordinate Plane

Watch next

In Exercises 41–56, use the circle shown in the rectangular coordinate system to draw each angle in standard position. State the quadrant in which the angle lies. When an angle's measure is given in radians, work the exercise without converting to degrees.

14𝜋/3