Find the Measure of a Coterminal Angle - Pre-Calculus

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Find the coterminal angle of 15 degrees.

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The coterminal angles can be positive or negative. To find the coterminal angles, simply add or subtract 360 degrees as many times as needed from the reference angle.

All of these angles are coterminal angles.

Of the given answers, what of the following is a coterminal angle of $\pi$ radians?

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To find the coterminal angle of an angle, simply add or subtract $2\pi$ radians, or 360 degrees as many times as needed.

$\pi+2\pi=3\pi$

$\pi-2\pi=-\pi$

$3\pi+2\pi=5\pi$

$-\pi-2\pi=-3\pi$

These are all coterminal angles to $\pi$ radians.

Out of the given answers, $3\pi$ is the only possible answer.

Find the coterminal angle of $10^\circ$ , if possible.

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In order to find a coterminal angle, or angles of the given angle, simply add or subtract 360 degrees of the terminal angle as many times as possible.

The only correct answer is .

Of the following choices, find a coterminal angle of $\pi$ .

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In order to find a coterminal angle, simply add or subtract $2\pi$ radians to the given angle as many times as possible.

$\theta=\pi+2\pi k$

The possible angles after adding increments of $2\pi$ radians are:

$\pi, 3\pi,5\pi,7\pi...$

$\theta=\pi-2\pi k$

The possible angles after subtracting decrements of $2\pi$ radians are:

$\pi,-\pi,-3\pi,-5\pi...$

Out of the given possibilities, only $-5\pi$ is a valid answer.

Find the coterminal angle of 15 degrees in standard position from the following answers.

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To determine the coterminal angle, simply add or subtract increments or decrements of 360 degrees to the given angle.

For :

These angles can all be coterminal to 15 degrees. The only answer is .

Which of the following angles is coterminal to ?

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Which of the following angles is coterminal to ?

Coterminal angles are angles which start and end at the same point. In other words, they share both their starting and ending point. Note, this doesn't require them to be the same angle.

For instance, is coterminal with , because they both start on the positive x-axis, and end at the same place in quadrant 2.

So, we want to find an angle that ends at the same place in quadrant 1 as . Of the answer choices, only 1 ends in quadrant 1, so that one must be our answer:

Find the coterminal angle of 15 degrees.

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The coterminal angles can be positive or negative. To find the coterminal angles, simply add or subtract 360 degrees as many times as needed from the reference angle.

All of these angles are coterminal angles.

Of the given answers, what of the following is a coterminal angle of $\pi$ radians?

Tap to see back →

To find the coterminal angle of an angle, simply add or subtract $2\pi$ radians, or 360 degrees as many times as needed.

$\pi+2\pi=3\pi$

$\pi-2\pi=-\pi$

$3\pi+2\pi=5\pi$

$-\pi-2\pi=-3\pi$

These are all coterminal angles to $\pi$ radians.

Out of the given answers, $3\pi$ is the only possible answer.

Find the coterminal angle of $10^\circ$ , if possible.

Tap to see back →

In order to find a coterminal angle, or angles of the given angle, simply add or subtract 360 degrees of the terminal angle as many times as possible.

The only correct answer is .

Of the following choices, find a coterminal angle of $\pi$ .

Tap to see back →

In order to find a coterminal angle, simply add or subtract $2\pi$ radians to the given angle as many times as possible.

$\theta=\pi+2\pi k$

The possible angles after adding increments of $2\pi$ radians are:

$\pi, 3\pi,5\pi,7\pi...$

$\theta=\pi-2\pi k$

The possible angles after subtracting decrements of $2\pi$ radians are:

$\pi,-\pi,-3\pi,-5\pi...$

Out of the given possibilities, only $-5\pi$ is a valid answer.

Find the coterminal angle of 15 degrees in standard position from the following answers.

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To determine the coterminal angle, simply add or subtract increments or decrements of 360 degrees to the given angle.

For :

These angles can all be coterminal to 15 degrees. The only answer is .

Which of the following angles is coterminal to ?

Tap to see back →

Which of the following angles is coterminal to ?

Coterminal angles are angles which start and end at the same point. In other words, they share both their starting and ending point. Note, this doesn't require them to be the same angle.

For instance, is coterminal with , because they both start on the positive x-axis, and end at the same place in quadrant 2.

So, we want to find an angle that ends at the same place in quadrant 1 as . Of the answer choices, only 1 ends in quadrant 1, so that one must be our answer:

Find the coterminal angle of 15 degrees.

Tap to see back →

The coterminal angles can be positive or negative. To find the coterminal angles, simply add or subtract 360 degrees as many times as needed from the reference angle.

All of these angles are coterminal angles.

Of the given answers, what of the following is a coterminal angle of $\pi$ radians?

Tap to see back →

To find the coterminal angle of an angle, simply add or subtract $2\pi$ radians, or 360 degrees as many times as needed.

$\pi+2\pi=3\pi$

$\pi-2\pi=-\pi$

$3\pi+2\pi=5\pi$

$-\pi-2\pi=-3\pi$

These are all coterminal angles to $\pi$ radians.

Out of the given answers, $3\pi$ is the only possible answer.

Find the coterminal angle of $10^\circ$ , if possible.

Tap to see back →

In order to find a coterminal angle, or angles of the given angle, simply add or subtract 360 degrees of the terminal angle as many times as possible.

The only correct answer is .

Of the following choices, find a coterminal angle of $\pi$ .

Tap to see back →

In order to find a coterminal angle, simply add or subtract $2\pi$ radians to the given angle as many times as possible.

$\theta=\pi+2\pi k$

The possible angles after adding increments of $2\pi$ radians are:

$\pi, 3\pi,5\pi,7\pi...$

$\theta=\pi-2\pi k$

The possible angles after subtracting decrements of $2\pi$ radians are:

$\pi,-\pi,-3\pi,-5\pi...$

Out of the given possibilities, only $-5\pi$ is a valid answer.

Find the coterminal angle of 15 degrees in standard position from the following answers.

Tap to see back →

To determine the coterminal angle, simply add or subtract increments or decrements of 360 degrees to the given angle.

For :

These angles can all be coterminal to 15 degrees. The only answer is .

Which of the following angles is coterminal to ?

Tap to see back →

Which of the following angles is coterminal to ?

Coterminal angles are angles which start and end at the same point. In other words, they share both their starting and ending point. Note, this doesn't require them to be the same angle.

For instance, is coterminal with , because they both start on the positive x-axis, and end at the same place in quadrant 2.

So, we want to find an angle that ends at the same place in quadrant 1 as . Of the answer choices, only 1 ends in quadrant 1, so that one must be our answer:

Find the coterminal angle of 15 degrees.

Tap to see back →

The coterminal angles can be positive or negative. To find the coterminal angles, simply add or subtract 360 degrees as many times as needed from the reference angle.

All of these angles are coterminal angles.

Of the given answers, what of the following is a coterminal angle of $\pi$ radians?

Tap to see back →

To find the coterminal angle of an angle, simply add or subtract $2\pi$ radians, or 360 degrees as many times as needed.

$\pi+2\pi=3\pi$

$\pi-2\pi=-\pi$

$3\pi+2\pi=5\pi$

$-\pi-2\pi=-3\pi$

These are all coterminal angles to $\pi$ radians.

Out of the given answers, $3\pi$ is the only possible answer.