Which Negative Angle Is Equivalent To $275^{\circ}$?A. − 85 ∘ -85^{\circ} − 8 5 ∘ B. − 65 ∘ -65^{\circ} − 6 5 ∘ C. − 75 ∘ -75^{\circ} − 7 5 ∘ D. − 95 ∘ -95^{\circ} − 9 5 ∘

Introduction

In trigonometry, angles can be measured in both positive and negative directions. A negative angle is equivalent to a positive angle measured in the opposite direction. In this article, we will explore how to find the equivalent negative angle for a given positive angle.

What are Negative Angles?

A negative angle is an angle that is measured in the opposite direction of a positive angle. For example, if we have a positive angle of $30^{\circ}$, the equivalent negative angle would be $-30^{\circ}$. This means that if we were to measure an angle of $-30^{\circ}$, we would be measuring it in the opposite direction of $30^{\circ}$.

How to Find the Equivalent Negative Angle

To find the equivalent negative angle for a given positive angle, we need to subtract the positive angle from $360^{\circ}$. This will give us the equivalent negative angle.

Formula

The formula to find the equivalent negative angle is:

$$\text{Negative Angle} = 360^{\circ} - \text{Positive Angle}$$

Example

Let's say we want to find the equivalent negative angle for $275^{\circ}$. We can use the formula above to find the equivalent negative angle.

$$\text{Negative Angle} = 360^{\circ} - 275^{\circ}$$

$$\text{Negative Angle} = 85^{\circ}$$

However, since we are looking for the equivalent negative angle, we need to subtract $85^{\circ}$ from $360^{\circ}$.

$$\text{Negative Angle} = 360^{\circ} - 85^{\circ}$$

$$\text{Negative Angle} = -85^{\circ}$$

Conclusion

In conclusion, to find the equivalent negative angle for a given positive angle, we need to subtract the positive angle from $360^{\circ}$. This will give us the equivalent negative angle. In the case of $275^{\circ}$, the equivalent negative angle is $-85^{\circ}$.

Which Negative Angle is Equivalent to $275^{\circ}$?

Based on our calculation above, the equivalent negative angle for $275^{\circ}$ is $-85^{\circ}$. Therefore, the correct answer is:

• A. $-85^{\circ}$

Why is this the Correct Answer?

This is the correct answer because we calculated the equivalent negative angle for $275^{\circ}$ using the formula above. We subtracted $275^{\circ}$ from $360^{\circ}$ to get $85^{\circ}$, and then subtracted $85^{\circ}$ from $360^{\circ}$ to get $-85^{\circ}$.

Comparison with Other Options

Let's compare our answer with the other options:

• B. $-65^{\circ}$: This is not the correct answer because we calculated the equivalent negative angle for $275^{\circ}$ as $-85^{\circ}$, not $-65^{\circ}$.
• C. $-75^{\circ}$: This is not the correct answer because we calculated the equivalent negative angle for $275^{\circ}$ as $-85^{\circ}$, not $-75^{\circ}$.
• D. $-95^{\circ}$: This is not the correct answer because we calculated the equivalent negative angle for $275^{\circ}$ as $-85^{\circ}$, not $-95^{\circ}$.

Conclusion

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Q: What is the difference between a positive angle and a negative angle?

A: A positive angle is an angle that is measured in a counterclockwise direction, while a negative angle is an angle that is measured in a clockwise direction.

Q: How do I find the equivalent negative angle for a given positive angle?

A: To find the equivalent negative angle, you need to subtract the positive angle from 360°. This will give you the equivalent negative angle.

Q: What is the formula to find the equivalent negative angle?

A: The formula to find the equivalent negative angle is:

$$\text{Negative Angle} = 360^{\circ} - \text{Positive Angle}$$

Q: Can I use a calculator to find the equivalent negative angle?

A: Yes, you can use a calculator to find the equivalent negative angle. Simply enter the positive angle and subtract it from 360°.

Q: What if I want to find the equivalent negative angle for an angle greater than 360°?

A: If you want to find the equivalent negative angle for an angle greater than 360°, you need to subtract the angle from 360° twice. For example, if you want to find the equivalent negative angle for 725°, you would subtract 725° from 360° twice:

$$\text{Negative Angle} = 360^{\circ} - 725^{\circ}$$

$$\text{Negative Angle} = -365^{\circ}$$

Q: Can I use the equivalent negative angle formula for angles less than 0°?

A: Yes, you can use the equivalent negative angle formula for angles less than 0°. Simply add 360° to the angle to get the equivalent positive angle, and then subtract the positive angle from 360° to get the equivalent negative angle.

Q: What if I want to find the equivalent negative angle for an angle in radians?

A: If you want to find the equivalent negative angle for an angle in radians, you need to convert the angle from radians to degrees first. You can use the following formula to convert radians to degrees:

$$\text{Degrees} = \text{Radians} \times \frac{180^{\circ}}{\pi}$$

Once you have the angle in degrees, you can use the equivalent negative angle formula to find the equivalent negative angle.

Q: Can I use the equivalent negative angle formula for angles in other units, such as gradians or mils?

A: Yes, you can use the equivalent negative angle formula for angles in other units, such as gradians or mils. However, you need to convert the angle to degrees first before using the formula.

Q: What if I want to find the equivalent negative angle for an angle that is a multiple of 360°?

A: If you want to find the equivalent negative angle for an angle that is a multiple of 360°, you can simply subtract the multiple of 360° from the angle to get the equivalent negative angle.

Q: Can I use the equivalent negative angle formula for angles that are not integers?

A: Yes, you can use the equivalent negative angle formula for angles that are not integers. Simply perform the subtraction operation as usual, and you will get the equivalent negative angle.

Conclusion

In conclusion, the equivalent negative angle formula is a useful tool for finding the equivalent negative angle for a given positive angle. By following the steps outlined above, you can easily find the equivalent negative angle for any angle, regardless of whether it is an integer or not.