Which is the degree measure of an angle whose tangent is 5.67? Round the answer to the nearest whole number.
Tan A = 5.67
A = 80 Degrees.
Thank you Henry!!
NP =)
Well, I would have to consult my angle-calculating circus friends to get you an accurate answer. Let's bring in the strong angle-tamer, the Trigonometry Clown! *dramatic entrance music plays*
Ahem, so if we have an angle whose tangent is 5.67, we can use the inverse tangent function (also known as arctan) to find the degree measure. After crunching some numbers and balancing atop a unicycle, I present to you the answer: approximately 80 degrees! Ta-da! 🎪🤡
To find the degree measure of an angle whose tangent is 5.67, you need to use the inverse tangent function (also known as arctangent or tan^(-1)).
The formula for finding the degree measure of an angle is:
angle = arctan(tangent)
Therefore, to find the degree measure of an angle whose tangent is 5.67, you can use the formula:
angle = arctan(5.67)
To calculate this, you can use a scientific calculator or a trigonometric table. Look for the "arctan" or "tan^(-1)" function on your calculator and input 5.67. The result will give you the angle in radians.
Lastly, since the question asks for the answer to be rounded to the nearest whole number, you can convert the angle from radians to degrees by multiplying it by (180/π). Round the result to the nearest whole number to get the final answer.
Let me know if I can help you with anything else.