which is the degree measure of an angle whose tangent is 567

If you are trying to determine which is the degree measure of an angle whose tangent is 5.67, you will find that there are a number of different options to choose from. Some of these options are 45 degrees, 52.5 degrees, and 63 degrees.

Answer choice C: 63 degree

If you have been asked to find the degree of an angle whose tangent is 5,67 degrees, there are two possible answers: 65 and 52.5 degrees. Both of these answers are correct, but they are slightly different. What you need to do is look at the magnitude and direction of the vector. This is done by adding the two vectors. For example, if a student has 40 and 75 degree vectors, the magnitude of the answer choice would be between 1 and 7 m.

The other possible answer is the same, but it has a different magnitude. When the equation is solved, it is found that the shortest distance from point C to side c is 6.9 miles. In this case, a segment of side a and c never meet.

Another way to find the answer is to divide the tangent by the sine and cosine. You can do this by multiplying the top and bottom by 2 – 2. Once this is done, you can use the half-angle formula to find the shortest distance between point C and side c.

Chelsea Glover