If you’re looking for the degree measure of an angle whose tangent is 5.67, you’re in the right place. Here, you’ll find the answer to this question and a bunch of others.
Answer choice B: 52.5 degree
When it comes to the SAT, the tangent of an angle is one of the most common misconceptions among test takers. The tangent of an angle is the ratio of the length of the opposite side of the angle to the length of the adjacent side of the same angle. This can be calculated by using the half-angle formula. However, this formula isn’t the only method for finding the tangent of an angle. It’s also possible to find the tangent of a number of other angles by using different algebraic methods.
To calculate the tangent of a number of different angles, you can use the p/6 equation. That is, you can get the tangent of an angle by multiplying the top and the bottom by 2 – 2. If you want to do the math yourself, you can use the half-angle formula to solve this problem.
Answer choice C: 63 degree
If you know the tangent to an angle, you can calculate the shortest distance between two points on the side of the angle. When you multiply the tangent by the distance between the two points, you get a value for the length of the segment of the circle that touches the side of the angle in a right angle. For example, let’s say that the shortest distance between point C and side c is 6.9 miles. So the length of the segment that touches the side of the angle is 6.0 miles.
The shortest distance between two points on the side is the length of the segment that intersects the side in a right angle. There are three tangents to two circles that touch externally. These are the tangent to the sine, the tangent to the cosine, and the tangent to the secant. Each of these functions is a vector, meaning that it has magnitude and direction. A tangent can also be calculated by using the half-angle formula.
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