How do you find tan cot?

The tangent of x is defined to be its sine divided by its cosine: tan x = sin x cos x . The cotangent of x is defined to be the cosine of x divided by the sine of x: cot x = cos x sin x .

How do you find the cot of a degree?

The cotangent of an angle in a right triangle is a relationship found by dividing the length of the side adjacent to the given angle by the length of the side opposite to the given angle. This is the reciprocal of the tangent function.

What is the exact value of tan 105?

Tan 105 degrees is the value of tangent trigonometric function for an angle equal to 105 degrees. The value of tan 105° is -2 – √3 or -3.7321 (approx).

How do you find tan B?

In this case, the leg opposite to B is 36 units long and the leg adjacent to B is 15 units long. Simplify the fraction by dividing the numerator and denominator by the common factor, which is 3. Therefore tan B = 12/5.

How to solve cot(Theta) = 1 cot (θ)?

Solve for? cot (theta)=1 cot (θ) = 1 cot (θ) = 1 Take the inverse cotangent of both sides of the equation to extract θ θ from inside the cotangent. θ = arccot(1) θ = arccot (1)

How do you find the absolute value of cot(θ)?

Tap for more steps… The absolute value is the distance between a number and zero. The distance between 0 0 and 1 1 is 1 1. Divide π π by 1 1. The period of the cot(θ) cot ( θ) function is π π so values will repeat every π π radians in both directions.

How do you find the value of arccot(1) from cotangent?

Take the inverse cotangent of both sides of the equation to extract θ θ from inside the cotangent. The exact value of arccot(1) arccot ( 1) is π 4 π 4.

What are the six trig functions of θ?

The six trig functions of θ are defined as follows, using the circle above: tan , 0 cot , 0 cos sec , 0 sin csc , 0 = ≠ = ≠ = = ≠ = = ≠ y y x x x y x x r r x y y r r y θ θ θ θ θ θ If θ is a first quadrant angle, these definitions are consistent with the definitions given in Section 4.1. 6