Řešení - Trigonometry

The period of trigonometric functions is 360 degrees.

$$\cot \left(630°\right)=\cot \left(630-360°\right)$$

Subtracting one integer from another.

$$\cot \left(630-360°\right)=\cot \left(270°\right)$$

Reflecting the number with respect to 360 degrees.

$$\cot \left(270°\right)=\cot \left(360-90°\right)$$

The period of trigonometric functions is 360 degrees.

$$\cot \left(360-90°\right)=\cot \left(360-90-360°\right)$$

Removing or simplifying the same numbers on the top and bottom of a fraction.

$$\cot \left(360-90-360°\right)=\cot \left(-90°\right)$$

The cotangent of an angle is equal to the cosine of the angle divided by the sine of the angle.

$$\cot \left(-90°\right)=\frac{\cos \left(-90°\right)}{\sin \left(-90°\right)}$$

Computing the cosine of a negative angle.

$$\frac{\cos \left(-90°\right)}{\sin \left(-90°\right)}=\frac{\cos \left(90°\right)}{\sin \left(-90°\right)}$$

Computing the sine of a negative angle.

$$\frac{\cos \left(90°\right)}{\sin \left(-90°\right)}=\frac{\cos \left(90°\right)}{-\sin \left(90°\right)}$$

Placing the minus sign in front of a fraction.

$$\frac{\cos \left(90°\right)}{-\sin \left(90°\right)}=-\frac{\cos \left(90°\right)}{\sin \left(90°\right)}$$

The cotangent of an angle is equal to the cosine of the angle divided by the sine of the angle.

$$-\frac{\cos \left(90°\right)}{\sin \left(90°\right)}=-\cot \left(90°\right)$$

The cotangent of an angle is equal to the cosine of the angle divided by the sine of the angle.

$$\cot \left(90°\right)=\frac{\cos \left(90°\right)}{\sin \left(90°\right)}$$

Computing the cosine of 90 degrees.

$$\frac{\cos \left(90°\right)}{\sin \left(90°\right)}=\frac{0}{\sin \left(90°\right)}$$

Computing the sine of 90 degrees.

$$\frac{0}{\sin \left(90°\right)}=\frac{0}{1}$$

The fraction equals zero if its numerator is zero.

$$\frac{0}{1}=0$$