Arctangent example sentences

"Arctangent" Example Sentences

1. The arctangent of a given number can be calculated using a scientific calculator.
2. The arctangent of a complex number is the angle between the positive real axis and the vector representing the complex number.
3. The arctangent of a real number is the angle between the positive real axis and the vector representing the real number.
4. The arctangent function is a periodic function with period π.
5. The arctangent of a negative number is the angle between the positive real axis and the vector representing the negative number.
6. The arctangent of a rational number is the angle between the positive real axis and the vector representing the rational number.
7. The arctangent of a number is the angle between the positive real axis and the vector representing that number.
8. The arctangent of a number can be calculated using the inverse tangent function.
9. The arctangent of a number can be calculated using the inverse trigonometric functions.
10. The arctangent of a number can be calculated using the inverse hyperbolic functions.
11. The arctangent of a number can be calculated using the inverse circular functions.
12. The arctangent of a number can be calculated using the inverse exponential functions.
13. The arctangent of a number can be calculated using the inverse logarithmic functions.
14. The arctangent of a number can be calculated using the inverse power functions.
15. The arctangent of a number can be calculated using the inverse trigonometric identities.
16. The arctangent of a number can be calculated using the inverse hyperbolic identities.
17. The arctangent of a number can be calculated using the inverse circular identities.
18. The arctangent of a number can be calculated using the inverse exponential identities.
19. The arctangent of a number can be calculated using the inverse logarithmic identities.
20. The arctangent of a number can be calculated using the inverse power identities.
21. The arctangent of a number can be calculated by taking the inverse of the tangent function.
22. The arctangent of a number can be calculated by taking the inverse of the trigonometric functions.
23. The arctangent of a number can be calculated by taking the inverse of the hyperbolic functions.
24. The arctangent of a number can be calculated by taking the inverse of the circular functions.
25. The arctangent of a number can be calculated by taking the inverse of the exponential functions.
26. The arctangent of a number can be calculated by taking the inverse of the logarithmic functions.
27. The arctangent of a number can be calculated by taking the inverse of the power functions.
28. The arctangent of a number can be calculated by taking the inverse of the trigonometric identities.
29. The arctangent of a number can be calculated by taking the inverse of the hyperbolic identities.
30. The arctangent of a number can be calculated by taking the inverse of the circular identities.
31. The arctangent of a number can be calculated by taking the inverse of the exponential identities.
32. The arctangent of a number can be calculated by taking the inverse of the logarithmic identities.
33. The arctangent of a number can be calculated by taking the inverse of the power identities.
34. Arctangent is a mathematical function which is used to calculate the angle between two vectors.
35. Arctangent is a mathematical function which is used to calculate the angle between two lines.
36. Arctangent is a mathematical function which is used to calculate the angle between two points.
37. Arctangent is a mathematical function which is used to calculate the angle between two planes.
38. Arctangent is a mathematical function which is used to calculate the angle between two surfaces.
39. Arctangent is a mathematical function which is used to calculate the angle between two curves.
40. Arctangent is a mathematical function which is used to calculate the angle between two shapes.

Common Phases

arctan(x); arctan2(y,x); arctanh(z);