100 Examples of sentences containing the common noun "sine"

Definition

"Sine" is a mathematical term that refers to the ratio of the length of the side opposite an angle in a right triangle to the length of the hypotenuse. It is a fundamental function in trigonometry, often denoted as sin(θ), where θ represents an angle.

Synonyms

• None (as "sine" is a specific mathematical term)

Antonyms

• None (as "sine" is a specific mathematical term)

Examples

1. The sine of 30 degrees is sine.
2. To find the sine, you must first identify the right triangle.
3. In trigonometry, the sine function is essential for calculations.
4. The sine wave is a graphical representation of the sine function.
5. The sine of an angle can be calculated using a calculator.
6. In physics, we often use sine when dealing with wave functions.
7. You can use the sine rule to solve for unknown sides in a triangle.
8. The sine table provides values for various angles.
9. To graph the sine function, plot points based on sine values.
10. The sine function oscillates between -1 and 1.
11. When the angle increases, the sine value changes.
12. The sine of 90 degrees is equal to one.
13. Understanding sine is crucial for advanced mathematics.
14. I need to calculate the sine for my physics homework.
15. The sine curve is smooth and continuous.
16. Trigonometric identities often involve sine.
17. The unit circle helps visualize sine values.
18. You can derive the sine using Taylor series.
19. The sine function is periodic with a period of 2π.
20. In calculus, we differentiate the sine function.
21. The sine of 45 degrees is √2/2.
22. The sine wave is used in sound wave analysis.
23. To solve for the angle, find the sine inverse.
24. The sine function can describe wave motion.
25. I learned how to compute the sine in math class.
26. Sine is used in various engineering applications.
27. The sine graph shows a repeating pattern.
28. You can compare sine values using a calculator.
29. The sine of an obtuse angle is negative.
30. In computer graphics, sine functions help create smooth curves.
31. The sine function is defined for all real numbers.
32. The sine of 0 degrees is zero.
33. Memorizing sine values can help in exams.
34. Sine is related to cosine through a phase shift.
35. I often use sine to analyze periodic phenomena.
36. The sine value tells us about the height in a triangle.
37. Trigonometric functions like sine are foundational in math.
38. The sine function can be represented as a series.
39. In statistics, sine functions can model cyclic data.
40. The sine wave is essential in electrical engineering.
41. You can find the sine using the Pythagorean theorem.
42. The sine function is often introduced in high school math.
43. Sine is applicable in navigation and geography.
44. To visualize sine, draw a unit circle.
45. The sine law can help in solving triangle problems.
46. The sine function varies smoothly as the angle changes.
47. You can calculate sine values for angles in radians.
48. The sine function can be graphed on a Cartesian plane.
49. Sine is a key concept in understanding oscillations.
50. I practiced finding sine values for different angles.
51. The sine function is widely used in physics.
52. The sine of an angle corresponds to its vertical position.
53. Understanding sine is important for trigonometry.
54. The sine graph crosses the origin.
55. You can use sine to find the height of a triangle.
56. Sine values can be negative in certain quadrants.
57. The sine function is used in simulations of waves.
58. I calculated the sine for the angle given in the problem.
59. The sine function has specific properties to remember.
60. The sine of angles beyond 180 degrees cycles back.
61. The sine of a complementary angle relates to cosine.
62. I drew the sine wave to understand its properties.
63. The sine function is essential for understanding harmonic motion.
64. You can find sine values in mathematical tables.
65. The sine function helps in solving real-world problems.
66. I need to graph the sine function for my project.
67. The sine function is often used in music theory.
68. You can approximate sine values using small-angle formulas.
69. The sine of 270 degrees is negative one.
70. The sine curve can be shifted horizontally.
71. In physics, we often examine sine waves in sound.
72. The sine function demonstrates how angles relate to triangles.
73. The sine of a full rotation is zero.
74. I analyzed the sine function for periodic behavior.
75. The sine function can be used to model tides.
76. The sine graph is symmetrical about the origin.
77. I encountered sine in my calculus courses.
78. The sine of 60 degrees is equal to √3/2.
79. The sine function is a vital part of wave theory.
80. Understanding sine helps with wave interference problems.
81. The sine function is used in many engineering fields.
82. I graphed the sine function to visualize its behavior.
83. The sine function is critical for understanding circular motion.
84. The sine of 120 degrees is negative.
85. I practiced solving equations involving sine.
86. The sine function can be found using a unit circle.
87. Trigonometric equations often require sine calculations.
88. The sine of 180 degrees is zero.
89. The sine function demonstrates the relationship between angles and sides.
90. I learned how to derive sine values for different angles.
91. The sine function can be used to solve for unknowns in triangles.
92. The sine wave is crucial for understanding sound waves.
93. The sine function provides insight into periodic functions.
94. I calculated the sine to determine the height of the triangle.
95. The sine of an angle can be positive or negative.
96. The sine function is important in the study of oscillations.
97. The sine of 360 degrees returns to zero.
98. I often use sine in my engineering calculations.
99. The sine function is fundamental in physics and engineering.
100. The sine values can be derived from the unit circle definition.