100 Examples of sentences containing the common noun "theorem"

Definition

A theorem is a statement or proposition that has been proven on the basis of previously established statements or other theorems, particularly in mathematics and logic. Theorems serve as foundational truths within a logical framework.

Synonyms

• Proposition
• Assertion
• Hypothesis
• Principle
• Claim
• Rule

Antonyms

• Contradiction
• Fallacy
• Refutation
• Denial

Examples

1. The mathematician theorem that all even numbers greater than two can be expressed as the sum of two primes.
2. Many students struggle to understand why the theorem is important in solving complex problems.
3. The Pythagorean theorem is essential for calculating the lengths of sides in a right triangle.
4. Researchers continue to explore the implications of the theorem in various scientific fields.
5. The professor explained the theorem with a simple diagram on the board.
6. In a rigorous proof, every step must be justified to support the theorem being established.
7. The theorem suggests that under certain conditions, certain outcomes are predictable.
8. She was excited to finally prove the theorem she had been working on for months.
9. The theorem has practical applications in engineering and technology.
10. They discussed the theorem during the seminar, and many found it enlightening.
11. The theorem is often used as a stepping stone to more advanced concepts in mathematics.
12. A counterexample can be used to disprove a proposed theorem.
13. He derived the theorem from earlier work in the field.
14. The theorem has been widely accepted in the mathematical community.
15. To fully grasp the theorem, one must understand its underlying principles.
16. The theorem was a major breakthrough in the study of topology.
17. Students often memorize the theorem without understanding its proof.
18. The theorem can be applied to real-world situations, enhancing its relevance.
19. She introduced a new theorem that challenged existing theories.
20. The theorem is a cornerstone of modern algebra.
21. His paper presented a novel approach to the theorem.
22. The theorem was instrumental in advancing their research findings.
23. Can you explain how you arrived at that theorem?
24. The complexity of the theorem requires a deep understanding of the subject.
25. The theorem has numerous proofs, each illustrating a different aspect.
26. The theorem was first proposed by a mathematician in the 18th century.
27. We can theorem that the results are consistent across various experiments.
28. The implications of the theorem extend beyond mathematics.
29. She found a flaw in the proposed theorem during her review.
30. The theorem has been tested under various conditions.
31. Many mathematicians have tried to simplify the theorem for better understanding.
32. The theorem can help in predicting future trends based on historical data.
33. Understanding the theorem requires a grasp of several related concepts.
34. The theorem is often a topic of debate among scholars.
35. They derived the theorem from their extensive research in the field.
36. The theorem was celebrated at the conference for its innovative approach.
37. His explanation of the theorem made it accessible to all attendees.
38. The theorem serves as a guideline for further studies.
39. Once you understand the theorem, applying it becomes easier.
40. The team's findings support the validity of the theorem.
41. An elegant proof can enhance the appreciation of a theorem.
42. The theorem has changed the way we think about the subject.
43. She wrote a thesis focusing on applications of the theorem.
44. The theorem can be visualized through geometric representations.
45. A deep dive into the theorem revealed unexpected connections.
46. The theorem provides a framework for understanding complex relationships.
47. Understanding the theorem is crucial for advanced studies in mathematics.
48. They collaborated to prove the theorem under different conditions.
49. The theorem is often a prerequisite for higher-level mathematics courses.
50. The historical context of the theorem adds depth to its significance.
51. His lecture on the theorem captivated the audience.
52. The theorem has implications in both pure and applied mathematics.
53. She used the theorem to solve a challenging problem in her research.
54. The theorem inspired a new generation of mathematicians.
55. They published their findings on the theorem in a leading journal.
56. The theorem is considered a benchmark in the field.
57. Many examples illustrate the application of the theorem.
58. The theorem can simplify complex equations significantly.
59. She offered a comprehensive analysis of the theorem.
60. The theorem remains relevant despite advancements in technology.
61. Understanding the theorem allows for greater insight into related topics.
62. The theorem has been refined over centuries of mathematical inquiry.
63. He presented the theorem with clarity and enthusiasm.
64. The theorem serves as a foundational element in the course.
65. A misunderstanding of the theorem can lead to errors in calculations.
66. The theorem challenges traditional notions in the field.
67. Their research aims to validate the theorem through experiments.
68. The theorem illustrates the beauty of mathematical logic.
69. The theorem is often used as a teaching tool in classrooms.
70. Many mathematicians have dedicated their careers to studying the theorem.
71. The theorem provides a method for solving intricate puzzles.
72. The simplicity of the theorem belies its profound implications.
73. Scholars continue to discuss the implications of the theorem.
74. The theorem has stood the test of time in mathematical literature.
75. His work on the theorem paved the way for further discoveries.
76. The theorem can be applied in various mathematical disciplines.
77. The theorem is often illustrated with practical examples.
78. Their findings challenge the assumptions underlying the theorem.
79. The theorem is a subject of intense scrutiny in academic circles.
80. New technologies have enabled deeper exploration of the theorem.
81. The theorem is frequently referenced in academic papers.
82. She made a compelling argument for the relevance of the theorem.
83. The theorem has been adapted to fit modern computational methods.
84. The theorem fosters critical thinking and problem-solving skills.
85. He encountered difficulties while attempting to prove the theorem.
86. The theorem has inspired numerous research initiatives.
87. They are currently working on an extension of the theorem.
88. The theorem can be illustrated through various mathematical models.
89. Many students find the theorem challenging yet rewarding to learn.
90. The theorem offers a unique perspective on the problem.
91. The implications of the theorem are far-reaching.
92. The theorem serves as a reference point for future research.
93. A thorough understanding of the theorem is essential for practitioners.
94. The theorem was developed in response to a specific problem.
95. Critics have raised questions about the validity of the theorem.
96. The theorem has become a standard in academic discourse.
97. She wrote a detailed report on the findings related to the theorem.
98. The theorem has a rich history that reflects its importance.
99. The theorem can be expressed in several different forms.
100. His book focuses on the implications of the theorem in contemporary science.