- #1
Himal kharel
- 79
- 0
let a=b
a2=ab
a2-b2=ab-b2
(a+b)(a-b)=b(a-b)
a+b=b
a+a=a<from above>
2a=a
2=1
PROVED
a2=ab
a2-b2=ab-b2
(a+b)(a-b)=b(a-b)
a+b=b
a+a=a<from above>
2a=a
2=1
PROVED
Himal kharel said:let a=b
a2=ab
a2-b2=ab-b2
(a+b)(a-b)=b(a-b)
a+b=b
a+a=a<from above>
2a=a
2=1
PROVED
No, it is not possible to prove that 2 equals 1. This is a mathematical impossibility and goes against the basic principles of arithmetic. Any attempt to prove this would result in a logical contradiction.
Proving 2=1 is considered a "crazy question" because it goes against the most fundamental principles of mathematics. The concept of equality is a fundamental and indisputable concept in mathematics and attempting to prove that 2 equals 1 would result in a contradiction.
Some common mistakes people make when trying to prove 2=1 include using faulty logic, manipulating equations incorrectly, or making assumptions that are not true. Ultimately, all attempts to prove this will result in a logical contradiction.
No, there is no practical application for attempting to prove 2=1. This question is purely theoretical and has no real-world implications or applications.
Attempting to prove 2=1 can serve as a lesson in logic and critical thinking. It can also highlight the importance of understanding and following mathematical principles and rules. Additionally, it can demonstrate the limitations of mathematical systems and the importance of questioning and testing assumptions.