Euclid's Geometry - Axioms - Part 1 | Don't Memorise

Infinity Learn NEET

30 Oct 201903:06

Summary

TLDRIn this video, Euclid introduces axioms, fundamental truths that do not require proof, and explains their role in geometry. The first three axioms are outlined: 1) Things equal to the same thing are equal to each other. 2) If equals are added to equals, the wholes are equal. 3) If equals are subtracted from equals, the remainders are equal. These axioms form the foundation for understanding geometric principles and help in proving more complex geometric theorems. The video provides relatable examples to clarify these abstract concepts, setting the stage for deeper learning in mathematics.

Takeaways

😀 Euclid's axioms are fundamental assumptions in geometry that do not require proof.
😀 An axiom is a universally true statement accepted without proof, like the fact that humans have one brain.
😀 Euclid's axioms extend beyond geometry and are applicable throughout mathematics.
😀 The first axiom states that things equal to the same thing are equal to one another.
😀 An example of the first axiom: if two people have the same amount of money and buy different items, the value of those items can be compared.
😀 The second axiom says that if equals are added to equals, the wholes are equal.
😀 A real-life example of the second axiom involves adding the values of items purchased to show equivalency in total cost.
😀 The third axiom asserts that if equals are subtracted from equals, the remainders are equal.
😀 The third axiom can be explained by subtracting equal amounts from two sets, leading to equal remainders.
😀 The script introduces Euclid's axioms as tools for understanding and proving complex geometric concepts in future lessons.

Q & A

What are axioms in Euclid's geometry?
-Axioms are universally true statements that do not require proof. They are basic principles assumed to be true and serve as the foundation for further reasoning in geometry and other areas of mathematics.
Can axioms be applied outside geometry?
-Yes, axioms are not restricted to geometry alone. They can be applied throughout mathematics and help in proving and understanding complex concepts.
What is the first axiom mentioned in the video?
-The first axiom is: 'Things which are equal to the same thing are equal to one another.' This means if two things are both equal to a third thing, they must be equal to each other.
Can you explain the first axiom with an example?
-Sure! If Bob and Rob both have five rupees and buy different items (Bob buys a pen for five rupees and Rob buys two candies for the same price), then the cost of one pen is equal to the cost of two candies. This shows that if 'A' equals 'B' and 'B' equals 'C', then 'A' equals 'C'.
What does the second axiom state?
-The second axiom states: 'If equals are added to equals, then the wholes are equal.' This means that if two quantities are equal and you add the same amount to both, the sums will also be equal.
How can the second axiom be explained with an example?
-Imagine you buy two candies for five rupees and a pen for seven rupees. If you add the two together, for a total of twelve rupees, you will get two candies and one pen. This shows that 'A + B = C + D' when 'A = C' and 'B = D'.
What is the third axiom mentioned in the video?
-The third axiom states: 'If equals are subtracted from equals, then the remainders are equal.' In other words, if two quantities are equal and you subtract the same amount from both, the differences will also be equal.
Can you give an example to explain the third axiom?
-If 'A' is equal to 'C' and 'B' is equal to 'D', then subtracting 'B' from 'A' and 'D' from 'C' will result in equal remainders. For instance, if 'A = C' and 'B = D', then 'A - B = C - D'.
Why are axioms important in understanding geometry?
-Axioms are crucial because they provide the foundational truths from which geometric principles and theorems can be derived. They allow us to understand and prove complex concepts in geometry.
Will the remaining axioms be explained later in the video?
-Yes, the remaining four axioms will be explained in the next part of the video.