Sir Kiya ap mujhy Bata saghty Hain " cancellation property for addition main 5+3=5+3 in main 3cancel hoo gya 3 main to Kiya hum 5 ko 5 main cancel nhin kar saghty wo bhi to same number hain 😶
Hay Zainab Yusuf symmetric property is a is equal to b then b is equal to a in your question a is 2 and b is 3 thenYES! The examples you provided: 2 + 3 = 5 3 + 2 = 5 Perfectly demonstrate the commutative property (also known as symmetric property) of addition! The commutative property states that: a + b = b + a In your example: a = 2, b = 3 2 + 3 = 5 3 + 2 = 5 The order of the numbers is swapped, and the result remains the same. This shows that addition is commutative. Well done! More examples: 4 + 5 = 5 + 4 = 9 7 + 1 = 1 + 7 = 8 9 + 2 = 2 + 9 = 11 The commutative property applies to: - Addition - Multiplication But not to: - Subtraction (e.g., 2 - 3 ≠ 3 - 2) - Division (e.g., 2 ÷ 3 ≠ 3 ÷ 2) You got it right!
😢The symmetric property, also known as the commutative property, is a fundamental concept in mathematics. *Definition:* The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication. *Mathematical Representation:* a ∘ b = b ∘ a Where: - a and b are operands (numbers or elements) - ∘ represents the operation (addition or multiplication) *Explanation in Words:* "Changing the order of the numbers doesn't change the answer." *Examples:* - Addition: 2 + 3 = 3 + 2 = 5 - Multiplication: 4 × 5 = 5 × 4 = 20 *Real-Life Analogies:* 1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John. 2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order. 3. Travel: Visiting City A then City B is the same as visiting City B then City A. *Key Points:* - Applies to addition and multiplication - Does not apply to subtraction or division - Ensures consistency and predictability in mathematical operations *Symmetric Property in Other Areas:* - Geometry (symmetric shapes) - Algebra (commutative laws) - Set Theory (symmetric difference) The symmetric property simplifies calculations and helps build mathematical structures. The symmetric property, also known as the commutative property, is a fundamental concept in mathematics. *Definition:* The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication. *Mathematical Representation:* a ∘ b = b ∘ a Where: - a and b are operands (numbers or elements) - ∘ represents the operation (addition or multiplication) *Explanation in Words:* "Changing the order of the numbers doesn't change the answer." *Examples:* - Addition: 2 + 3 = 3 + 2 = 5 - Multiplication: 4 × 5 = 5 × 4 = 20 *Real-Life Analogies:* 1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John. 2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order. 3. Travel: Visiting City A then City B is the same as visiting City B then City A. *Key Points:* - Applies to addition and multiplication - Does not apply to subtraction or division - Ensures consistency and predictability in mathematical operations *Symmetric Property in Other Areas:* - Geometry (symmetric shapes) - Algebra (commutative laws) - Set Theory (symmetric difference) The symmetric property simplifies calculations and helps build mathematical structures. Do you have more questions or need further clarification? Do you have more questions or need further clarification? The symmetric property, also known as the commutative property, is a fundamental concept in mathematics. *Definition:* The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication. *Mathematical Representation:* a ∘ b = b ∘ a Where: - a and b are operands (numbers or elements) - ∘ represents the operation (addition or multiplication) *Explanation in Words:* "Changing the order of the numbers doesn't change the answer." *Examples:* - Addition: 2 + 3 = 3 + 2 = 5 - Multiplication: 4 × 5 = 5 × 4 = 20 *Real-Life Analogies:* 1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John. 2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order. 3. Travel: Visiting City A then City B is the same as visiting City B then City A. *Key Points:* - Applies to addition and multiplication - Does not apply to subtraction or division - Ensures consistency and predictability in mathematical operations *Symmetric Property in Other Areas:* - Geometry (symmetric shapes) - Algebra (commutative laws) - Set Theory (symmetric difference) The symmetric property simplifies calculations and helps build mathematical structures. Do you have more questions or need further clarification? Here for ZAINABBB The symmetric property, also known as the commutative property, is a fundamental concept in mathematics. *Definition:* The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication. *Mathematical Representation:* a ∘ b = b ∘ a Where: - a and b are operands (numbers or elements) - ∘ represents the operation (addition or multiplication) *Explanation in Words:* "Changing the order of the numbers doesn't change the answer." *Examples:* - Addition: 2 + 3 = 3 + 2 = 5 - Multiplication: 4 × 5 = 5 × 4 = 20 *Real-Life Analogies:* 1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John. 2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order. 3. Travel: Visiting City A then City B is the same as visiting City B then City A. *Key Points:* - Applies to addition and multiplication - Does not apply to subtraction or division - Ensures consistency and predictability in mathematical operations *Symmetric Property in Other Areas:* - Geometry (symmetric shapes) - Algebra (commutative laws) - Set Theory (symmetric difference) The symmetric property simplifies calculations and helps build mathematical structures. The symmetric property, also known as the commutative property, is a fundamental concept in mathematics. *Definition:* The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication. *Mathematical Representation:* a ∘ b = b ∘ a Where: - a and b are operands (numbers or elements) - ∘ represents the operation (addition or multiplication) *Explanation in Words:* "Changing the order of the numbers doesn't change the answer." *Examples:* - Addition: 2 + 3 = 3 + 2 = 5 - Multiplication: 4 × 5 = 5 × 4 = 20 *Real-Life Analogies:* 1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John. 2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order. 3. Travel: Visiting City A then City B is the same as visiting City B then City A. *Key Points:* - Applies to addition and multiplication - Does not apply to subtraction or division - Ensures consistency and predictability in mathematical operations *Symmetric Property in Other Areas:* - Geometry (symmetric shapes) - Algebra (commutative laws) - Set Theory (symmetric difference) The symmetric property simplifies calculations and helps build mathematical structures. Do you have more questions or need further clarification? Do you have more questions or need further clarification?
W.S Bachay us mai abhi kafi waqt lagay ga. abhi 2.2 per kaam ker raha hoon. phir 10th ki taraf jaonga. us main waqt lagay ga abhi. sorry ! and thanks to comment.
Kamallll🎉🎉🎉may Allah gives you everything 🎉🎉🎉
Thanks sir 🥰
This video is very helpful in my Thursday's Exam
Sir ur teaching method is too good 👍
جزاک اللّٰه
I Wish My School Teacher Would Be Able To Explain Like You.
Same wish🙂😊
Your teaching way is very nice ☺️
Very good 😊 sir
Superb... concept is so clear now😃😃
Nice this presentation is best
It's means alot for us jezakAllah ❤
Sir please make 10 class lectures 🙏🙏🙏🙏🙏
Please 🙏🏻🙏🏻🥺🥺🥺🥺🥺🥺 we are requesting you 🙏🏻🙏🏻🥺🙏🏻🙏🏻🙏🏻🙏🏻
Thankyou sir! very well explained
Thanks you sir for .........this video....
really owesome explanation!
Mashallah sir
Thank you sir
Thanks sir 😊😊
Sir, plz also explain the exercises of NBF new book. This lecture was great.
Well explainrd
Excellent Job Sir...
Best lecture❤️
Good job
Sir thanks a lot for teaching such a good way May Allah give u Jazae Khair
Mujhe wo insan laker do jis ne maths hunary course ka hisa bna dia
Awesome explanation!
Good
Thanks alots sir g
Thank you so much sir g sir g sir g sir g
Thanks alot sir. I am big fan of you🎉🎉
thanks alot sir
Thanku sir
Sir please chapter 6 bhi samjha dein..
6:30
Aslamo alikum bhai ❣️
👍👍👍👍👍👍 sir very nice👌💞
Excellent performance sir
Why u r not making videos on 1st and year maths
👍
Sir you are such a great tutor
Excellent
Sir Kiya ap mujhy Bata saghty Hain " cancellation property for addition main 5+3=5+3 in main 3cancel hoo gya 3 main to Kiya hum 5 ko 5 main cancel nhin kar saghty wo bhi to same number hain 😶
Sir symmetric ko koi two real no sy prove btana
can symmetric property be like 2+3=5 and 3+2=5 both are equal?
Hay Zainab Yusuf symmetric property is a is equal to b then b is equal to a in your question a is 2 and b is 3 thenYES!
The examples you provided:
2 + 3 = 5
3 + 2 = 5
Perfectly demonstrate the commutative property (also known as symmetric property) of addition!
The commutative property states that:
a + b = b + a
In your example:
a = 2, b = 3
2 + 3 = 5
3 + 2 = 5
The order of the numbers is swapped, and the result remains the same. This shows that addition is commutative.
Well done!
More examples:
4 + 5 = 5 + 4 = 9
7 + 1 = 1 + 7 = 8
9 + 2 = 2 + 9 = 11
The commutative property applies to:
- Addition
- Multiplication
But not to:
- Subtraction (e.g., 2 - 3 ≠ 3 - 2)
- Division (e.g., 2 ÷ 3 ≠ 3 ÷ 2)
You got it right!
😢The symmetric property, also known as the commutative property, is a fundamental concept in mathematics.
*Definition:*
The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication.
*Mathematical Representation:*
a ∘ b = b ∘ a
Where:
- a and b are operands (numbers or elements)
- ∘ represents the operation (addition or multiplication)
*Explanation in Words:*
"Changing the order of the numbers doesn't change the answer."
*Examples:*
- Addition: 2 + 3 = 3 + 2 = 5
- Multiplication: 4 × 5 = 5 × 4 = 20
*Real-Life Analogies:*
1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John.
2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order.
3. Travel: Visiting City A then City B is the same as visiting City B then City A.
*Key Points:*
- Applies to addition and multiplication
- Does not apply to subtraction or division
- Ensures consistency and predictability in mathematical operations
*Symmetric Property in Other Areas:*
- Geometry (symmetric shapes)
- Algebra (commutative laws)
- Set Theory (symmetric difference)
The symmetric property simplifies calculations and helps build mathematical structures.
The symmetric property, also known as the commutative property, is a fundamental concept in mathematics.
*Definition:*
The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication.
*Mathematical Representation:*
a ∘ b = b ∘ a
Where:
- a and b are operands (numbers or elements)
- ∘ represents the operation (addition or multiplication)
*Explanation in Words:*
"Changing the order of the numbers doesn't change the answer."
*Examples:*
- Addition: 2 + 3 = 3 + 2 = 5
- Multiplication: 4 × 5 = 5 × 4 = 20
*Real-Life Analogies:*
1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John.
2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order.
3. Travel: Visiting City A then City B is the same as visiting City B then City A.
*Key Points:*
- Applies to addition and multiplication
- Does not apply to subtraction or division
- Ensures consistency and predictability in mathematical operations
*Symmetric Property in Other Areas:*
- Geometry (symmetric shapes)
- Algebra (commutative laws)
- Set Theory (symmetric difference)
The symmetric property simplifies calculations and helps build mathematical structures.
Do you have more questions or need further clarification?
Do you have more questions or need further clarification?
The symmetric property, also known as the commutative property, is a fundamental concept in mathematics.
*Definition:*
The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication.
*Mathematical Representation:*
a ∘ b = b ∘ a
Where:
- a and b are operands (numbers or elements)
- ∘ represents the operation (addition or multiplication)
*Explanation in Words:*
"Changing the order of the numbers doesn't change the answer."
*Examples:*
- Addition: 2 + 3 = 3 + 2 = 5
- Multiplication: 4 × 5 = 5 × 4 = 20
*Real-Life Analogies:*
1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John.
2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order.
3. Travel: Visiting City A then City B is the same as visiting City B then City A.
*Key Points:*
- Applies to addition and multiplication
- Does not apply to subtraction or division
- Ensures consistency and predictability in mathematical operations
*Symmetric Property in Other Areas:*
- Geometry (symmetric shapes)
- Algebra (commutative laws)
- Set Theory (symmetric difference)
The symmetric property simplifies calculations and helps build mathematical structures.
Do you have more questions or need further clarification?
Here for ZAINABBB The symmetric property, also known as the commutative property, is a fundamental concept in mathematics.
*Definition:*
The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication.
*Mathematical Representation:*
a ∘ b = b ∘ a
Where:
- a and b are operands (numbers or elements)
- ∘ represents the operation (addition or multiplication)
*Explanation in Words:*
"Changing the order of the numbers doesn't change the answer."
*Examples:*
- Addition: 2 + 3 = 3 + 2 = 5
- Multiplication: 4 × 5 = 5 × 4 = 20
*Real-Life Analogies:*
1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John.
2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order.
3. Travel: Visiting City A then City B is the same as visiting City B then City A.
*Key Points:*
- Applies to addition and multiplication
- Does not apply to subtraction or division
- Ensures consistency and predictability in mathematical operations
*Symmetric Property in Other Areas:*
- Geometry (symmetric shapes)
- Algebra (commutative laws)
- Set Theory (symmetric difference)
The symmetric property simplifies calculations and helps build mathematical structures.
The symmetric property, also known as the commutative property, is a fundamental concept in mathematics.
*Definition:*
The symmetric property states that the order of the operands (numbers or elements) does not change the result when performing certain operations like addition or multiplication.
*Mathematical Representation:*
a ∘ b = b ∘ a
Where:
- a and b are operands (numbers or elements)
- ∘ represents the operation (addition or multiplication)
*Explanation in Words:*
"Changing the order of the numbers doesn't change the answer."
*Examples:*
- Addition: 2 + 3 = 3 + 2 = 5
- Multiplication: 4 × 5 = 5 × 4 = 20
*Real-Life Analogies:*
1. Seating arrangement: Arranging two people, John and Mary, in a row doesn't change the group. John-Mary = Mary-John.
2. Combining ingredients: Mixing sugar and flour in a recipe yields the same result regardless of the order.
3. Travel: Visiting City A then City B is the same as visiting City B then City A.
*Key Points:*
- Applies to addition and multiplication
- Does not apply to subtraction or division
- Ensures consistency and predictability in mathematical operations
*Symmetric Property in Other Areas:*
- Geometry (symmetric shapes)
- Algebra (commutative laws)
- Set Theory (symmetric difference)
The symmetric property simplifies calculations and helps build mathematical structures.
Do you have more questions or need further clarification?
Do you have more questions or need further clarification?
Sir cancellation ma tuo 2 opposite sign cancel Hoti hai na kindly ye clear Karwa dein
AOA, Sir □▪︎When u r going to upload 9.3 part 2?□
W.S
Bachay us mai abhi kafi waqt lagay ga. abhi 2.2 per kaam ker raha hoon. phir 10th ki taraf jaonga. us main waqt lagay ga abhi. sorry ! and thanks to comment.
@@IMWaqasNasir it's OK! Take your time & •~thank-you~•♡ for always helping the students.
Kal subha nashta kar Kay aram say 11 bajaye lagayey gaa tab tak wait karo😂
Aram say Osman gazi drama dekho
@@MuscovyDuck596 Yes bro mazay karo
17:03
AoA...sir additive property may hum additive inverse kiu add kertay hain koi positive value kiu nhi add kerte
Koss add kar 😂😂😂😆
Sir please board ka paper pattern bhi batain.
Sir app theorams ki vid Q upload nahi karthay
sir class 10 exercise 3.3 kb upload kare ge
Is -3 greater than 5
No cuz negative numbers are always smaller however positive numbers are greater
Sir grade 9 th maths ka theorems ki videos upload karo hummay theorms ki samaj nahi aathi hai
Ap kisi or teacher.sy samajh lain.
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