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Introduction To Trigonometry class 10 | Exercise 8.1 | Part 1 | Q1-Q4 | Class 10 Maths | NCERT

1. In Δ ABC, right-angled at B, AB = 24 cm, BC = 7 cm. Determine :
(i) sin A, cos A
(ii) sin C, cos C
2. In Fig. 8.13, find tan P – cot R.
3. If sin A =3 /4 calculate…

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Very important chapter of Class 10
क्लास 10 के बच्चे इस वीडियो को देखकर अपनी साइंस की पढ़ाई करें और वीडियो को दोस्तों के साथ शेयर करें सब्सक्राइब करना ना भूले!

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Electricity Class 10 | NCERT Solutions for Class 10 Science Electricity | Part 1,

Electricity Class 10 | NCERT Solutions for Class 10 Science Electricity

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Electricity Class 10 | NCERT Solutions Class 10 Science Chapter 12 Electricity | CLASS 10 PHYSICS - YouTube

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Polynomials Class 10 | Exercise 2.3 | ncert solutions for class 10 maths chapter 2 polynomials

Polynomials Class 10 | Exercise 2.3 | ncert solutions for class 10 maths chapter 2 polynomialsDo Subscribe for quality and free educational videos-----------...

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Tomorrow at 5pm polynomials doubt class for 10th

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Tomorrow at 5pm polynomials doubt class for 10th

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Class 9th walon co-ordinate geometry ki video chal rahi hai jaldi online YouTube per aao aur dekho 👍🏻

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coordinate geometry class 9 | Exercise 3.3 | coordinate geometry questions class 9

coordinate geometry class 9 | Exercise 3.3 | coordinate geometry questions class 9 coordinate geometry class 9, coordinate geometry class 9 extra questions, ...

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Trigonometric Functions Class 11 | trigonometry miscellaneous exercise class 11 | Part 3

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Class 10 @Garg tutorials
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Chemical Reactions And Equations Class 10 | Class 10 Chemistry Chapter 1 | Part 1 | BOARD 2021

CHEMICAL REACTION AND EQUATION | Part 1 || Boards 2021 || CLASS 10 CBSE CHAPTER 1 CHEMISTRY Part 1

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Arithmetic Progression Class 10 | Exercise 5.2 |Arithmetic Progression Class 10 NCERT Solution PART3

Arithmetic Progression Class 10 | Exercise 5.2 |Arithmetic Progression Class 10 NCERT Solution PART 3 Q4-Q6

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Lines and Angles Introduction Class 9 | Introduction of Lines and Angles Class 9

Lines and Angles Introduction Class 9 | Introduction of Lines and Angles Class 9 | #1

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Number Systems:

Natural Numbers:
(i) The counting numbers are called Natural numbers.
(ii) The symbol for natural numbers is N.
(iii) N = {1,2,3,4,5....}
(iv) The smallest natural number is 1.

Whole Numbers:
(i) If we include 0 (zero) with the natural numbers, we get Whole numbers.
(ii) The symbol for whole numbers is W.
(iii) W = {0,1,2,3,4,5....}
(iv) The smallest whole number is 0 (zero)

Integers:
(i) If we include opposite of natural numbers with whole numbers, we get Integers.
(ii) The symbol for Integers is Z (or) I
(iii) Z (or) I = {Minus Infinity to Plus Infinity}
(iv) Z (or) I = {....-5,-4,-3,-2,-1,0,1,2,3,4,5....}

Rational Numbers:
(i) If we can write any number in the form a/b (b is not equal to 0), is a Rational number.
(ii) The Symbol for Rational numbers is Q.
(iii) Every Natural numbers, Whole numbers and Integers are also Rational Numbers.
(iv) Every Rational numbers are not Natural numbers, Whole numbers and Integers.
(v) We have two types of Rational numbers.
(a) Terminating Decimal places.
Example: 5/2 = 2.5
(b) Non-Terminating but Repeating Decimal places.
Example: 10/3 = 3.3333333....... and 22/7 = 3.142857 142857 142857........

Irrational Numbers:
(i) Irrational numbers, we can't write in a/b form.
(ii) The Symbol for Irrational numbers is R-Q.
(iii) Irrational numbers has Non-Terminating and Non_Repeating Decimal places.
(iv) Square root p is an irrational number, where p is a prime number.
Example:
square root 2 = 1.414213562373095
square root 3 = 1.732050807568877
Pi = 3.14159265358979

Remember: 22/7 is not equal to Pi.

Real Numbers:
(i) The set of Rational numbers and Irrational numbers are called Real Numbers.
(ii) The Symbol for Real Numbers is R.
(iii) R = {Rational Numbers + Irrational Numbers}
Dear All, Thanks. Be safe. Stay Home. Stay Healthy.

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1. (α+в)²= α²+2αв+в²
2. (α+в)²= (α-в)²+4αв
3. (α-в)²= α²-2αв+в²
4. (α-в)²= (α+в)²-4αв
5. α² + в²= (α+в)² - 2αв.
6. α² + в²= (α-в)² + 2αв.
7. α²-в² =(α + в)(α - в)
8. 2(α² + в²) = (α+ в)² + (α - в)²
9. 4αв = (α + в)² -(α-в)²
10. αв =1. (α + в + ¢)² = α² + в² + ¢² + 2(αв + в¢ + ¢α)
12. (α + в)³ = α³ + 3α²в + 3αв² + в³
13. (α + в)³ = α³ + в³ + 3αв(α + в)
14. (α-в)³=α³-3α²в+3αв²-в³
15. α³ + в³ = (α + в) (α² -αв + в²)
16. α³ + в³ = (α+ в)³ -3αв(α+ в)
17. α³ -в³ = (α -в) (α² + αв + в²)
18. α³ -в³ = (α-в)³ + 3αв(α-в)
ѕιη0° =0
ѕιη30° = 1/2
ѕιη45° = 1/√2
ѕιη60° = √3/2
ѕιη90° = 1
¢σѕ ιѕ σρρσѕιтє σƒ ѕιη
тαη0° = 0
тαη30° = 1/√3
тαη45° = 1
тαη60° = √3
тαη90° = ∞
¢σт ιѕ σρρσѕιтє σƒ тαη
ѕє¢0° = 1
ѕє¢30° = 2/√3
ѕє¢45° = √2
ѕє¢60° = 2
ѕє¢90° = ∞
¢σѕє¢ ιѕ σρρσѕιтє σƒ ѕє¢
2ѕιηα¢σѕв=ѕιη(α+в)+ѕιη(α-в)
2¢σѕαѕιηв=ѕιη(α+в)-ѕιη(α-в)
2¢σѕα¢σѕв=¢σѕ(α+в)+¢σѕ(α-в)
2ѕιηαѕιηв=¢σѕ(α-в)-¢σѕ(α+в)
ѕιη(α+в)=ѕιηα ¢σѕв+ ¢σѕα ѕιηв.
» ¢σѕ(α+в)=¢σѕα ¢σѕв - ѕιηα ѕιηв.
» ѕιη(α-в)=ѕιηα¢σѕв-¢σѕαѕιηв.
» ¢σѕ(α-в)=¢σѕα¢σѕв+ѕιηαѕιηв.
» тαη(α+в)= (тαηα + тαηв)/ (1−тαηαтαηв)
» тαη(α−в)= (тαηα − тαηв) / (1+ тαηαтαηв)
» ¢σт(α+в)= (¢σтα¢σтв −1) / (¢σтα + ¢σтв)
» ¢σт(α−в)= (¢σтα¢σтв + 1) / (¢σтв− ¢σтα)
» ѕιη(α+в)=ѕιηα ¢σѕв+ ¢σѕα ѕιηв.
» ¢σѕ(α+в)=¢σѕα ¢σѕв +ѕιηα ѕιηв.
» ѕιη(α-в)=ѕιηα¢σѕв-¢σѕαѕιηв.
» ¢σѕ(α-в)=¢σѕα¢σѕв+ѕιηαѕιηв.
» тαη(α+в)= (тαηα + тαηв)/ (1−тαηαтαηв)
» тαη(α−в)= (тαηα − тαηв) / (1+ тαηαтαηв)
» ¢σт(α+в)= (¢σтα¢σтв −1) / (¢σтα + ¢σтв)
» ¢σт(α−в)= (¢σтα¢σтв + 1) / (¢σтв− ¢σтα)
α/ѕιηα = в/ѕιηв = ¢/ѕιη¢ = 2я
» α = в ¢σѕ¢ + ¢ ¢σѕв
» в = α ¢σѕ¢ + ¢ ¢σѕα
» ¢ = α ¢σѕв + в ¢σѕα
» ¢σѕα = (в² + ¢²− α²) / 2в¢
» ¢σѕв = (¢² + α²− в²) / 2¢α
» ¢σѕ¢ = (α² + в²− ¢²) / 2¢α
» Δ = αв¢/4я
» ѕιηΘ = 0 тнєη,Θ = ηΠ
» ѕιηΘ = 1 тнєη,Θ = (4η + 1)Π/2
» ѕιηΘ =−1 тнєη,Θ = (4η− 1)Π/2
» ѕιηΘ = ѕιηα тнєη,Θ = ηΠ (−1)^ηα

1. ѕιη2α = 2ѕιηα¢σѕα
2. ¢σѕ2α = ¢σѕ²α − ѕιη²α
3. ¢σѕ2α = 2¢σѕ²α − 1
4. ¢σѕ2α = 1 − ѕιη²α
5. 2ѕιη²α = 1 − ¢σѕ2α
6. 1 + ѕιη2α = (ѕιηα + ¢σѕα)²
7. 1 − ѕιη2α = (ѕιηα − ¢σѕα)²
8. тαη2α = 2тαηα / (1 − тαη²α)
9. ѕιη2α = 2тαηα / (1 + тαη²α)
10. ¢σѕ2α = (1 − тαη²α) / (1 + тαη²α)
11. 4ѕιη³α = 3ѕιηα − ѕιη3α
12. 4¢σѕ³α = 3¢σѕα + ¢σѕ3α

» ѕιη²Θ+¢σѕ²Θ=1
» ѕє¢²Θ-тαη²Θ=1
» ¢σѕє¢²Θ-¢σт²Θ=1
» ѕιηΘ=1/¢σѕє¢Θ
» ¢σѕє¢Θ=1/ѕιηΘ
» ¢σѕΘ=1/ѕє¢Θ
» ѕє¢Θ=1/¢σѕΘ
» тαηΘ=1/¢σтΘ
» ¢σтΘ=1/тαηΘ
» тαηΘ=ѕιηΘ/¢σѕΘ

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Polynomials Class 10 | Maths Chapter 2 Class 10 | Basic Concepts of POLYNOMIALS | NCERT

polynomials class 10 | Class 10 Maths | Basic Concepts of POLYNOMIALS | NCERT maths chapter 2 class 10

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coordinate geometry class 9 | Exercise 3.1 | coordinate geometry questions class 9

coordinate geometry class 9, coordinate geometry class 9 extra questions, coordinate geometry class 9 worksheet pdf, coordinate geometry questions class 9, c...

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coordinate geometry class 9 | Exercise 3.2 | coordinate geometry questions class 9

coordinate geometry class 9,
coordinate geometry class 9 extra questions,
coordinate geometry class 9 worksheet pdf,
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coordinate geometry class 9 | Exercise 3.3 | coordinate geometry questions class 9

coordinate geometry class 9 | Exercise 3.3 | coordinate geometry questions class 9 coordinate geometry class 9, coordinate geometry class 9 extra questions, ...

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Arithmetic Progression Class 10 | Arithmetic Progression Class 10 NCERT Solution | IIT JEE FOUNDATION COURSE FOR CLASS 10: https://www.youtube.com/playlist?list=PL-hYriZY1lNypCI36-Dsz5l8cG49N-xMM

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Arithmetic Progression Class 10 | Arithmetic Progression Class 10 NCERT Solution - YouTube

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