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Let's Unlock Maths
India
เข้าร่วมเมื่อ 16 มิ.ย. 2020
This educational channel is for creating interest in learning Mathematics. The aim is to make understand the concepts of Mathematics in simple way.
Best Wishes for Happy Learning.
Keep your love and support:)
Thank You!
Best Wishes for Happy Learning.
Keep your love and support:)
Thank You!
Find cosA.cosB || Find sinA.sinB || Find factorization formulae cosA + cosB and cosA - cosB
On silent mode , here we have the proof of defactorization formulae
1) cosA. cosB 2) sinA. sinB
and factorization formulae 1) cosA + cosB 2) cosA - cosB.
This proof is given to recall the formulae.
1) cosA. cosB 2) sinA. sinB
and factorization formulae 1) cosA + cosB 2) cosA - cosB.
This proof is given to recall the formulae.
มุมมอง: 79
วีดีโอ
Example Leibnitz's Theorem || Detailed Solution ||Successive Differentiation
มุมมอง 32510 หลายเดือนก่อน
Example Leibnitz's Theorem || Detailed Solution || Solution for Beginner
Leibnitz's Theorem || Successive differentiation
มุมมอง 80210 หลายเดือนก่อน
Here we have discussed Leibnitz's Theorem for Successive differentiation.
To find SinA.CosB |To find CosA.SinB | To find SinA+SinB |To find SinA-SinB |Factorization Formulae
มุมมอง 5310 หลายเดือนก่อน
Here we find defactorization formulae 1.SinA.CosB 2. CosA.SinB and factorization formulae 1.SinA SinB 2. SinA-SinB
Binary Operation in Set Theory || Binary operation ||
มุมมอง 11911 หลายเดือนก่อน
Binary Operation in Set Theory || Binary operation ||
Semigroup || Natural Number set is semigroup or not?
มุมมอง 10711 หลายเดือนก่อน
Here we discussed semigroup with examples.
Groupoid || Quasi Group|| Binary operation || Groupoid with examples
มุมมอง 78911 หลายเดือนก่อน
Here we introduced the concept of Groupoid. We tried it to understand with set of natural number and set of integer.
Solution of differential Equation Laplace Transform || Application of Laplace Transform
มุมมอง 584ปีที่แล้ว
Here we applied Laplace Transform for finding solution of differential Equation.
Hyperbolic Identity sinhx.coshy and Hyperbolic Identity coshx.sinhy
มุมมอง 45ปีที่แล้ว
Hyperbolic Identity sinhx.coshy and Hyperbolic Identity coshx.sinhy
Inverse Laplace Transform by Convolution Theorem for for finding (s+3)^2/(s^2+6s+5)^2
มุมมอง 3.5Kปีที่แล้ว
Here we have discussed Convolution Theorem for Inverse Laplace Transform for finding (s 3)^2/(s^2 6s 5)^2 Please Watch out the below mentioned video for Hyperbolic Identity coshx.coshy th-cam.com/video/bNocr_2HX9U/w-d-xo.html
Inverse Laplace Transform by Convolution Theorem for s^2/(s^2-a^2)^2
มุมมอง 3.9Kปีที่แล้ว
Here we have find Inverse Laplace Transform of s^2/(s^2-a^2)^2by Convolution Theorem . Please Watch out the below mentioned video for Hyperbolic Identity coshx.coshy th-cam.com/video/bNocr_2HX9U/w-d-xo.html
Hyperbolic Identity sinh(x+y) and sinh(x-y)
มุมมอง 69ปีที่แล้ว
Here we have proof of Hyperbolic Identity sinh(x y) and sinh(x-y) (on silent mode.)
Hyperbolic Identity coshx .coshy and sinhx.sinhy
มุมมอง 66ปีที่แล้ว
Here we have proof of Hyperbolic Identity coshx.coshy and sinhx.sinhy (on silent mode.)
Hyperbolic Identity cosh(x+y) and cosh(x-y)
มุมมอง 107ปีที่แล้ว
Here we have proof of Hyperbolic Identity cosh(x y) and cosh(x-y) (on silent mode.)
Inverse Laplace Transform by Convolution Theorem || Inverse Laplace Transform of 1/(s-a)(s+ a)^2
มุมมอง 4.6Kปีที่แล้ว
Here we have find Inverse Laplace Transform of 1/(s-a)(s a)^2 by Convolution Theorem . Please Watch out the below mentioned videos for First Shifting Property of Inverse Laplace Transform : th-cam.com/video/w7rfO98EYV8/w-d-xo.html Special Credit : Family for being on Silent Mode till shooting . Thanks for Watching.. Lets Unlock Maths..
nth derivative of Rational function || Successive differentiation of Proper Rational function ||
มุมมอง 1.2Kปีที่แล้ว
nth derivative of Rational function || Successive differentiation of Proper Rational function ||
nth derivative e^ax .cos(bx+c)|| Successive Differentiation e^ax .cos(bx+c)
มุมมอง 7Kปีที่แล้ว
nth derivative e^ax .cos(bx c)|| Successive Differentiation e^ax .cos(bx c)
nth derivative of e ^ax.sin(bx+c) ||Successive differentiation of e ^ax.sin(bx+c) ||
มุมมอง 12Kปีที่แล้ว
nth derivative of e ^ax.sin(bx c) ||Successive differentiation of e ^ax.sin(bx c) ||
nth derivative of log(ax+b) || successive differentiation of log(ax+b)
มุมมอง 8Kปีที่แล้ว
nth derivative of log(ax b) || successive differentiation of log(ax b)
nth derivative of (ax+b)^m || successive differentiation (ax+b)^m
มุมมอง 8Kปีที่แล้ว
nth derivative of (ax b)^m || successive differentiation (ax b)^m
nth derivative of a^mx | nth derivative of e^mx | nth derivative of exponential function
มุมมอง 1Kปีที่แล้ว
nth derivative of a^mx | nth derivative of e^mx | nth derivative of exponential function
nth derivative of cos (ax+b) || successive differentiation || nth derivative of cos (ax)
มุมมอง 10Kปีที่แล้ว
nth derivative of cos (ax b) || successive differentiation || nth derivative of cos (ax)
n th derivative formulae || Successive Differentiation formulae
มุมมอง 49ปีที่แล้ว
n th derivative formulae || Successive Differentiation formulae
Cyclic Permutation || Cycle of Permutation || Definition of Cyclic Permutation
มุมมอง 2K2 ปีที่แล้ว
Cyclic Permutation || Cycle of Permutation || Definition of Cyclic Permutation
Signature of Permutation || Sign of Permutation
มุมมอง 3.6K2 ปีที่แล้ว
Signature of Permutation || Sign of Permutation
Composition of Permutations || Product of two permutations || Composition not commutative ||
มุมมอง 6K2 ปีที่แล้ว
Composition of Permutations || Product of two permutations || Composition not commutative ||
nth derivative of 1/(ax+b) || Successive differentiation of 1/ax+b
มุมมอง 9K2 ปีที่แล้ว
nth derivative of 1/(ax b) || Successive differentiation of 1/ax b
nth derivative of sin(ax+b) || successive Differentiation of sin(ax+b) || nth derivative of sin(ax)
มุมมอง 19K2 ปีที่แล้ว
nth derivative of sin(ax b) || successive Differentiation of sin(ax b) || nth derivative of sin(ax)
Derivative of cos^2(ax) by First Principle of Derivative
มุมมอง 1.2K2 ปีที่แล้ว
Derivative of cos^2(ax) by First Principle of Derivative
Half Range Fourier Series || Half Range Cosine Series || Half Range Sine Series ||
มุมมอง 1852 ปีที่แล้ว
Half Range Fourier Series || Half Range Cosine Series || Half Range Sine Series ||
Hey mate I hope you are good do you have IG account ? I need to ask you
What is the nth derivative of,1 /(ax^r+b)
Thank you so much mam...🤍
Nice
Great Video
Mam we convert the quadratic equation into partial fractions and we can do separately
That was very helpful for me mam Thank you so much
Very good explanation very easy to understand 👍👍
Thank you mam❤
Sir why stopped posting
Thankss so much
Sir triple angle for sec cosec and cot?
Mam why we directly put rcosthita and rsinthita
plz check your pronunciation of m &n
ok ji..
thank you❤❤
the way she does it ......superb and by choosing a complex function it shows her courage and confidence in maths
Why we assume r😢
Sir can we solve it after differentiation by comapring with laplace and putting value of s
In this video again explain 2nd sum mam please
❤thnk u sir
It's Soo helpful mam thank you Soo much ❤
Glad you like it. Thanks for watching and commenting.☺
May i knowWhy are you said yanth instead of nth🤔
where ?
Great 👍 👌
Thanks you like it🙏
Formule not derved
Find inverse laplace of [1/s^4+a^4]
Sir plz ap pura syllabus complete kra dijye math hounors ka... Apka explanation se crystal clear ho jata h..
Your Discription For Credit Is Good 😅
🤣
Thank you maam
Find the Laplace transform of t^2 sin3t
I wish you could explain the "why and how" in every step Like while integrating and replacing the infinity and zero,whey did you put e^st as 1?
thanks 🎉
Thanks ma fr d lecture 👍
when you multiplied laplace of te^-2t , hoe s+2 came in numerator
here we have to multiply Laplace of t.(sin 2t ) by e^-2t that means we have to apply shifting property , for this we have to shift numerator s by (s+2)
To understand more please watch first shifting property th-cam.com/video/pOs_ronu5C4/w-d-xo.html
Good explane
Thanks and welcome
Bro do a video on Laplace transform of t*e*t sin ht
Dear sir.. which difficulty you are facing in this example.?
It is my first time watching your video and immediately subscribing to your channel mam
So kind of you.. Thank you so much..🤝
Tq mam
Sir do a video on Laplace transform of e^-t sin^2t
Dear sir.. which difficulty you are facing in this example.?
@@UnlockMaths i have full doubt on this sum sir
Thanks❤
Excellent teaching ❤
Good🙏🙏🙏
Where is X i couldn't see it didn't came in the screen
where it is needed..?🤔
you're an awesome teacher! keep creating content, it is really appreciated, I was struggling with Laplace transform proofs now I get it.😇😇😇
I'm so glad it helped you out ! Thanks for watching & commenting🤗❤
You just made this so easy to understand.
We may use shoelace formula to find the area of 🔺 formed by the three given points. If the area is zero, then we may say the points are collinear. Another method We may find the equation of St line that goes through any two of the given points. After getting this equation we may put the values of the third point in the equation.If equation is satisfied, then the three points are collinear.
❤
🤗
Tq
Welcome🤝
Thanks
Welcome
Thanks
Good pen choice
😀