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Math Hub with Mr Vivi
Приєднався 30 гру 2017
Welcome to Math Hub with Mr. Vivi!
At Math Hub, we make mathematics engaging, accessible, and fun for all students. Whether you’re building a solid foundation or exploring advanced topics, we’ve got you covered.
What We Offer:
Comprehensive Tutorials: Clear, step-by-step explanations of various math concepts.
Interactive Learning: Engage with problems and exercises to boost your skills.
Fun Lessons: Enjoy creative approaches that make math exciting and relevant.
Expert Guidance: Benefit from Mr. Vivi’s experience and passion for teaching math.
Subscribe for weekly updates and join our community where math matters and learning is an adventure. Hit the notification bell to stay updated and make every concept a stepping stone to success!
At Math Hub, we make mathematics engaging, accessible, and fun for all students. Whether you’re building a solid foundation or exploring advanced topics, we’ve got you covered.
What We Offer:
Comprehensive Tutorials: Clear, step-by-step explanations of various math concepts.
Interactive Learning: Engage with problems and exercises to boost your skills.
Fun Lessons: Enjoy creative approaches that make math exciting and relevant.
Expert Guidance: Benefit from Mr. Vivi’s experience and passion for teaching math.
Subscribe for weekly updates and join our community where math matters and learning is an adventure. Hit the notification bell to stay updated and make every concept a stepping stone to success!
How to simplify Exponents | Olympiad. #maths
In this video, we'll explore the world of exponents and learn how to simplify them, a crucial skill for Olympiad mathematics. Exponents can be intimidating, but with the right techniques, you'll be able to tackle even the most complex problems with ease. We'll start with the basics of exponents, including the product and power rules, and then move on to more advanced topics, such as negative exponents and fractional exponents. By the end of this video, you'll have a solid understanding of how to simplify exponents and be well on your way to mastering Olympiad-level math problems. Whether you're a student looking to improve your math skills or a teacher seeking to help your students succeed, this video is for you. So let's get started and simplify those exponents! #Olympiad
Переглядів: 1 178
Відео
Solve this difficult question EASILY | Olympiad. #olympiad
Переглядів 107День тому
Struggling with Olympiad questions? Here's a simple and easy solution to a difficult Olympiad problem! In this video, we'll break down the question step-by-step and provide a clear explanation to help you understand the concept. Whether you're a math enthusiast or a student preparing for Olympiad exams, this video is perfect for you. So, let's dive in and solve this challenging question easily!...
Is this Really Olympiad Math level? #olympiad
Переглядів 6614 днів тому
Someone claimed this was Olympiad-level math. In this video, we test that claim by seeing if we can solve it using simple algebraic methods. Let’s find out if it really deserves the Olympiad title!" #math #maths #algebra #indices #olympiad #sat #jamb #advancedalgebra #waec #gce
Binary Operations | Associative Property. #maths
Переглядів 5014 днів тому
In this video, we take a deeper step into the world of Binary Operations and #advancedalgebra. This video is particularly helpful for thise preparing for #jamb, #waec, #sat, #gce and #olympiad competitions. Don't forget to liie and subscribe. Follow me on Tiktok: www.tiktok.com/@selogenahewaia?_t=8qxF2wi4seU&_r=1
Algebra | Binary Operations | Commutative Property. #maths
Переглядів 3921 день тому
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Solving a Difficult Question | Olympiad Mathematics | #math
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Quick Fix to a Pesky Radical Question |#maths
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Trickier than it looks | Solving (x²-15)²=16. #algebra
Переглядів 869Місяць тому
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How to Sovle this Difficult Olympiad Question that 94% failed.
Переглядів 216Місяць тому
How to Sovle this Difficult Olympiad Question that 94% failed.
How to Solve Quadratic Equations with Radicals easily.
Переглядів 340Місяць тому
How to Solve Quadratic Equations with Radicals easily.
How to Solve Radical Equations: Step-by-Step Guide | √(a + 12) = 2 + √a Explained
Переглядів 782 місяці тому
How to Solve Radical Equations: Step-by-Step Guide | √(a 12) = 2 √a Explained
Master the Last 3 Laws of Indices: Power of a Power, Quotient & Product Laws Explained!
Переглядів 1592 місяці тому
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Master the First 4 Laws of Indices: Multiplication, Division, Zero & Negative Exponents
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Applying the Laws of Indices: Solving Practice Questions Step-by-Step
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Mastering Radicals: Simplifying Complex Square Roots in Algebra
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How to Factorise Perfect Square Trinomials
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Переглядів 1712 місяці тому
How to Solve the Quadratic Equation: With completing the squares method.
How to Use the Quadratic (almighty) Formula to Solve Quadratic Equations.
Переглядів 5753 роки тому
How to Use the Quadratic (almighty) Formula to Solve Quadratic Equations.
Amazing Multiplication Trick. Feel free to engage with the content.
🙌🏽🙌🏽
Great
Thank you.
Can you tell the answer with steps
Sure... Here's a step by step break down of the answer: We start be simplifying each radical. Express 216 in index form to get 6^3. The radical root will cancel the power. 3√216 = (6^3)^1/3 = 6 Also express 32 in index form to get 2^5 and cancel the power with the root. 5√32 = (2^5)^1/5 = 2 Now you have 6^2, which is 36. I hope that was helpful.
Amazing Subtraction Trick. Use and thank me later😊
I see Tesla, I click
A true person of culture. Thanks for stopping by.
math is a beautiful language
It sure is.
Would you have to use the values of root 3 and root 2 or just leave it at that?
@@golumohanty6992 The idea was to solve without using a calculator or tables. Unless you have values like √2 or √3 memorized, we leave the answer in surd form.
@MathHubwithMrVivi I see, thank you
36
Nice explanation with clear steps while also being relatively fast , thank you! :)
Thanks for the feedback. Glad you found it helpful.
3√216 [(6^3)^1/3] = 6 5√32 [(2^5)]^1/5 = 2 6^2 36.
Option B - 36
@@Glow-j9u ✅
Hint: The answer is not option D😁.
Very helpful 🙄
@Meta-j5o 😁
Feel free to engage with the content and drop your questions or alternative solutions.
This explanation was so clear and easy to follow. Thank you for simplifying what seemed so complex.
Glad it was helpful!
Very detailed breakdown.
2^(7x1/7)^[2^(6×1/6)] 2^2 4
I dont get it .. can you elaborate
Y×√Y=16×4=64 Y×√Y=16×√16 Y=16
y^{3/2} = 64 y^{3/2})^{2/3} = 64^{2/3} y = 64^{2/3} y = 64^{2/3} = (2^6)^{2/3} y = 2^4 y = 16
Excellently done.
=(2^(4/2))^2^(4/2) =(2^2)^4 =2^8 =256
Works like a charm 👌🏾
√(16)^16^2^-1 √(16)^16^1/2 √(16)^√16 √(16)^4 (16)^1/2×4 16^2 =256
Helpful break down. Thanks.
or: 2^4X/2^(X+2)=2^4 2^(4X-X-2)=2^4 3X-2=4 3X=6 X=6/3 =2
Yes, this also works.
Initially looked daunting ngl.
Understanding difference of two squares really unlocks the solution to this question.
Very detailed explanation
Glad it was helpful!
How can anyone find this hard, I was taught this in elementary school, maybe max middle school level for other people, there isn't any reason that this should be hard
Lol... I get where you’re coming from! For some, this stuff clicks right away, but for others, it might take a bit longer, and that’s okay. You’d be surprised how many people struggle with basic concepts like this.
The answer is correct ✅
Putting that multiplication sign ❌ makes all the difference.
@@YeloSelo it certainly does.
not really the answer is the same
Or x=e^W(ln(2²⁰⁴⁸)) which is 256 in the real branch of the Lambert W function
This looks good. Thanks professor.
You're very welcome.
This topic can give headaches. No jokes.
64 is the answer.
1, -1, 3, -3.
We continue our exploration into the fascinating world of Binary Operations.
Handy solution to a tricky SAT question.
C - 64
64
Here's an easy one. Drop your answers in the comments.
Two solutions lost, the way of solving is not correct
The equation 2^x = x^32 indeed has a real positive solution, x = 256 , which I found through analysis. For real numbers, this is the only solution. The rapid growth of the exponential function 2^x compared to x^32 means they intersect only once in the real positive domain. If we consider complex numbers, additional solutions may exist. However, since the question didn't specify a complex solution set, I focused solely on real values.
Wonderful😊
this is a cool approach, although i just assumed 120 since it is the only answer greater than 100^3, which is only a part of x^3
@@edplaysgames-ej2vh that also works.