Introduction to THE QUOTIENT RULE OF INDICES
Discover the Quotient Rule for Indices in this educational video! Master how to handle divisions of exponential expressions effortlessly. This fundamental rule is key for tackling complex math challenges and building a solid algebraic foundation.
What You’ll Learn:
• Understanding the Quotient Rule: Learn to divide numbers with the same base using indices.
• Step-by-step Application: Clear explanations and examples to guide you through the process.
• Practical Demonstrations: Watch the Quotient Rule in action with various real-world problems.
Why Learn Indices?
Mastering indices is crucial for success in higher-level math topics such as algebra, calculus, and beyond. With this foundational knowledge, you’ll be better equipped to tackle more complex mathematical challenges.
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Пікірлер: 8
The correct answer is x ^6
x^6
X^6 is the answer
X^5 × X^3 = X^(5+3) = X^8 (using the product of powers law) Then, divide X^8 by X^2: X^8 divided by X^2 = X^(8-2) = X^6 (using the quotient of indices law) So, X^5 × X^3 divided by X^2 equals X^6. I hope am correct 🥲
X^⁵×X^³ ÷ X^² = X^⁵+³ ÷ X^⁵ = X^⁸ - X^⁵ = X^⁸-⁵ =X^³. Please am i correct?
The answers aren't equal The first is 25 The second is -25
The correct answer is x^6
The answers aren't equal The first is 25 The second is -25