Simplifying Expressions: Math Problem Solved!

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Simplifying Expressions: Unveiling the Solution

Hey everyone! Today, we're diving into a fun math problem: simplifying expressions. It might sound a bit intimidating at first, but trust me, it's like solving a puzzle. We'll break down the question step-by-step, making sure you grasp every concept. So, grab your pencils and let's get started. We'll tackle this expression: What expressions equal the product of 10x910x^9 and (60x−6)−1\left(60x^{-6}\right)^{-1}? And don't worry, we'll keep it simple and easy to follow. Remember, understanding these basics is crucial for all kinds of math, so let's make sure we get it right, shall we?

Deciphering the Core Problem

Alright, guys, let's break down the main problem: We need to find expressions equal to the product of 10x910x^9 and (60x−6)−1\left(60x^{-6}\right)^{-1}. To make this easier, let's first simplify the expression (60x−6)−1\left(60x^{-6}\right)^{-1}. Remember that a negative exponent means we take the reciprocal. Therefore, (60x−6)−1\left(60x^{-6}\right)^{-1} is the same as 160x−6\frac{1}{60x^{-6}}. Now, we can rewrite the original problem as finding expressions equivalent to 10x9⋅160x−610x^9 \cdot \frac{1}{60x^{-6}}. We're essentially multiplying the first term, 10x910x^9, by the reciprocal of 60x−660x^{-6}. It's all about playing with those exponents and understanding what they mean. The key here is to simplify. We'll simplify this expression by combining like terms and applying the rules of exponents, like how to deal with negative exponents. Always try to simplify step by step, which will help you avoid making mistakes and will help you get the correct answer faster. Pay close attention to how the exponents change and how the constants combine. Let's make sure we do it right!

Step-by-Step Simplification

Okay, let's get into the nitty-gritty and simplify this expression. First off, let's address the 160x−6\frac{1}{60x^{-6}} part. Remember that x−6x^{-6} is the same as 1x6\frac{1}{x^6}. So, we can rewrite the expression as 160⋅x6\frac{1}{60} \cdot x^6 (since the negative exponent moves the xx to the numerator, and the 6060 stays in the denominator). This simplifies to x660\frac{x^6}{60}. Now, our original problem becomes 10x9⋅x66010x^9 \cdot \frac{x^6}{60}. Next, multiply the terms. Multiply the coefficients (the numbers). We have 1010 in the numerator and 6060 in the denominator, so we can simplify the fraction. 1010 divided by 6060 equals 16\frac{1}{6}. Then, multiply the variables. When multiplying exponents with the same base, you add the powers. So, x9⋅x6x^9 \cdot x^6 becomes x9+6x^{9+6}, which equals x15x^{15}. Combining all these, we get 16x15\frac{1}{6}x^{15} or x156\frac{x^{15}}{6}. We're well on our way to identifying the correct answer. We have effectively simplified the given expression. Always remember to simplify the fraction first if possible. Always try to cancel and reduce the numbers to their simplest form. That would make the calculation a lot easier. Now, we are ready to compare our simplified expression with the given options.

Evaluating the Answer Choices

Now, let's look at the answer choices. We need to find the expressions that are equal to x156\frac{x^{15}}{6}.

  • A. 10x960x−6\frac{10x^9}{60x^{-6}}: Let's simplify this. The 1010 over 6060 simplifies to 16\frac{1}{6}. The x−6x^{-6} in the denominator becomes x6x^6 when brought to the numerator. So, we get 16x9â‹…x6\frac{1}{6}x^9 \cdot x^6, which equals x156\frac{x^{15}}{6}. This one's a keeper!
  • B. 10x960x6\frac{10x^9}{60x^6}: Here, we have x6x^6 in the denominator. So, when simplifying, we get 16x9−6\frac{1}{6}x^{9-6}, which simplifies to 16x3\frac{1}{6}x^3 or x36\frac{x^3}{6}. Nope, not our answer.
  • C. x156\frac{x^{15}}{6}: This matches our simplified expression exactly. Bingo!
  • D. 6x156x^{15}: This is not equal to x156\frac{x^{15}}{6}. No, this one is not correct. We are looking for the expressions that match our simplified form, and this does not.

So, after a thorough evaluation, we can say that A and C are the correct answers. We've simplified, evaluated, and now we know the correct options. That wasn't so bad, right?

Key Takeaways and Tips for Success

Here are some of the main things to remember. Always Simplify: Simplifying expressions is all about breaking them down step by step. Understand Exponents: Negative exponents, adding exponents when multiplying, and subtracting when dividing – get these rules down. Be Organized: Write your work clearly, and don't skip steps. This helps avoid mistakes. Practice: The more problems you solve, the better you get. Try different problems to hone your skills. Check Your Work: Always double-check your answers. Going back and re-evaluating each step helps catch any potential errors. Keep practicing and applying these tips. It is important to solve problems step by step and understand the concepts to get good at mathematics.

Final Thoughts

Great job, everyone! You've successfully navigated a math problem involving expressions and exponents. Remember, practice is key, and each problem you solve builds your confidence. Keep exploring, keep learning, and don’t be afraid to tackle new challenges. You've got this, and with consistent effort, you'll become more and more comfortable with these types of problems. Thanks for joining me today, and keep up the fantastic work!