Question
Practice Problem:
Your answer:
x0
150
2n0
−3a0
Your answer:
x0
150
2n0
−3a0
Answers
Answered by
GPT-4o mini
It seems like you're presenting a problem that involves variables and could be related to an equation or expression. However, it is unclear what specific question or context you're referring to.
If you're looking for a solution to an equation or simplification of an expression involving \( x_0, n_0, a_0 \), or if you need assistance in a particular area of math, such as algebra, calculus, or any kind of mathematical problem, please provide more details or clarify the question!
Would you like to simplify the expression you've given? Or possibly solve an equation? Let me know how I can assist you!
If you're looking for a solution to an equation or simplification of an expression involving \( x_0, n_0, a_0 \), or if you need assistance in a particular area of math, such as algebra, calculus, or any kind of mathematical problem, please provide more details or clarify the question!
Would you like to simplify the expression you've given? Or possibly solve an equation? Let me know how I can assist you!
Answer
Practice Problem:
Your answer:
x^0
15^0
2n^0
−3a^0
Your answer:
x^0
15^0
2n^0
−3a^0
Answered by
GPT-4o mini
It looks like you are working with expressions involving exponents. Let's break it down:
1. **Understanding Exponentials:**
- Any non-zero number raised to the power of \(0\) is equal to \(1\).
- Thus, \(x^0 = 1\) (assuming \(x \neq 0\))
- \(15^0 = 1\)
- Similarly, \(2n^0 = 2 \cdot 1 = 2\) (assuming \(n \neq 0\))
- Finally, \(-3a^0 = -3 \cdot 1 = -3\) (assuming \(a \neq 0\))
2. **Evaluating the Expressions:**
- \(x^0 = 1\)
- \(15^0 = 1\)
- \(2n^0 = 2\)
- \(-3a^0 = -3\)
Putting it all together, you would have:
\[
1 + 1 + 2 - 3
\]
Now simplify that:
\[
1 + 1 + 2 - 3 = 2 - 3 = -1
\]
So the value of the expression \(x^0 + 15^0 + 2n^0 - 3a^0\) is \(-1\) (assuming all variables are not equal to zero). If you have any further questions or need clarification, feel free to ask!
1. **Understanding Exponentials:**
- Any non-zero number raised to the power of \(0\) is equal to \(1\).
- Thus, \(x^0 = 1\) (assuming \(x \neq 0\))
- \(15^0 = 1\)
- Similarly, \(2n^0 = 2 \cdot 1 = 2\) (assuming \(n \neq 0\))
- Finally, \(-3a^0 = -3 \cdot 1 = -3\) (assuming \(a \neq 0\))
2. **Evaluating the Expressions:**
- \(x^0 = 1\)
- \(15^0 = 1\)
- \(2n^0 = 2\)
- \(-3a^0 = -3\)
Putting it all together, you would have:
\[
1 + 1 + 2 - 3
\]
Now simplify that:
\[
1 + 1 + 2 - 3 = 2 - 3 = -1
\]
So the value of the expression \(x^0 + 15^0 + 2n^0 - 3a^0\) is \(-1\) (assuming all variables are not equal to zero). If you have any further questions or need clarification, feel free to ask!