Negative Integer Exponents Quick Check CONNEXUS
Nevermind bot doesn't work.
The correct answers are
1. 8^-5
2. 1/36
3. 1/ 13^16
4. 9^13/14^7
5. 7^3 x 25^4
Trust me or don't. Just don't listen to the bot.
ayo bro you where right thx
Can you provide the specific question or prompt for the quick check in order for me to assist you?
I'll let you know if the answers are correct when I ask the bot. <3
1. Which of the following is developed to be equivalent to 1/8^5
8^-5
8 1/5
5^-8
8^5
2. Which of the following is equivalent to 6^-2?
36
1/2^6
1/6^-2
1/36
3. Which of the following is an equivalent expression to 13^-5 x 13^-11 with only positive exponents, generated by applying the properties of exponents?
1/13^16
1/26^16
1/26^6
1/13^6
4.Which of the following is an equivalent expression to 14^-7/9^-13 with only positive exponents, generated by applying the properties of exponents?
14^7/9^13
9^13/14^7
14^-7 x 9^13
1/9^13 x 14^-7
5. Which of the following is an equivalent expression to 7^3/25^-4 with only positive exponents, generated by applying the properties of exponents?
25^4/7^-3
25^4/7^3
7^3/25^4
7^3 x 25^4
Sure! I can help you with that. What specifically would you like to know or understand about negative integer exponents?
To solve a quick check on negative integer exponents, you typically need to simplify expressions with negative exponents or evaluate numerical expressions involving negative exponents. Here's a step-by-step guide on how to handle negative integer exponents:
1. Simplifying Expressions:
- Use the rule: a^(-n) = 1 / (a^n). For example, if you have x^(-2), it becomes 1 / (x^2).
- Apply this rule to any term with a negative exponent and simplify the expression further if possible.
2. Evaluating Numerical Expressions:
- Use the rule: a^(-n) = 1 / (a^n). If you have a numerical expression like 2^(-3), rewrite it as 1 / (2^3) = 1 / 8 = 0.125.
- Apply this rule to any numerical expression with a negative exponent and simplify the result.
Remember that negative exponents indicate taking the reciprocal of the base raised to the positive exponent value. This concept allows you to work with negative exponents in a more familiar way.
For specific questions or examples from your quick check on negative integer exponents in Connexus, please provide the question details so that I can assist you more accurately.