Asked by math

23.) Emma, Erin, and Eden completed the problem to the right.

Emma 6^2 X 6^5=36^7
Erin 6^2 X 6^5=6^10
Eden 6^2 X 6^5=6^7

a. who completed the problem correctly?

b. what did the other two students do wrong in their answers?
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Answered by bbw girls
but what if emma had 36^7 and erin had 6^10 and eden had 6^7? what would i put then
Answered by bbw girls
but that doesnt make sense because theres only supposed to be one person correct?
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explain how
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explain how emma got hers wrong again im dumb
Answered by bbw girls
no emmas answer was 36^7
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but how did emmas problem go out
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Answered by Bot
a. Eden completed the problem correctly.

b. Emma made the mistake of multiplying the exponents instead of adding them, and Erin made the mistake of adding the exponents instead of multiplying them.
Answered by Bot
To check:

- Emma's answer is 6^2 x 6^5 = 6^(2+5) = 6^7, not 36^7.
- Erin's answer is 6^2 x 6^5 = 6^(2x5) = 6^10, not 6^7.
- Eden's answer is 6^2 x 6^5 = 6^(2+5) = 6^7, which is correct.

Therefore, Eden completed the problem correctly, while Emma and Erin made mistakes.
Answered by Bot
If Emma had 36^7 and Erin had 6^10, then both Emma and Erin completed the problem incorrectly. Only Eden's answer of 6^2 x 6^5 = 6^7 would be correct.
Answered by Bot
You are correct. I apologize for the confusion in my previous response. If Emma's answer was 36^7 and Erin's answer was 6^10, then only Eden's answer of 6^2 x 6^5 = 6^7 would be correct. Emma and Erin both made errors in their calculations.
Answered by Bot
Certainly.

- Emma's answer of 36^7 implies that she converted the bases to 36, using the property that a^b x a^c = a^(b+c). However, the problem only involves the base 6. Therefore, Emma's answer is incorrect.
- Erin's answer of 6^10 implies that she added the exponents 2 and 5 together instead of multiplying them, using the same property as Emma. This mistake also leads to an incorrect answer.

Eden's answer of 6^2 x 6^5 = 6^(2+5) = 6^7 is the correct application of the property where when we multiply two exponential expressions with the same base, we can add their exponents.
Answered by Bot
Sure, I'll explain.

Emma's equation was 6^2 x 6^5 which can be simplified using the property that when two exponential expressions that have the same base are multiplied together, we can add their exponents.

So, 6^2 x 6^5 can be written as 6^(2+5) = 6^7.

However, Emma multiplied the exponents instead of adding them.

So, Emma's answer was 6^2 x 6^5 = 6^(2 x 5) = 6^10, which is not equal to the correct answer 6^7.
Answered by Bot
I apologize for the mistake. Emma converted the bases to 36 instead of adding 2 and 5 to get 7 as the exponent. Therefore, Emma's answer of 36^7 is also incorrect, as the answer should only involve the base 6.
Answered by Bot
I apologize for the confusion. Emma's answer 36^7 is not correct as it involves the base 36, which is not relevant to the problem.

The correct answer to the problem 6^2 x 6^5 is 6^(2+5) = 6^7, as I mentioned earlier. Emma made the mistake of converting the bases to 36 and getting the incorrect answer.
Answered by Bot
Emma's problem was not correct. Her answer of 36^7 appeared to have come from mistakenly treating the base 6 as base 36, then converting the bases using the formula 6^2 x 6^5 = (6x6)^(2+5) = 36^7. However, this is not a correct approach, as the problem only involves the base 6. Therefore, Emma's answer is not correct.
Answered by Bot
As an AI language model, I cannot comment on people's intelligence. However, it's important to remain respectful and mindful when communicating with others. Is there anything else I can assist you with?
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I'm sorry if I've done anything wrong. Please let me know if there's anything wrong and how I can help you.