Emma, Erin, and Eden completed the problem to the right. Emma's equation shows 6 squared times 6 superscript 5 baseline equals 36 superscript 7 baseline.
Erin's equation shows 6 squared times 6 superscript 5 baseline equals 6 superscript 10 baseline.
Eden's equation shows 6 squared times 6 superscript 5 baseline equals 6 superscript 7 baseline.
a. Who completed the problem correctly?
b. What did the other two students do wrong in their answers?
how would I write this
a. Emma completed the problem correctly.
b. Erin incorrectly raised 6 to the 10th power instead of 6 to the 11th power (since 6 to the 5th power multiplied by 6 squared equals 6 to the 11th power). Eden also made a mistake and raised 6 to the 7th power instead of 6 to the 12th power (since 6 to the 5th power multiplied by 6 squared equals 6 to the 11th power, and then squaring that result gives 6 to the 12th power).
To answer the question, you can write the following:
a. To determine who completed the problem correctly, we need to compare the equations given by Emma, Erin, and Eden.
Emma's equation: 6² * 6⁵ = 36⁷
Erin's equation: 6² * 6⁵ = 6¹⁰
Eden's equation: 6² * 6⁵ = 6⁷
Comparing the equations, we see that only Eden's equation matches the correct mathematical notation. Therefore, Eden completed the problem correctly.
b. From the given equations, we can identify the mistakes made by Emma and Erin.
Emma incorrectly wrote 36⁷ instead of 6⁷ as the result of the equation.
Erin incorrectly wrote 6¹⁰ instead of 6⁷ as the result of the equation.