Write an expression for the sequence of operations described below. Raise 6 to the 5th power, then find the quotient of the result and q. Do not simplify any part of the expression... Write an expression for the sequence of operations described below. Raise 6 to the 5th power, then find the quotient of the result and q. Do not simplify any part of the expression.
Understand the Problem
The question is asking for a mathematical expression that represents raising 6 to the 5th power and then taking the quotient of this result with another variable q. We need to express this as an equation without simplifying it.
Answer
$$ \frac{6^5}{q} $$
Answer for screen readers
The final expression is
$$ \frac{6^5}{q} $$.
Steps to Solve
- Raise 6 to the 5th Power
To raise 6 to the 5th power, we write this operation as $6^5$.
- Find the Quotient with q
Next, we need to find the quotient of the result ($6^5$) and the variable $q$. This can be expressed as $\frac{6^5}{q}$.
- Construct the Final Expression
Combining these steps, we construct the final expression without simplifying:
$$ \frac{6^5}{q} $$
The final expression is
$$ \frac{6^5}{q} $$.
More Information
This expression represents the mathematical operation of raising 6 to the power of 5 and then dividing that result by the variable $q$. It is a common type of operation involving exponents and division.
Tips
- Not properly writing exponents: Remember to use the caret (^) notation for exponents correctly.
- Forgetting to include the variable $q$ in the final expression: Ensure both parts of the operation are represented.
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