Of course! Let's break down the problem and solve it step by step. We're given:
1. The original quotient is -9.
2. We need to increment this quotient by 10.
3. We need to find the new result and relate it to an expected value, which in this case is 11.
Let's follow through with these steps:
1. Identify the Original Quotient:
The original quotient we're starting with is -9.
2. Increment the Quotient by a Given Amount:
The increment we need to add to the original quotient is 10.
3. Calculate the New Result:
Adding the increment to the original quotient:
[tex]\[
\text{New Result} = \text{Original Quotient} + \text{Increment} = -9 + 10 = 1
\][/tex]
4. Compare with the Expected Value:
The expected value given is 11. Our computed result is 1.
Thus, after increasing the quotient of -9 by 10, we get a result of 1. The expected value was 11, highlighting that there is a difference between the result and the expectation.
Therefore, the statement can be corrected to: "The quotient of -9 increased by 10 is 1, while the expected value was 11."
This concludes the detailed, step-by-step solution.
