If
\[
\begin{array}{c}
\int_{-5}^{8} g(z) d z=4 \\
\int_{0}^{8} g(z) d z=10.9
\end{array}
\]
what does the following integral equal?
\[
\int_{-5}^{0} g(z) d z=
\]
Answer
Final Answer: The integral of g(z) from -5 to 0 is \(\boxed{-6.9}\).
Step 1 :The integral of a function from a to b is the area under the curve of the function from a to b. The integral of g(z) from -5 to 8 is the area under the curve of g(z) from -5 to 8, and the integral of g(z) from 0 to 8 is the area under the curve of g(z) from 0 to 8.
Step 2 :The integral of g(z) from -5 to 0 is the area under the curve of g(z) from -5 to 0. This area is the difference between the area under the curve of g(z) from -5 to 8 and the area under the curve of g(z) from 0 to 8.
Step 3 :So, we can calculate the integral of g(z) from -5 to 0 by subtracting the integral of g(z) from 0 to 8 from the integral of g(z) from -5 to 8.
Step 4 :Let's denote the integral of g(z) from -5 to 8 as \(\text{integral}_{-5}^{8}\), and the integral of g(z) from 0 to 8 as \(\text{integral}_{0}^{8}\). We are given that \(\text{integral}_{-5}^{8} = 4\) and \(\text{integral}_{0}^{8} = 10.9\).
Step 5 :Then, the integral of g(z) from -5 to 0, denoted as \(\text{integral}_{-5}^{0}\), can be calculated as \(\text{integral}_{-5}^{0} = \text{integral}_{-5}^{8} - \text{integral}_{0}^{8} = 4 - 10.9 = -6.9\).
Step 6 :Final Answer: The integral of g(z) from -5 to 0 is \(\boxed{-6.9}\).
