Answer:
B
Step-by-step explanation:
We are given that:
[tex]f(x)\geq g(x)[/tex]
For all real numbers and they form a region R that is bounded from x = 1 to x = 7. A table of values is given.
We are directed to use a Right Riemann Sum to find the area between the curves of f and g.
Since f is greater than g for all values of x, to find the approximate area between f and g, we can first find the area of f and then subtract the area of g from f.
Using a Right Riemann Sum, the area of f is approximately:
(We multiply the width between each x-coordinate by the right endpoint)
[tex]\displaystyle \int_1^7f(x)\, dx\approx3(5)+2(2)+1(8)=27[/tex]
And the area of g is approximately:
[tex]\displaystyle \int_1^7g(x)\, dx\approx3(1)+2(0)+1(5)=8[/tex]
Therefore, the area between them will be:
[tex]A=\displaystyle \int_1^7f(x)\, dx-\int_1^7 g(x)\, dx\approx 27-8=19[/tex]
Our answer is B.
