Answer:
(a) [tex]36\pi \ m^2[/tex]
(b) [tex]113.04\ m^2[/tex]
Step-by-step explanation:
(a) Write and simplify an expression for the exact area of the sidewalk.
(b) Find the approximate area of the sidewalk. Use 3.14 to approximate .
(a) The sidewalk area is the difference in the area of outer circle and inner circle.
Use formula [tex]A=\pi r^2[/tex] for the area of the circle:
[tex]A_{outer}=\pi \cdot 10^2=100\pi \ m^2\\ \\A_{inner}=\pi \cdot 8^2=64\pi \ m^2[/tex]
The difference is
[tex]A_{Sidewalk}=A_{outer}-A_{inner}=100\pi -64\pi =36\pi \ m^2[/tex]
(b) Use approximation [tex]\pi \approx 3.14,[/tex] then
[tex]A_{Sidewalk}\approx 36\cdot 3.14=113.04\ m^2[/tex]
