Answer :
Answer:
[tex]1694 \pi[/tex]
Step-by-step explanation:
I don't see a diagram, so I'm assuming that r is the radius and x is the height of a right circular cylinder (like a soup can).
The volume of the cylinder can be found from the formula
[tex]V=\pi (\text{radius})^2 \cdot (\text{height})[/tex]
using the variables in your problem, this is
[tex]V=\pi r^2x[/tex]
Plug in the given values for r and x.
[tex]V=\pi(11)^2(14) \\ V=\pi(121)(14) \\ V=1694\pi[/tex]
If you need an approximate decimal value for the volume, use a value of pi (ask your teacher how accurate it should be).
Example: Using pi = 3.1416,
[tex]V \approx (1694)(3.1416)=5321.8704[/tex]
You might be asked to round that answer, say to 5322 cubic units.