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A bucket of paint has spilled on a tile floor. The paint flow can be expressed with the function p(t) = 6(t), where t represents time in minutes and p represents how far the paint is spreading.

The flowing paint is creating a circular pattern on the tile. The area of the pattern can be expressed as A(p) = 3.14(p)^2

Part A: Find the area of the circle of spilled paint as a function of time, or A[p(t)]. Show your work.

Part B: How large is the area of spilled paint after 8 minutes? You may use 3.14 to approximate pi in this problem.

Respuesta :

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A) From the function p(t)=6(t), we know that p is 6t, so we plug this into it, to get 3.14 * (6t)^2, or 113.04t^2.

B) Using what we got from A), we plug it in and get 113.04 * 8 * 8, or 7234.56 (Use a calculator on this, or just bash it with pencil and paper).

wegnerkolmp2741o

Answer:

A(p(t))     =113.04 t^2

A (p(8))   =7234.56

Step-by-step explanation:

p(t) = 6t

A (p) = 3.14 p^2

So A(p(t)) = means we  put p(t) in the function for A

                = 3.14 p^2

                = 3.14 (6t) ^2

                 = 3.14 (36t^2)

   A(p(t))     =113.04 t^2


Let t=8    

A (p(8)) = 113.04 (8)^2

            = 113.04(64)

             =7234.56

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