contestada

The function n(t)=100e^-0.023t models the number of grams in a sample of cesium-137 that
remain after t years. What is the sample’s average rate of decay over the interval [3,8]?

Respuesta :

Answer:

Step-by-step explanation:

[tex]n(t)=100 e^{-.023t}[/tex]

when t = 3

[tex]n(3)=100 e^{-.023\times 3}[/tex]

[tex]n(3)=100 e^{-.069}[/tex]

= 93.33

when t = 8

[tex]n(8)=100 e^{-.023\times 8}[/tex]

[tex]n(8)=100 e^{-.184}[/tex]

= 83 .2

no of grams decayed = 93.33 - 83.2

= 10.13 grams

average rate of decay = 10.13 / ( 8 - 3 )

= 2.026 gm / year .

Otras preguntas

ACCESS MORE
EDU ACCESS