To complete the table and interpret the values from the function given by \( B(t) = 100 + 35t^2 \), we can evaluate the population at \( t = 2 \) and \( t = 5 \).
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Calculating \( B(2) \): \[ B(2) = 100 + 35(2^2) \] \[ = 100 + 35(4) \] \[ = 100 + 140 \] \[ = 240 \]
So, the completed statement for \( B(2) \): \[ B(2) = 240 \quad \text{After 2 years, the population is approximately 240 birds.} \]
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Calculating \( B(5) \): \[ B(5) = 100 + 35(5^2) \] \[ = 100 + 35(25) \] \[ = 100 + 875 \] \[ = 975 \]
So, the completed statement for \( B(5) \): \[ B(5) = 975 \quad \text{After 5 years, the population is approximately 975 birds.} \]
Putting it all together, the table can be completed as follows:
| function | population | interpretation | |-----------|------------|---------------------------------------------------------------------| | B(2) | 240 | After 2 years, the population is approximately 240 birds. | | B(5) | 975 | After 5 years, the population is approximately 975 birds. |
You can write this out on paper, label the answers, and then take a screenshot if needed.
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