Big fish eat little fish, and little fish eat algae. So, the population b of big fish is a function of the population I of little fish, and the population of little fish depends on the amount a of algae available. We can model the big fish population as b(1) 0.5/+3 hundred big fish, %3D where I is measured in thousands of little fish. The little fish population can be modelled as (a) 0.3a-1 thousand little fish, where a is the number of tons of algae. Match following functions and statements. [ Choose ] Compute b(10) 53 When there are ten thousands little fish, there are 5300 big fish. Compute I(10) When there are 10 tons of algae, there are two thousands little fish Compute b(l(10)) 5. 530 b(10) means 20 When there are 10 tons of algae, there are 5 hundred big fish |(10) means [Choose ] 50

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Big fish eat little fish, and little fish eat algae. So, the population b of big fish is a function of the
population I of little fish, and the population of little fish depends on the amount a of algae available.
We can model the big fish population as
b(1) = 0.5/+3 hundred big fish,
where I is measured in thousands of little fish. The little fish population can be modelled as
(a) 0.3a-1 thousand little fish,
where a is the number of tons of algae.
Match following functions and statements.
[Choose ]
Compute b(10)
53
When there are ten thousands little fish, there are 5300 big fish.
Compute I(10)
When there are 10 tons of algae, there are two thousands little fish
50
Compute b(I(10))
5.
530
b(10) means
20
When there are 10 tons of algae, there are 5 hundred big fish
|(10) means
[Choose ]
Transcribed Image Text:Big fish eat little fish, and little fish eat algae. So, the population b of big fish is a function of the population I of little fish, and the population of little fish depends on the amount a of algae available. We can model the big fish population as b(1) = 0.5/+3 hundred big fish, where I is measured in thousands of little fish. The little fish population can be modelled as (a) 0.3a-1 thousand little fish, where a is the number of tons of algae. Match following functions and statements. [Choose ] Compute b(10) 53 When there are ten thousands little fish, there are 5300 big fish. Compute I(10) When there are 10 tons of algae, there are two thousands little fish 50 Compute b(I(10)) 5. 530 b(10) means 20 When there are 10 tons of algae, there are 5 hundred big fish |(10) means [Choose ]
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