A virus spreads by contact and if you get infected you stay contagious. In an isolated population with P persons (no-one dies or are born) the rate of infection at time t (in months after 1/1 2020) is proportional to the product of 1. the number y(t) that are infected, 2. the number that are not infected 3. eat where a is a negative number depending on disease preventive measures. One tenth of the population is infected 1/1-2020. (a) Write out the differential equation y(t) must satisfy and solve it (call the proportionality constant k and remember to explain each step of your solution carefully. Are there for instance any constant solutions?). (b) Find a relation between L = lim0 Y(t), a, P and k. What can you say about L when a is very small? What can you say about L when |a is very big?

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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A virus spreads by contact and if you get infected you stay contagious. In an isolated population with P persons
(no-one dies or are born) the rate of infection at time t (in months after 1/1 2020) is proportional to the product of
1. the number y(t) that are infected,
2. the number that are not infected
3. eat where a is a negative number depending on disease preventive measures.
One tenth of the population is infected 1/1-2020.
(a) Write out the differential equation y(t) must satisfy and solve it (call the proportionality constant k and
remember to explain each step of your solution carefully. Are there for instance any constant solutions?).
(b) Find a relation between L = lim->00 y(t), a, Pand k. What can you say about L when a is very small?
What can you say about L when a is very big?
Transcribed Image Text:A virus spreads by contact and if you get infected you stay contagious. In an isolated population with P persons (no-one dies or are born) the rate of infection at time t (in months after 1/1 2020) is proportional to the product of 1. the number y(t) that are infected, 2. the number that are not infected 3. eat where a is a negative number depending on disease preventive measures. One tenth of the population is infected 1/1-2020. (a) Write out the differential equation y(t) must satisfy and solve it (call the proportionality constant k and remember to explain each step of your solution carefully. Are there for instance any constant solutions?). (b) Find a relation between L = lim->00 y(t), a, Pand k. What can you say about L when a is very small? What can you say about L when a is very big?
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