The percentage of patients P who have survived t years after initial diagnosis of a certain disease is modeled by the function P(t) = 100(0.6)*. (a) According to the model, what percent of patients survive 1 year after initial diagnosis? (b) What percent of patients survive 3 years after initial diagnosis? (c) Explain the meaning of the base 0.6 in the context of this problem. (a) According to the model, % of patients survive 1 year after initial diagnosis. (Type an integer or a decimal.) (b) According to the model, % of patients survive 3 years after initial diagnosis. (Type an integer or a decimal.) (c) Explain the meaning of the base 0.6 in the context of this problem. Select the correct choice below and fill in the answer box to complete your choice. O A. As each year passes, % of the previous year's survivors have survived. O B. As each year passes, % of the previous survivors take the diagnosis. O C. As each vear passes. % of the total patients have survived.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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The percentage of patients
who have survived t years after initial diagnosis of a certain disease is modeled by the function P(t) = 100(0.6)'.
(a) According to the model, what percent of patients survive 1 year after initial diagnosis?
(b) What percent of patients survive 3 years after initial diagnosis?
(c) Explain the meaning of the base 0.6
the context of this problem.
(a) According to the model, % of patients survive 1 year after initial diagnosis.
(Type an integer or a decimal.)
(b) According to the model, % of patients survive 3 years after initial diagnosis.
(Type an integer or a decimal.)
(c) Explain the meaning of the base 0.6 in the context of this problem. Select the correct choice below and fill in the answer box to complete your choice.
O A. As each year passes,
% of the previous year's survivors have survived.
O B. As each year passes,
% of the previous survivors take the diagnosis.
O C. As each year passes,
% of the total patients have survived.
Transcribed Image Text:The percentage of patients who have survived t years after initial diagnosis of a certain disease is modeled by the function P(t) = 100(0.6)'. (a) According to the model, what percent of patients survive 1 year after initial diagnosis? (b) What percent of patients survive 3 years after initial diagnosis? (c) Explain the meaning of the base 0.6 the context of this problem. (a) According to the model, % of patients survive 1 year after initial diagnosis. (Type an integer or a decimal.) (b) According to the model, % of patients survive 3 years after initial diagnosis. (Type an integer or a decimal.) (c) Explain the meaning of the base 0.6 in the context of this problem. Select the correct choice below and fill in the answer box to complete your choice. O A. As each year passes, % of the previous year's survivors have survived. O B. As each year passes, % of the previous survivors take the diagnosis. O C. As each year passes, % of the total patients have survived.
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