Math, asked by charisemae91, 9 months ago

Country A has a growth rate of 3.23.2​% per year. The population is currently 4 comma 4334,433​,000, and the land area of Country A is 3434​,000,000,000 square yards. Assuming this growth rate continues and is​ exponential, after how long will there be one person for every square yard of​ land?

Answers

Answered by prokarthik
0

Answer:

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Step-by-step explanation:

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Answered by Anonymous
3

\huge{\underline{\sf{Solution:-}}}

Letting the current population be year zero:

P = P0(1.027)t

Where P = future population

P0 = initial population in year zero

t = number of years after initial

5,289,000(1.027)t = 27,000,000,000

1.027t = 27,000,000,000/5,289,000

1.027t = = 27,000,000/5,289

Take log of both sides:-

log 1.027t = log (27,000,000/5,289)

t[log 1.027] = log (27,000,000/5,289)

t = log(27,000,000/5,289)/log1.027

\boxed{\sf{t = 320.5 years}}

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