A society where the proportion of the population aged 65 and over is 20\% or more of the total population is called a 'super-aged society'. In the year 2000, a certain country had a total population of 10 million and a population aged 65 and over of 500,000. Assuming that the total population increases by 0.3\% each year compared to the previous year and the population aged 65 and over increases by 4\% each year compared to the previous year, when is the first time a 'super-aged society' predicted to occur? (Given: $\log 1.003 = 0.0013 , \log 1.04 = 0.0170 , \log 2 = 0.3010$) [4 points] (1) 2048--2050 (2) 2038--2040 (3) 2028--2030 (4) 2018--2020 (5) 2008--2010
A society where the proportion of the population aged 65 and over is 20\% or more of the total population is called a 'super-aged society'.
In the year 2000, a certain country had a total population of 10 million and a population aged 65 and over of 500,000. Assuming that the total population increases by 0.3\% each year compared to the previous year and the population aged 65 and over increases by 4\% each year compared to the previous year, when is the first time a 'super-aged society' predicted to occur?\\
(Given: $\log 1.003 = 0.0013 , \log 1.04 = 0.0170 , \log 2 = 0.3010$)\\
[4 points]\\
(1) 2048--2050\\
(2) 2038--2040\\
(3) 2028--2030\\
(4) 2018--2020\\
(5) 2008--2010