Let x be the number of needed years.
1. He deposits $10,000 into his checking account and he will withdraw $1,200 from his checking account each year. Then after x years he will have $10,000-$1,200x in his checking account.
2. He deposits $2,000 into his savings account and his savings account earns 8% interest each year, then after x years he will have [tex]\$2,000\cdot (1.08)^x.[/tex]
3. Equate these amounts of money:
[tex]10,000-1,200x=2,000\cdot (1.08)^x.[/tex]
4. Solve this equation:
- divide the equation by 400:
[tex]25-3x=5\cdot (1.08)^x;[/tex]
- plot graphs of the function [tex]y=25-3x[/tex] and [tex]y=5\cdot (1.08)^x[/tex] (see attached diagram);
- find the common point of these two graphs: (6.663,5.01).
Conclusion: he needs nearly 6.663 years.
