To solve this, we are going to use the compound interest formula: [tex]A=P(1+ \frac{r}{n} )^{nt}[/tex]
where
[tex]A[/tex] is the final amount after [tex]t[/tex] years
[tex]P[/tex] is the initial investment
[tex]r[/tex] is the interest rate in decimal form
[tex]n[/tex] is the number of times the interest is compounded per year
For the first 4 years we know that: [tex]P=2350[/tex], [tex]r= \frac{4.2}{100} =0.042[/tex], [tex]t=4[/tex], and since the problem is not specifying how often the interest is communed, we are going to assume it is compounded annually; therefore, [tex]n=1[/tex]. Lest replace those values in our formula:
[tex]A=P(1+ \frac{r}{n} )^{nt}[/tex]
[tex]A=2350(1+ \frac{0.042}{1} )^{(1)(4)}[/tex]
[tex]A=2350(1+0.042)^{4}[/tex]
[tex]A=2770.38[/tex]
Now, for the next 6 years the intial investment will be the final amount from our previous step, so [tex]P=2770.38[/tex]. We also know that: [tex]r= \frac{4.9}{100} =0.049[/tex], [tex]t=6[/tex], and [tex]n=1[/tex]. Lets replace those values in our formula one more time:
[tex]A=P(1+ \frac{r}{n} )^{nt}[/tex]
[tex]A=2770.38(1+ \frac{0.049}{1})^{(1)(6) [/tex]
[tex]A=2770.38(1+0.049)^6[/tex]
[tex]A=3691.41[/tex]
We can conclude that Collin will have £3691.41 in his account after 10 years.
