Answer to Question #302848 in Financial Math for Ndi

Solution 1

Here P = R900

Interest rate "r=6.5 %" percent "r=\\frac{6.5}{100}"

The interest is compounded quarterly, so "n=4"

And the number of years "t = 3.5"    (after withdrawing R 1000) 

Then using the formula "A = P (1 + \\frac{r}{100n})^{nt}"

"A = 900 (1 + \\frac{6.5}{100(4)})^{(4)(3.5t)}"

"A = R 1127.85"

So, the amount after 3.5 years is "A = R 1127.85"

And when he withdraws R 1000, the amount left is

"R 1127.85 \u2013 R 1000 = R 127.85"

Now after two years,

Investment Amount          "P = R 127.85"

Number of years                "t=2"

Therefore, using "A = P (1 + \\frac{r}{100n})^{nt}"

"A = 127.85 (1 + \\frac{6.5}{100\\times4})^{4\\times2}"

"A = R 145.44"

The correct answer is first option R 145 

Solution 2

"I = \\frac {PRT} {100}"

Here,

"I" is Interest, which is calculated as

"I = R1605 - R1000"

"I = R605"

Using the values in "I = \\frac {PRT} {100}" , we get

"605 = \\frac {PRT} {100}"

"605\\times 100=PRT\\\\"

"605\\times 100=1000\\times 11\\times T"

"T=\\frac{605\\times 100}{(1000)(11)}\\\\"

"T=5.5"

Hence "T=5.5"  years

Therefore, the second option is correct.