A computer purchased for ₹72900 loses two-third of its value every year. Its value is evaluated at the end of every year.

(1) Which of the following expressions gives the value of the computer (in ₹) after n years?

1. $\dfrac{72900}{\Big(\dfrac{2}{3}\Big)^{n}}$

2. $\dfrac{2^{n} \times 27900}{3^{n}}$

3. $\dfrac{72900}{3^{n}}$

4. $\dfrac{72900}{2^{n} \times 3^{n}}$

(2) Find the value of the computer after 3 years.

1. ₹8100
2. ₹2430
3. ₹5600
4. ₹2700

(3) In how many years will the value of the computer be less than ₹200 ?

1. 6 years
2. 7 years
3. 8 years
4. 10 years

(4) By how much will the value of the computer reduce in 4 years ?

1. ₹24300
2. ₹1800
3. ₹8100
4. ₹72000

(1) Given:

Initial Value = ₹72,900

Loss in value every year = $\dfrac{2}{3}$

Value remaining every year = $1 - \dfrac{2}{3} = \dfrac{1}{3}$ of the previous year's value.

Every year, the value is multiplied by $\dfrac{1}{3}$. After n years, the value is $72900 \times (\dfrac{1}{3})^n$, which is $\dfrac{72900}{3^n}$.

Hence, option 3 is the correct option.

(2) Value of the computer after 3 years = ?

Value of the computer after n years = $\dfrac{72900}{3^n} \quad$ [From previous step]

By replacing the value of 'n' with 3, we get:

₹ $\dfrac{72900}{3^3} = ₹ \dfrac{72900}{27}$

= ₹2700

Hence, option 4 is the correct option.

(3) We know at 3 years, value = ₹2700. $\quad$ [From previous step]

Value remaining every year = $1 - \dfrac{2}{3} = \dfrac{1}{3}$ of the previous year's value. $\quad$ [From step 1]

∴ Value after 4 years = $\dfrac{1}{3} \times 2700 = \dfrac{2700}{3} = ₹ 900$

Value after 5 years = $\dfrac{1}{3} \times 900 = \dfrac{900}{3} = ₹ 300$

Value after 6 years = $\dfrac{1}{3} \times 300 = \dfrac{300}{3} = ₹ 100$

Since 100 < 200, it takes 6 years.

Hence, option 1 is the correct option.

(4) Value of the computer reduced in 4 years = ?

Value after 4 years = ₹ $\dfrac{72900}{3^4} = ₹ \dfrac{72900}{81} = ₹ 900$

Value of the computer reduced in 4 years = Initial value - Value after 4 years

Substituting the values in above, we get:

Value of the computer reduced in 4 years = ₹72900 - ₹ 900 = ₹ 72000

Hence, option 4 is the correct option.