Which is larger ?

(i) 2³ or 3²

(ii) 2⁵ or 5²

(iii) 3⁷ or 7³.

Fill in the blanks :

(i) In an exponential form x^m; x is called the …………… .

(ii) We have : $\dfrac{a^m}{a^n} = \dfrac{1}{a^{n-m}}$ if …………… .

(iii) Any number to the power 0 is equal to …………… .

(iv) The exponential form is also called …………… .

(v) The reciprocal of x^a is equal to x to the power …………… .

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

In a bacteria culture under observation in a laboratory, the population of 50 bacteria doubles itself every hour.

(1) Which of the following expressions gives the bacterial population after n hours ?

1. $\dfrac{50}{2^{n}}$

2. 25ⁿ

3. 50 x 2ⁿ

4. $\dfrac{50^{n}}{2}$

(2) The population size of the bacteria after 3 hours will be

1. 200
2. 300
3. 400
4. 500

(3) How many bacteria will be there in the culture after 1 day ?

1. $\dfrac{50}{2^{12}}$

2. 50 x 2²⁴

3. 50 x 2¹²

4. $\dfrac{50}{2^{24}}$

(4) If the culture is observed after every one hour, find the number of hours after which the population size of the bacteria will be larger than 1000.

1. 5
2. 6
3. 8
4. 10