Explore topic-wise InterviewSolutions in Current Affairs.

This section includes 7 InterviewSolutions, each offering curated multiple-choice questions to sharpen your Current Affairs knowledge and support exam preparation. Choose a topic below to get started.

1.

Distinguish between living and non-living things.

Answer»
Living thingsNon-living things
1. Living things exhibit life processes such as nutrition, respiration, excretion, metabolism, growth and movement.1. Non-living things do not exhibit life processes.
2.These are biotic component of ecosystem.2. These are abiotic component of ecosystem.
2.

Why elephants and other wild animals are entering into human living area?

Answer»

Elephants and other wild animals enter into human living area because of the loss of their habitat, deforestation, mono-culture vegetation by destroying forests.

3.

Inbreeding is possible between two members of …………(a) order (b) family (c) genus (d) species

Answer»

Inbreeding is possible between two members of species.

4.

Which of the following taxons cover a greater number of organisms?(a) order (b) family (c) genus (d) phylum

Answer»

Correct Answer is : (d) phylum

5.

Using the method of successive subtraction examine whether or not the following numbers are perfect cubes:(i) 130(ii) 345

Answer»

(i) 130

130 – 1 = 129

129 – 7 = 122

122 – 19 = 103

103 – 37 = 66

66 – 61 = 5

Other number to be subtracted is 91, which is greater than 5

130 is not a perfect cube.

(ii) 345

345 – 1 = 344

344 – 7 = 337

337 – 19 = 318

318 – 37 = 281

281 – 61 = 220

220 – 91 = 129

129 – 127 = 2

Other number to be subtracted is 169, which is greater than 2

∴ 345 is not a perfect cube

6.

Find the cube root of each of the following natural numbers: (i) 343 (ii) 2744 (iii) 4913 (iv) 1728 (v) 35937

Answer»

(i) 343 

By prime factorization method, 

\(\sqrt[3]{343} \) = \(\sqrt[3]{7\times7\times7} = 7.\)

(ii) 2744

By prime factorization method,

\(\sqrt[3]{2744}\) = \(\sqrt[3]{2\times2\times2\times7\times7\times7}\) = \(\sqrt[3]{2^3\times7^3} \) = \(2\times7\) = 14.

(iii) 4913

By prime factorization method,

\(\sqrt[3]{1728}\) = \(\sqrt[3]{2\times2\times2\times2\times2\times2\times3\times3\times3}\) = \(\sqrt[3]{2^3\times2^3\times3^3}\) =
\(2\times2\times3 = 12\)

(iv) 1728

By prime factorization method,

\(\sqrt[3]{1728}\) = \(\sqrt[3]{2\times2\times2\times2\times2\times2\times3\times3\times3}\) = \(\sqrt[3]{2^3{\times2^3}\times{3^3}}\) = \(2\times2\times3 = 12.\)

(v) 35937

By prime factorization method,

\(\sqrt[3]{35937}\) = \(\sqrt[3]{3\times3\times3\times11\times11\times11}\) = \(\sqrt[3]{3^3\times11^3}\) = \(3\times11 = 33.\) 

7.

A child takes reading of two cars running on highway, for his school project. He draws a position-time graph of the two cars as shown in the figure(i) What is the velocity of two cars when they meet together?(ii) What is the difference in velocities of the two cars when they cover their maximum distance?(iii) What will be acceleration of the two cars in first 20 s?

Answer»

(i) According to graph, the velocity of two cars when they meet each other are,

x = 70m

t = 308

v = \(\frac{x}{t}=\frac{70}{30}\) = 2.33 m/s

(ii) According to graph, for maximum distance.

For 1st car,

x1 = 120m

t1 = 50 s

v1 = \(\frac{x_1}{t_1}=\frac{120}{50 }\)

v1 = 2.4 m/s

For 2nd car,

x2 = 90 m

t2 = 60 s

v2 = \(\frac{x_2}{t_2}=\frac{90}{60 }\)

v2 = 1.5 m/s

Difference in velocities is given by,

v1 – v2 = 2.4 – 1.5 = 0.9 m/s

(iii) According to graph,

Acceleration of 1st car in first 20 s

v1 = \(\frac{X_1}{t}\)

v1\(\frac{60}{20}\)

v1 = 3 m/s

a1 = \(\frac{V_1}{t}=\frac{3}{20}\)

a1 = 0.15 m/s2

Acceleration of 2nd car in first 20 s

v2\(\frac{X_2}{t}\)

v2 = \(\frac{40}{20}\)

v2 = 2 m/s

a2\(\frac{V_2}{t}=\frac{2}{20}\)

a2 = 0.1 m/s2

Now,

a1 – a= 0.15 – 0.1

= 0.05 m/s2

(i) The velocity of two cars when they meet together is 2.33 m/s.

(ii) The difference in velocities of two cars when they cover maximum distance is 0.9 m/s.

(iii) The accelerator of two cars in 20 s is 0.05 m/s2.

8.

How many perfect cubes are there from 1 to 500? How many are perfect square among these cubes?

Answer»

From 1 to 500 there are 7 perfect cubes and 2 of these are perfect squares. 

Perfect cubes 1, 8, 27, 64, 125, 216, 343, 

Perfect squares are 1 = 12 = 13 and 64 = 82 = 43

9.

How many perfect cubes you can find from I to 100? How many from - 100 to 100?

Answer»

From 1 to 100 there are 4 perfect cubes. 1, 8, 27, 64 From -100 to 100 there are 9 perfect cubes -64, -27, -8, -1, 0, 1, 8, 27, 64

10.

Find the tens digit of the cube root of each of the following numbers  (i) 226981(ii) 13824(iii) 571787(iv) 175616

Answer»

(i) 226981

Unit digit of 226981 = 1

Cube root of 226981 = 1

After striking out the units, tens and hundreds digits of 226981, now we left with 226 only.

We know that 6 is the Largest number whose cube root is less than or equal to 226(63<226<73).

∴ The tens digit of the cube root of 226981 is 6.

(ii) 13824

Unit digit of 13824 = 4

Cube root of 13824 = 4

After striking out the units, tens and hundreds digits of 13824, now we left with 13 only.

We know that 2 is the Largest number whose cube root is less than or equal to 13(23<13<33).

∴ The tens digit of the cube root of 13824 is 2.

(iii) 571787

Unit digit of 571787 = 7

Cube root of 571787 = 3

After striking out the units, tens and hundreds digits of 571787, now we left with 571 only.

We know that 8 is the Largest number whose cube root is less than or equals to 571(83<571<93).

∴ The tens digit of the cube root of 571787 is 8.

(iv) 175616

Unit digit of 175616 = 6

Cube root of 175616 = 6

After striking out the units, tens and hundreds digits of 175616, now we left with 175 only.

We know that 5 is the Largest number whose cube root is less than or equals to 175(53<175<63).

∴ The tens digit of the cube root of 175616 is 5.

11.

What is the cube root of 13824? (a) 24 (b) 56 (c) 18 (d) 124

Answer»

24 is the cube root of 13824.

12.

Find the cubes of 10, 30, 100, 1000. What can you say about the zeros at the end?

Answer»

103= 10 x 10 x 10 = 1.000 (3 zeros) 

303 = 30 × 30 × 30 = 27000 (3 zeros) 

1003 = 100 × 100 × 100 = 1000000 (6 zeros) 

10003 = 1000 × 1000 × 1000 = 1000000000 (9 zeros) 

The number of zeros at the end are always multiple of 3

13.

Find the cubes of the first five odd natural numbers and the cubes of the first five even natural numbers. What can you say about, the parity of the odd cubes and even cubes?

Answer»

13 = 1 × 1 × 1 = 1 

23 = 2 × 2 × 2 = 8 

33 = 3 × 3 × 3 = 27 

43 = 4 × 4 × 4 = 64 

53 = 5 × 5 × 5=125 

63 = 6 × 6 × 6 = 216 

73 = 7 × 7 × 7 = 343 

83= 8 × 8 × 8 = 512 

93 = 9 × 9 × 9 = 729 

103 = 10 × 10 × 10= 1000 

The cube of an odd number is odd and the cube of an even number is even.

14.

Show that the following integers are cubes of negative integers. Also, find the integer whose cube is the given integer.(i) -5832(ii) -2744000

Answer»

(i) -5832

5823 = 2 × 2 × 2 × 3 × 3 × 3 × 3 × 3 × 3

= 23 × 33 × 33

= 183

5832 is a perfect cube.

∴ -5832 is a cube of negative integer – 18.

(ii) -2744000

2744000 = 2 × 2 × 2 × 2 × 2 × 2 × 5 × 5 × 5 × 7 × 7 × 7

= 23 × 2× 53 × 73

2744000 is a perfect cube.

∴ -2744000 is a cube of negative integer – 140.

15.

Which of the following integers are cubes of negative integers ?(i) -64(ii) -1056(iii) -2197

Answer»

(i) -64

64 = 2 × 2 × 2 × 2 × 2 × 2

= 23 × 23

= 43

∴ 64 is a perfect cube of negative integer – 4.

(ii) -1056

1056 = 2 × 2 × 2 × 2 × 2 × 3 × 11

1056 is not a perfect cube.

-1056 is not a cube of negative integer.

(iii) -2197

2197 = 13 × 13 × 13

= 133

∴ 2197 is a perfect cube of negative integer – 13.

16.

Fill in the blanks to make the statements true.1m3 = _________ cm3.

Answer»

We know that, 1m = 100 cm

Then,

1m3 = 1000000 cm3

17.

Find the cube root of each of the following numbers by prime factorisation method.(i) 64(ii) 512(iii) 10648(iv) 27000(v) 15625

Answer»

(i) Prime factorisation of 64 = 2 x 2 x 22 x 2 x 2

∴  3√64 = 2 x 2 = 4

(ii) Prime factorisation of 512 = 2 x 2 x 2 x 2 x 2 x 2 x 2 x 2 x 2

∴  3√512 = 2 x 2 x 2 = 8

(iii) Prime factorisation of 10648 = 2 x 2 x 2 x 11 x 11 x 11

∴  3√10648 = 2 x 11 = 22

(iv) Prime factorisation of 27000 = 2 x 2 x 2 x 3 x 3 x 3 x 5 x 5 x 5

∴  3√27000 = 2 x 3 x 5 = 30

(v) Prime factorisation of 15625 = 5 x 5 x 5 x 5 x 5 x 5

∴  3√15625 = 5 x 5 = 25

18.

Fill in the blanks to make the statements true.1m2 = _________ cm2.

Answer»

We know that, 1m = 100 cm

Then,

1m2 = 10000 cm2

19.

Fill in the blanks to make the statements true.The cube of 100 will have _________ zeroes.

Answer»

The cube of 100 will have 6 zeroes.

= 1003

= 100 × 100 × 100

= 1000000

20.

How many consecutive odd numbers will be required to get 103? (a) 5 (b) 8 (c) 10 (d) 100

Answer»

10 consecutive odd numbers will be required to get 103.

21.

State true or false.(i) Cube of any odd number is even.(ii) A perfect cube does not end with two zeroes.(iii) If square of a number ends with 5, then its cube ends with 25.(iv) There is no perfect cube which ends with 8.

Answer»

(i) False. When we find out the cube of an odd number, we will find an odd number as the result because the unit place digit of an odd number is odd and we are multiplying three odd numbers. Therefore, the product will be again an odd number. For example, the cube of 3 (i.e., an odd number) is 27, which is again an odd number.

(ii) True. Perfect cube will end with a certain number of zeroes that are always a perfect multiple of 3. Foe example, the cube of 10 is 1000 and there are 3 zeroes at the end of it. The cube of 100 is 1000000 and there are 6 zeroes at the end of it.

(iii) False. It is not always necessary that if the square of a number ends with 5, then its cube will end with 25. For example, the square of 25 is 625 and 625 has its unit digit as 5. The cube of 25 is 15625. However, the square of 35 is 1225 and also has its unit place digit as 5 but the cube of 35 is 42875 which does not end with 25.

(iv) False. There are many cubes which will end with 8. The cubes of all the numbers having their unit place digit as 2 will end with 8. The cube of 12 is 1728 and the cube of 22 is 10648.

22.

Find the cube root of 8000 by prime factorization method.

Answer»

8000 = 2 x 2 x 2 x 2 x 2 x 2 x 5 x 5 x 5 

∴ ³√8000 

= 2 x 2 x 5 

= 20.

23.

Find the nearest integer to the cube root of each of the following. (i) 331776 (ii) 46656 (iii) 373248

Answer»

(i) 331776

603 = 216000 < 331776 < 343000 = 703 

Hence \(3\sqrt{331776}\) lies between 60 and 70. 

We do not know whether 331776 in a perfect cube or not. 

However we may sharpen the bound. 

683 = 314432, 693 = 328509 

Hence \(3\sqrt{331776}\) lies between 69 and 70 

331776 – 328509 = 3267 

343000 – 331776= 11224 

331776 in nearer to 693 

∴ The closest integer to \(3\sqrt{331776}\) is 69. 

(ii) 46656

303 = 2700 < 46656 < 64000 – 403 

\(3\sqrt{46656}\) lies between 30 and 40 we do not know whether 46656 in a perfect cube or not. 

However we may sharper the bound 

353 = 42875, 363 = 46656

∴ \(3\sqrt{46656}\) = 36

(iii) 373248

703 = 343000 < 373248 < 512000 – 803 

\(3\sqrt{373248}\) lies between 70 and 80. 

We do not know whether 373248 is a perfect cube or not. 

However we may sharpen the bound. 

713 = 357911, 723 = 373248

∴ \(3\sqrt{373248}\) = 72

24.

The cube-root of 1000 is (a) 1 (b) 10 (c) 100 (d) 1000

Answer»

The cube-root of 1000 is 10.

25.

Cube of 80 is (a) 51200 (b) 512000 (c) 512 (d) 520

Answer»

Cube of 80 is 512000.

26.

Determine True/False in the given statements. (i) Every even number has even cube. (ii) A perfect cube does not end with double zero (00). (iii) No one perfect cube end with 8. (iv) If square of any number is ending with 5 then its cube is end with 25. (v) Cube of single digit is also a single digits number. (vi) Cube of double digit number is of 4 to 6 digits.

Answer»

(i) True 

(ii) True 

(iii) False 

(iv) True 

(v) False 

(vi) True

27.

State true or false. (i) Cube of any odd number is even. (ii) A perfect cube does not end with two zeros. (iii) If square of a number ends with 5, then its cube ends with 25. (iv) There is no perfect cube which ends with 8. (v) The cube of a two digit number may be a three digit number.(vi) The cube of a two digit number may have seven or more digits. (vii) The cube of a single digit number may be a single digit number.

Answer»

(i) False 

(ii) True 

(iii) False 

(iv) False 

(v) False 

(vi) False 

(vii) True

28.

Fill in the blanksCubes of even numbers are ____

Answer»

Cubes of even numbers are even.

29.

Volume of a cube is 9261000 m3 . Find the side of cube.

Answer»

Let side of a cube = a m 

then volume of a cube = a x a x a = a3 

According to question, a3 = 9261000 

a = 3√9261000 

a = 2 x 3 x 5 x 7 = 210 m 

∴ side of a cube = 210 m.

30.

The Cube of 46 will be even or odd.

Answer»

Given number 46 is even number 

∴ Cube of given even number will also even number .

∵ Cube of even number is always even number.

31.

Write the units digit of the cube of each of the following numbers:31, 109, 388, 4276, 5922, 77774,

Answer»

i) 31

= Unit digit of 31 is 1

Cube of 1,

= 13

 = 1

∴ Unit digit of cube of 31 is always 1

ii) 109

Unit digit of 109 is = 9

Cube of 9, 

= 93 

= 729

∴ Unit digit of cube of 109 is always 9

iii) 388

Unit digit of 388 is = 8

Cube of 8,

 = 83 

= 512

∴ Unit digit of cube of 388 is always 2

iv) 4276

Unit digit of 4276 is = 6

Cube of 6 

= 63 

= 216

∴ Unit digit of cube of 4276 is always 6

v) 5922

Unit digit of 5922 is = 2

Cube of 2, 

= 23 

= 8

∴ Unit digit of cube of 5922 is always 8

vi) 77774

Unit digit of 77774 is = 4

Cube of 4, 

= 43 

= 64

∴ Unit digit of cube of 77774 is always 4

32.

Which of the following ray diagram is correct for Which of the following ray diagram is correct for myopia defect ?D)  All

Answer»

Correct option is  D) all

33.

Which of the following ray diagram is correct for hypermetropia defect.D)   All

Answer»

Correct option is  D) All

34.

How many perfect cube numbers are there in between 1 to 1000? (a) 10 (b) 18 (c) 25 (d) 52

Answer»

10 perfect cube numbers are there in between 1 to 1000.

35.

Suman makes a cuboid of soil of sides 15 cm, 30 cm and 15 cm. How many such cuboids will he need to form a cube?

Answer»

Volume of a cuboid 

= 15 x 30 x 15 

= 3 x 5 x 2 x 3 x 5 x 3 x 5 

= 2 x 3 x 3 x 3 x 5 x 5 x 5 

In above. By Prime factorization 2 comes only one time there fore such, cuboid will he need to form a cube = 2 x 2 = 4.

36.

Consider the following two statements : (A) Linear momentum of a system of particles is zero. B) Kinetic energy of a system of particles is zero. (a) A implies B and B implies A. (b) A does not imply B and B does not imply A. (c) A implies B but B does not imply A. (d) B implies A but A does not imply B.

Answer»

(d) B implies A but A does not imply B.

Explanation: 

If (B) is true, then ½Σimivi² = 0. In this equation v is magnitude of velocity and m is mass. Mass cannot be zero and square of a scaler quantity can only be zero if it is zero. It means magnitude of velocity of each particle is zero. In that case Σimivi =0. So clearly (B) implies (A). 

Now if (A) is true, it does not mean that magnitude of each particle is zero. Since linear momentum is a vector, and sum (resultant) of vectors can be zero even if each vector is non-zero. It means momentum of each particle is not zero, hence some of the particles may have non-zero magnitude. In that case (B) is not true. So (A) does not imply (B).

37.

Find the cube-roots of :-64 x (-125)

Answer»

-64 x -125

= 3√(-(4 x 4 x 4) x -(5 x 5 x 5))

= -4 x (-5) = 20

38.

Find the least number by which 1188 should be divided so as to get a perfect cube number.

Answer»

Prime factors of 1188 = 2 x 2 x 3 x 3 x 3 x 11

Remaining factors after obtaining the triples, are 2 x 2 x 11. 

So we need to divide 1188 by 2 x 2 x 11 = 44 to get a perfect cube.

39.

\((1\frac{3}{4})^3\) = ?A. \(1\frac{27}{64}\)B. \(2\frac{27}{64}\)C. \(5\frac{23}{64}\)D. none of these

Answer»

\((1\frac{3}{4})^3\)

\((\frac{7}{4})^3\) 

\(\frac{7\times7\times7}{4\times4\times4}\)

\(\frac{343}{64}\)

\(5\frac{23}{64}.\)

40.

Evaluate:(i) ∛36 × ∛384(ii) ∛96 × ∛144

Answer»

(i) ∛36 × ∛384

As we know,∛a × ∛b = ∛(a×b)

Now,

∛36 × ∛384 = ∛(36×384)

= ∛(2×2×3×3) × (2×2×2×2×2×2×3×3×3)

= ∛(23×23×23×33)

= 2×2×2×3

= 24

(ii) ∛96 × ∛144

As we know, ∛a × ∛b = ∛ (a×b)

Now,

∛96 × ∛144 = ∛ (96×144)

= ∛ (2×2×2×2×2×3) × (2×2×2×2×3×3)

= ∛(23×23×23×33)

= 2×2×2×3

= 24

41.

Looking at the pattern fill in the gaps in the followings.

Answer»
234-568-9
23= 833 = 2743 = 64-53 = -12563 = 21683 = 512-93 = -729
42.

 Evaluate: (i) ∛100 × ∛270(ii) ∛121 × ∛297

Answer»

 (i) ∛100 × ∛270

As we know ∛a × ∛b = ∛(a×b)

Now,

∛100 × ∛270 = ∛(100×270)

= ∛ (2×2×5×5) × (2×3×3×3×5)

= ∛(23×33×53)

= 2×3×5

= 30

(ii) ∛121 × ∛297

As we know ∛a × ∛b = ∛(a×b)

Now,

∛121 × ∛297 = ∛ (121×297)

= ∛ (11×11) × (3×3×3×11)

= ∛(113×33)

= 11×3

= 33

43.

Show that:(i) ∛(729)/ ∛ (1000) = ∛(729/1000)(ii) ∛(-512)/ ∛ (343) = ∛(-512/343)

Answer»

(i) ∛(729)/ ∛(1000) = ∛(729/1000)

L.H.S=  ∛(729)/ ∛(1000)

∛(729)/ ∛(1000) = ∛(9×9×9)/ ∛(10×10×10)

= ∛(93/103)

= 9/10

 R.H.S =  ∛(729/1000)

∛(729/1000) = ∛(9×9×9/10×10×10)

= ∛ (93/103)

= 9/10

 L.H.S = R.H.S

(ii) ∛(-512)/ ∛(343) = ∛(-512/343)

L.H.S =  ∛(-512)/ ∛ (343)

∛(-512)/ ∛(343) = ∛-(8×8×8)/ ∛(7×7×7)

= ∛-(83/73)

= -8/7

 R.H.S = ∛(-512/343)

∛(-512/343) =∛-(8×8×8/7×7×7)

= ∛-(83/73)

= -8/7

L.H.S = R.H.S

44.

What is the length of the side of a cube whose volume is 275 cm3. Make use of the table for the cube root.

Answer»

The given volume of the cube = 275cm3

Let the side of the cube as ‘a’cm

a3 = 275

a = ∛275

We know that value of ∛275 will lie between ∛270 and ∛280

From cube root table we get,

∛270 = 6.463

∛280 = 6.542

By using unitary method,

Difference between the values (280 – 270 = 10)

So, the difference in cube root values will be = 6.542 – 6.463 = 0.079

Difference between the values (275 – 270 = 5)

So, the difference in cube root values will be = (0.079/10) × 5 = 0.0395

∛275 = 6.463 + 0.0395 

= 6.5025

∴ the answer is 6.503cm

45.

 Evaluate each of the following:(i) ∛27 + ∛0.008 + ∛0.064(ii) ∛1000 + ∛0.008 – ∛0.125(iii) ∛(729/216) × 6/9

Answer»

(i) ∛27 + ∛0.008 + ∛0.064

= ∛(3×3×3) + ∛(0.2×0.2×0.2) + ∛(0.4×0.4×0.4)

= ∛(3)3 + ∛(0.2)3 + ∛(0.4)3

= 3 + 0.2 + 0.4

= 3.6

(ii) ∛1000 + ∛0.008 – ∛0.125

= ∛(10×10×10) + ∛(0.2×0.2×0.2) – ∛(0.5×0.5×0.5)

= ∛(10)3 + ∛(0.2)3 – ∛(0.5)3

= 10 + 0.2 – 0.5

= 9.7

(iii) ∛(729/216) × 6/9

= ∛(9×9×9/6×6×6) × 6/9

= (∛(9)3 /∛(6)3)× 6/9

= 9/6 × 6/9

= 1

46.

Three numbers are in the ratio 1:2:3. The sum of their cubes is 98784. Find the numbers.

Answer»

Let the ratio 1:2:3 as x, 2x and 3x

According to the question,

x3 + (2x)3 + (3x)3 = 98784

x3 + 8x3 + 27x3 = 98784

36x3 = 98784

x3 = 98784/36

= 2744

x = ∛2744 = ∛(2×2×2×7×7×7) 

= 2×7 = 14

So, the numbers are,

x = 14

2x = 2 × 14 

= 28

3x = 3 × 14 

= 42

47.

∛512 =?a) 6b) 7c) 8d) 9

Answer»

 Firstly we have to find the prime factors of 512

∛512 = \(\sqrt[3]{(8 × 8 × 8)}\)  = 8

∴ 8 is the correct answer.

48.

Fill in the blanks:(i) ∛(125×27) = 3 × ......(ii) ∛(8×…..) = 8(iii) ∛1728 = 4 × …..(iv) ∛480 = ∛3×2× ∛......(v) ∛….. = ∛7 × ∛8

Answer»

(i) ∛(125×27) = 3 × …

L.H.S =  ∛(125×27)

∛(125×27) = ∛(5×5×5×3×3×3)

= ∛(53×33)

= 5×3 or 3×5

(ii) ∛(8×…) = 8

 L.H.S =  ∛(8×…)

∛(8×8×8) = ∛83 

= 8

(iii) ∛1728 = 4 × …

 L.H.S = ∛1728 

= ∛(2×2×2×2×2×2×3×3×3)

= ∛(23×23×33)

= 2×2×3

= 4×3

(iv) ∛480 = ∛3×2× ∛..

L.H.S = ∛480 

= ∛(2×2×2×2×2×3×5)

= ∛(23×22×3×5)

= ∛23× ∛3 × ∛2×2×5

= 2 × ∛3 × ∛20

(v) ∛… = ∛7 × ∛8

R.H.S∛7 =  × ∛8 

= ∛(7 × 8)

= ∛56

49.

Evaluate∛3375

Answer»

The prime factors of 3375 = 3 × 3 × 3 × 5 × 5 × 5

Now by grouping into three we get, (3 × 3 × 3) × (5 × 5 × 5)

∴ \(\sqrt[3]{((3)^3 × (5)^3) }\)

= (3 × 5) 

= 15

50.

Which of the following numbers is a perfect cubea) 141b) 294c) 216d) 496

Answer»

Firstly we have to find the factors for the above numbers

∛141 = \(\sqrt[3]{(3 × 47)}\)

∛294 = \(\sqrt[3]{(2 × 3 × 7 × 7)}\)

∛216 = \(\sqrt[3]{(6 × 6 × 6)}\)

∛496 = \(\sqrt[3]{(2 × 2 × 2 × 2 × 31)}\) 

From the above results, 216 has the perfect cube factors.

∴ 216 is the perfect cube.