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Cube Root by Successive Subtraction

Cube and Cube Roots - Concepts

Cube Root by Prime Factorisation

Cube using Column Method

Perfect Cube

Properties of Cubes of Numbers

Cube Root by Estimation Method

Cube Root by Successive Subtraction

Cube Root Using Digits

Class - CLAT Subjects

Concept Explanation

Cube Root by Successive Subtraction

Like squares of natural numbers, cubes too have some interesting patterns.

$1^{3}=1$

$2^{3}=8Rightarrow 2^{3}-1^{3}=7=1+1times6$

$=1+2times1times3$

$3^{3}=27Rightarrow 3^{3}-2^{3}=27-8=19$

$=1+1times6+2times6$

$=1+3times2times3$

$4^{3}=64Rightarrow 4^{3}-3^{3}=64-27=37$

$=1+1times6+2times6+3times6$

$=1+4times3times3$

$5^{3}=125Rightarrow 5^{3}-4^{3}=125-64=61$

$=1+1times6+2times6+3times6+4times6$

$=1+5times4times3$

$9^{3}=729Rightarrow 9^{3}-8^{3}=729-512=217$

$=1+1times6+2times6+3times6+4times6...+8times6$

$=1+9times8times3$

Also $1=1^{3}$

$1+7=2^{3}$

$1+7+19=3^{3}$

$1+7+19+37=4^{3}$

$1+7+19+...+217=9^{3}$

From the above pattern, we see that $2^{3}$ is the sum of the first two numbers of the sequence 1,7,19.37,...Similarly, $3^{3}$ is the sum of the first three numbers and so on.In short,these numbers(1,7,19,...)may be obtained by putting n=1,2,3,...in 1+n(n-1) X 3

Thus to find the cube root of a given number, we go on subtracting the numbers of the sequence 1,7,19,37,... till we get a zero. The number of subtractions needed for this purpose is the cube root of the given number.

Illustration: Find the cube root of 343 by successive subtraction.

Solution: Subtract the numbers of the sequence 1,7,19,37,...from 343 till we get zero.

343-1=342

342-7=335

335-19=316

316-37=279

279-61=218

218-91=127

127-127=0

Since we have subtracted seven times to get 0, Hence $sqrt[3]{343}=7$

Illustration: Find the cube root of 216 by successive subtraction.

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Sample Questions

(More Questions for each concept available in Login)

Question : 1

What is the number obtained in the second step while finding the cube root of 216 by successive subtraction?
A. 208	B. 189	C. 208	D. 6
Right Option : C
View Explanation

Question : 2

What is the number obtained in the eighth step while finding the cube root of 729 by successive subtraction?
A. 207	B. 227	C. 107	D. 217
Right Option : D
View Explanation

Question : 3

What is the number obtained in the sixth step while finding the cube root of 512 by successive subtraction?
A. 387	B. 286	C. 169	D. 296
Right Option : D
View Explanation

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Abhyas institute is one of the best coaching institute in the vicinity of Ambala cantt.The institute provides good and quality education to the students.The teachers are well experienced and are very helpful in solving the problems. The major advantages of the institute is extra classes for weak...

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Cube Root by Successive Subtraction

Cube Root by Successive Subtraction

Students / Parents Reviews [20]

Ayan Ghosh

Eshan Arora

Upmanyu Sharma

Yogansh Nyasi

Ayan Ghosh

Barkha Arora

Manya

Shivam Rana

Aman Kumar Shrivastava

Hridey Preet

Om Umang

Aman Kumar Shrivastava

Barkha Arora

Shreya Shrivastava

Aman Kumar Shrivastava

Hiya Gupta

Shreya Shrivastava

Manish Kumar

Prisha Gupta

Cheshta