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Properties of Square - Difference of Consecutive Numbers

Concept Explanation

Properties of Square - Difference of Consecutive Numbers

Property :

For every natural number n,

$(n+1)^{2}-n^{2}=(n+1)+n$

i.e., the difference of squares of two consecutive natural numbers is equal to their sum

Proof: For any natural number n, we have

$(n+1)^{2}-n^{2}=(n+1+n)(n+1-n)$ $[Using: a^{2}-b^{2}=(a+b)(a-b)]$

$=(n+1+n)$

ILLUSTRATION: $9^{2}-8^{2}=9+8=17$

$19^{2}-18^{2}=19+18=37$

$28^{2}-27^{2}=28+27=55$

$136^{2}-135^{2}=136+135=271$ etc.

Property:

Between the squares of two consecutive i.e. n² and (n+1), there are 2n non square numbers.

Illustration: The number of non square numbers that lie between the square of 8 and 9 = 8 X 2 = 16

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Sample Questions

(More Questions for each concept available in Login)

Question : 1

How many numbers lie between square of 98 and 99?
A. 189	B. 198	C. 196	D. 169
Right Option : C
View Explanation

Question : 2

The number of non square numbers that lie between the square of 151 and 152 are ___________
A. 304	B. 306	C. 302	D. 300
Right Option : C
View Explanation

Question : 3

How many numbers lie between square of 22 and 23?
A. 46	B. 44	C. 56	D. 64
Right Option : B
View Explanation

Chapters

Cube and Cube Roots

Partnership and Mixture

Permutation and Combination

Sequences and Series

Data Interpretation

Data Sufficiency

Square and Square Root

Time, Speed and Distance

Rules For Divisibility

Pipe And Cistern

Problems On Trains

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Introduction to Trigonometry

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Averages Foundation

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Quadratic Equations

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Fractions and Decimals

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SBI SO General Aptitude Test Series

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Navodaya Entrance 6th & 9th

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About Abhyas metholodology the teachers are very nice and hardworking toward students.The Centre Head Mrs Anu Sethi is also a brilliant teacher.Abhyas has taught me how to overcome problems and has...

About Abhyas metholodology the teachers are very nice and hardworking toward students.The Centre Head Mrs Anu Sethi is also a brilliant teacher.Abhyas has taught me how to overcome problems and has always taken my doubts and suppoeted me.

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