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Rationalization

Number System II - Concepts

Converting Non Terminating Repeating Decimals into Fractions

Number Line using Successive Magnification

Plotting any Irrational Numbers On a Number Line

Rationalization

Class - 9th IMO Subjects

Concept Explanation

Rationalization

RATIONALIZATION:

Let a and be positive real numbers.Then,

$large (i)(sqrt{a}+sqrt{b})(sqrt{a}-sqrt{b})=a-b$

$large (ii)(a+sqrt{b})(a-sqrt{b})=a^{2}-b$

$large (iii)(sqrt{a}pm sqrt{b})^{2}=apm 2sqrt{ab}+b$

$large (iv)(sqrt{a}+sqrt{b})(sqrt{c}+sqrt{d})=sqrt{ac}+sqrt{ad}+sqrt{bc}+sqrt{bd}$

Rationalisation of Denominator:

Sometimes we come across expressions containing square roots in their denominators. Addition, subtraction, multiplication and division of such expressions in convenient if their denominators are free from square roots.To make the denominators free from square roots, we multiply the numerator and denominator by an irrational number. Such a number is called rationalisation factor.

Consider the expression $large frac{3+sqrt{5}}{sqrt{2}}$ .

We know that $large sqrt{2}timessqrt{2}=2.$ Therefore, to remove the square root from the denominator we multiply its numerator and denominator by $large sqrt{2}$ .

$large therefore$ $large frac{3+sqrt{5}}{sqrt{2}}=frac{3+sqrt{5}}{sqrt{2}timessqrt{2}}=sqrt{2}=frac{3sqrt{2}+sqrt{5}timessqrt{2}}{2}=frac{3sqrt{2}+sqrt{10}}{2}$

Let us now consider the expression $large frac{1}{2+sqrt{3}}$

We know that $large (a+sqrt{b})(a-sqrt{b})=a^{2}-b$

$large therefore$ $large (2+sqrt{3})(2-sqrt{3})=4-3=1,$ which is a rational number

So, we multiply the numerator and denominator by $large 2-sqrt{3}$

$large therefore ;frac{1}{2+sqrt{3}}=frac{1}{2+sqrt{3}}timesfrac{2-sqrt{3}}{2-sqrt{3}}=frac{2-sqrt{3}}{4-3}=2-sqrt{3}$

Example: If $large x=2+sqrt{3},$ find the valur of $large x^{2}+frac{1}{x^{3}}$

SOLUTION We have, $large x=2+sqrt{3},$

$large therefore$ $large frac{1}{x}=frac{1}{2+sqrt{3}}=frac{1}{2+sqrt{3}}timesfrac{2-sqrt{3}}{2-sqrt{3}}=frac{2-sqrt{3}}{2^{2}-(sqrt{3})^{2}}=frac{2-sqrt{3}}{4-3}=2-sqrt{3}$

Now, $large x^{2}+frac{1}{x^{2}}=left ( x+frac{1}{x} right )^{2}-2$

$large Rightarrow ;;x^{2}+frac{1}{x^{2}}=(2+sqrt{3}+2-sqrt{3})^{2}-2=4^{2}-2=16-2=14$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

The simplest rationalising factor of $large sqrt[4]{48}$ is
A. $sqrt[4]{9}$
B. $sqrt[4]{27}$
C. $sqrt[3]{9}$
D. None of these
Right Option : B
View Explanation

Question : 2

If $large x=frac{sqrt5+sqrt3}{sqrt5-sqrt3};;and;; y=frac{sqrt5-sqrt3}{sqrt5+sqrt3}$ ,then x + y + xy =
A. 9	B. 5	C. 17	D. 7
Right Option : A
View Explanation

Question : 3

If a=2+ $sqrt3$ and b=2- $sqrt3$ then $frac{1}{a^2}-frac{1}{b^2}$ is equal to
A. 14		B. -14
C. 8 $sqrt3$		D. -8 $sqrt3$
Right Option : D
View Explanation

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Language - English

Chapters

Polynomials II

Direct and Inverse Variation

Linear Equations in One Variable

Introduction to Trigonometry

Introduction to Euclids Geometry

Herons Formula Complete

Polynomial I

Surface Area and Volume II

Surface Area and Volume I

Coordinate Geometry

Constructions

Areas Of Parallelograms And Triangles II

Areas Of Parallelograms And Triangles I

Linear Equations in Two Variables

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Rationalization

Rationalization

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Om Umang

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Shreya Shrivastava

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Yatharthi Sharma

Eshan Arora

Archit Segal

Shivam Rana

Aman Kumar Shrivastava

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Ayan Ghosh

Prisha Gupta

Cheshta

Yogansh Nyasi