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Comparison of Rational Numbers by Cross Multiplication

Concept Explanation

Comparison of Rational Numbers by Cross Multiplication

Comparison:

Comparison means to analyse the relation between two numbers. There can be three situations

1. Both the numbers are equal

2. First number is less than the second number

3. First number is more than the second number.

Cross Multiplication:

The method of cross multiplication means multiplying the numerator of one number with the denominator of the other number. For two rational numbers

$frac{p}{q}; and;frac{r}{s}$

Cross multiplication means multiplying the numerator of first number with the denominator of second number and the denominator of first number with the numerator of second number and we get

$ptimes s;and;qtimes r.$

Comparison of Rational Numbers by Cross Multiplication:

When ever we are given two rational numbers and we have to check whether the given rational numbers are equal, less than or greater than, the comparison is done by the method of cross multiplication.

For two rational numbers $frac{p}{q};and;frac{r}{s}$ there can be three situations

Case 1. They are equal if: $ptimes s=qtimes r.$

i.e. , $frac{p}{q}=frac{r}{s}$

$Leftrightarrow ;;ptimes s=qtimes r$

Numerator of first $times$ Denominator of second = Numerator of second $times$ Denominator of first.

Case 2. The first rational number is greater than the second rational number if: $ptimes s> qtimes r.$

i.e. , $frac{p}{q}>frac{r}{s}$

$Leftrightarrow ;;ptimes s>qtimes r$

Numerator of first $times$ Denominator of second > Numerator of second $times$ Denominator of first.

Case 3. The first rational number is less than the second rational number if: $ptimes s<qtimes r.$

i.e. , $frac{p}{q}<frac{r}{s}$

$Leftrightarrow ;;ptimes s=qtimes r$

Numerator of first $times$ Denominator of second < Numerator of second $times$ Denominator of first.

Illustration: Compare the rational numbers $frac{-7}{21};and;frac{3}{-9}$ for equality.

Solution:To compare the rational numbers for equality we will perform cross multiplication

$(-7)times (-9)=21times 3$

$Rightarrow$ 63 = 63

Hence, these rational numbers are equal.

Illustration: Compare the rational numbers , $frac{5}{7};and;frac{20}{28}$ for equality.

Solution: To compare the rational numbers for equality we will perform cross multiplication

$5times 28=7times 20.$

$Rightarrow$ 140 = 140

Hence, these rational numbers are equal.

Illustration: Do $frac{4}{-9};and; frac{-16}{36}$ represent the same rational number?

Solution: To compare the rational numbers for equality we will perform cross multiplication

$frac{4}{-9};and; frac{-16}{36}$

4 x 36 = 144

(-9) x (-16) = 144

These rational numbers are equal.

Illustration: Compare the rational numbers $frac{2}{3};and;frac{5}{8}$

Solution: To compare the rational numbers for equality we will perform cross multiplication

$frac{2}{3};and;frac{5}{8}$

: 2 x 8 = 16 and 3 x 5 = 15

Hence, $frac{2}{3} >;frac{5}{8}$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

Which of the following relation holds for $frac{5}{-11}$ and $frac{-4}{13}$ ?
A. $frac{5}{-11} = frac{-4}{13}$	B. $frac{5}{-11} > frac{-4}{13}$	C. $frac{5}{-11} < frac{-4}{13}$	D. None of these
Right Option : B
View Explanation

Question : 2

Compare $large large frac{7}{5};and;frac{6}{7}$ using cross multiplication method.
A. $large frac{7}{5};<frac{6}{7}$	B. $large frac{7}{5};=;frac{6}{7}$	C. $large frac{7}{5};>;frac{6}{7}$	D. None of these
Right Option : C
View Explanation

Question : 3

Which of the following rational numbers lie between $frac{2}{101}, , and, , frac{3}{71} ?$
A. $frac{150}{7171}$	B. $frac{350}{7171}$	C. $frac{105}{7171}$	D. $frac{450}{7171}$
Right Option : A
View Explanation

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Attention !!!!!

Comparison of Rational Numbers by Cross Multiplication

Comparison of Rational Numbers by Cross Multiplication

Comparison:

Cross Multiplication:

Comparison of Rational Numbers by Cross Multiplication:

Students / Parents Reviews [10]

Prisha Gupta

Archit Segal

Shreya Shrivastava

Barkha Arora

Hiya Gupta

Ayan Ghosh

Shivam Rana

Manish Kumar

Aman Kumar Shrivastava

Eshan Arora