Question

Question:

10 Rational No between 3 and 5

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Answer 1

Answer:

see the attachment

Step-by-step explanation:

if we are give find 10 numbers then multiply by 1 number forward to it of many

Answer 2

Given to find the 10 Rational numbers between 3 and 5

SOLUTION:-

There exists Infinity rational numbers between two rational numbers .For finding the rational numbers between two rational numbers Lets see the process

Since 3 and 5 are rational numbers beacuse denominator is 1 i.e 3/1 and 5/1

If you we can sèe only one rational number that is 4 But we need 10 Rational numbers So, multiply and divide with any number Since the value doesn't change

So, multiply with numerator and denominator with 10

$3 = \dfrac{3 \times 10}{10}$

$3 = \dfrac{30}{10}$

$5 = \dfrac{5 \times 10}{10}$

$5 = \dfrac{50}{10}$

So, between 3 and 5 that means 30/10 and 50/ 10 there exists

$\dfrac{31}{10} , \dfrac{32}{10} , \dfrac{33}{10} , \dfrac{34}{10} , \dfrac{35}{10} , \dfrac{35}{10} , \dfrac{36}{10} , \dfrac{37}{10} , \dfrac{38}{10} , \dfrac{39}{10} , \dfrac{40}{10} , \dfrac{41}{10}, \dfrac{42}{10} , \dfrac{43}{10} , \dfrac{44}{10} , \dfrac{45}{10} , \dfrac{46}{10} , \dfrac{47}{10}, \dfrac{48}{10} ,\dfrac{49}{10}$

Required 10 Rational numbers are :-

$\dfrac{31}{10} , \dfrac{32}{10} , \dfrac{33}{10} , \dfrac{34}{10} , \dfrac{35}{10} , \dfrac{35}{10} , \dfrac{36}{10} , \dfrac{37}{10} , \dfrac{38}{10} , \dfrac{39}{10}$

Note :-

As your wish you can multiply and divide with any number Since if we do like this we can seè Infinity rational numbers