irrational number between √2and √3
Answers
Answer:
Step-by-step explanation:
For rational number:
√2= 1.414 (up to 3 places after decimal place)
√3= 1.732 ( “ “ “ “ )
So, there may be so many rational numbers we can get . Consider for first place of decimal place and if we place the numbers in the number line we see 1.5 is one rational number [3/2] lies in between 1.4 and 1.7. As,
√2<1.5<√3
For irrational number.
We know , both √2 & √3 are irrational number.
So √2+√3 ¡s also irrational. Therefore(√2+√3)/2 is also irrational number. As ,
√2<(√2+√3)/2 <√3, (√2+√3)/2 is one irrational number between √2 &√3.
Answer:
Hello Dear!!!
Here's your answer....
The value of √2 is 1.414.....
The value of √3 is 1.732.....
There are infinite irrational numbers between them...
Some of the irrational numbers are,
1.4353687353............................
1.436283538373.......................
1.65443374374.........................
1.537325383........................
You can write infinite numbers after the point...but they shouldn't repeat.
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Step-by-step explanation: