Question

find the irrational number between 1/7 and 2/7 it is given that 1/7 0.142857

Answer 1

Given:

1/7 = 0.142857

To Find:

The irrational number between 1/7 and 2/7

Solution:

(1/7) = 0.14285714

(2/7) = = 0.28571428

Irrational number between 1/7 and 2/7 should have a non - terminating and non repeating expansion like 0.1501500150001500001.... and 0.160160016000....

The irrational number between 1/7 and 2/7 is 0.150150015000150000....

Answer 2

Answer:

Concept:

Irrational numbers (from the in- prefix reduced to ir- (negative prefix, privative) + rational) are all non-rational real numbers in mathematics. Irrational numbers, on the other hand, cannot be stated as the ratio of the two integers. When the length ratio of two line segments is an irrational number, the line segments are said to be incommensurable, which means they have no "measure" in common, that is, no length ("the measure"), no matter how brief, that could be used to express the lengths of both of the given segments as integer multiples of itself.

Given:

Find the irrational number between 1/7 and 2/7 it is given that 1/7 0.142857

Find:

irrational numbers between 1/7 and 2/7

Answer:

by dividing $1/7$

we get

     $= 0.142857...$

$1/7=0.14285714$

$2/7=2*1/7$

     $=0.285714285714...$

$2/7=0.28571428$

We look for non-terminating and non-repeating numbers to find an irrational number between $1/7$ and $2/7$

There are so many possibilities.

Two of them could be classified as $0.150150015000$$....$  

$0.220220022000$$...$

Rational numbers are those that can be stated as a ratio (for example, P/Q and Q0), but irrational numbers cannot be expressed as a fraction. Both numbers, however, are real and can be expressed on a number line.

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