Question

Write down 5 irritional no in radical form which are lying between 4and5

Answer 1

First we note that 4^{2} = 16 and 5^{2} = 25.

So, a possible list of 5 irrational numbers between 4 and 5 is:

$\underline{\underline{\sqrt{17}, \sqrt{18}, \sqrt{19}, \sqrt{20}, \sqrt{21}}}$.

Answer 2

Answer:

$\text{5 irrational numbers which lies between 4 and 5 are }\sqrt{17}, \sqrt{18}, \sqrt{19}, \sqrt{20}, \sqrt{21}$

Step-by-step explanation:

we have to find the 5 irrational number which are lying between 4 and 5 in radical form

Irrational numbers are those real numbers that cannot be written as a simple fraction. These are non-terminating and non-repeating.

$\sqrt{17}=4.121...$

$\sqrt{18}=4.2426....$

$\sqrt{19}=4.358....$

$\sqrt{20}=4.4721....$

$\sqrt{21}=4.528....$

All the above five numbers are non-terminating and non-repeating.

$\text{5 irrational numbers which lies between 4 and 5 are }\sqrt{17}, \sqrt{18}, \sqrt{19}, \sqrt{20}, \sqrt{21}$