5/7 = 0.714285714285714285... and 9/11 = 0.818181... ow that there are infinite many irrational numbers between two rational numbers. So the three irrational numbers are: 1) 0.727227222 72222.. 2) 0.73733733373333... 3) 0.74744744474444...
5/7 = 0.714285714285714285… and 9/11 = 0.818181…
ow that there are infinite many irrational numbers between two rational numbers. So the three irrational numbers are:
1) 0.727227222 72222..
2) 0.73733733373333…
3) 0.74744744474444…
=> First of al, we observe that 3.765 lies between 3 and 4. Divide this portion into 10 equal parts. => In the next step, we locate 3.765 between 3.7 and 3.8. => To get a more accurate visualisation of representation, we divide this portion of number line into 10 equal parts and use a magniRead more
=> First of al, we observe that 3.765 lies between 3 and 4. Divide this portion into 10 equal parts.
=> In the next step, we locate 3.765 between 3.7 and 3.8.
=> To get a more accurate visualisation of representation, we divide this portion of number line into 10 equal parts and use a magnifying glass to visualize that 3.765 lies between 3.76 and 3.77.
=> Now to visualise 3.765 still more accurately, we divide the portion between 3.76 and 3.77 into 10 equal parts and locate 3.765.
Find three different irrational numbers between the rational numbers 5/7 and 9/11.
5/7 = 0.714285714285714285... and 9/11 = 0.818181... ow that there are infinite many irrational numbers between two rational numbers. So the three irrational numbers are: 1) 0.727227222 72222.. 2) 0.73733733373333... 3) 0.74744744474444...
5/7 = 0.714285714285714285… and 9/11 = 0.818181…
See lessow that there are infinite many irrational numbers between two rational numbers. So the three irrational numbers are:
1) 0.727227222 72222..
2) 0.73733733373333…
3) 0.74744744474444…
Classify the following numbers as rational or irrational:√23
√23, Irrational Number See this for better understanding of the above question👇
√23, Irrational Number
See this for better understanding of the above question👇
See lessVisualise 3.765 on the number line, using successive magnification.
=> First of al, we observe that 3.765 lies between 3 and 4. Divide this portion into 10 equal parts. => In the next step, we locate 3.765 between 3.7 and 3.8. => To get a more accurate visualisation of representation, we divide this portion of number line into 10 equal parts and use a magniRead more
=> First of al, we observe that 3.765 lies between 3 and 4. Divide this portion into 10 equal parts.
See less=> In the next step, we locate 3.765 between 3.7 and 3.8.
=> To get a more accurate visualisation of representation, we divide this portion of number line into 10 equal parts and use a magnifying glass to visualize that 3.765 lies between 3.76 and 3.77.
=> Now to visualise 3.765 still more accurately, we divide the portion between 3.76 and 3.77 into 10 equal parts and locate 3.765.