Question

EVALUATE (999) 1/3 UPTO 4 PLACES OF DECIMAL

Answer 1

here's the answer I hope I helped u . you have to use binomial theorem here which States that (1+x)^n=1+nx

Answer 2

Answer:

The value of 999 1/3 up to four places of decimal is 999.3333

Solution:

999 1/3=2998/3

Dividing, we get,  

∴ Quotient = 999.33333…..  = 999.3333 (rounded up to 4 decimal place)    

The resultant answer while we divide 2998/3 results in the formation of a recurring decimal. The decimal which is repeating its value again and again is known as a recurring decimal. Following are the examples of the recurring decimal.

1. 54.676767...

2. 96.232323...

3. 25.333333...