What is the current estimate of the worldwide human population at this moment?

18 ANSWERS

1. 
   

   6.6 B

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2. 
   

   650 bill

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3. 
   

   Over 6.8 BILLION!

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4. 
   

   The world's population is 6.705 billions at June 18, 2008.
   
   The Chinese population is 1.2 billions to 1.3 billions. It is about 20% of the world's total.
   
   So 6 to 6.5 billions will be the estimate world's population.

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5. 
   

   http://en.wikipedia.org/wiki/World_popul...

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6. 
   

   World 6,706,162,454

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7. 
   

   6.5 billion    ....   definitely.
   
   the US has about 300 million

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8. 
   

   6,706,164,775
   
   Hope this helped.

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9. 
   

   It's 6,706,289,358, check out the http://www.census.gov/main/www/popclock....

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10. 
    

    6,706,163,147

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11. 
    

    Take a look at
    
    http://www.census.gov/main/www/popclock....

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12. 
    

    above 6 billion

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13. 
    

    Current World and US Populations
    
    U.S. 304,447,798
    
    World 6,706,168,634
    
    04:51 GMT (EST+5) Jun 27, 2008

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14. 
    

    6.5 Billion

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15. 
    

    http://www.ibiblio.org/lunarbin/worldpop

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16. 
    

    600 billion

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17. 
    

    About 6 billion!

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18. 
    

    If M is a PL-manifold, then the problem of finding the compatible smooth structures on M depends on knowledge of the groups Γk = Θk. More precisely, the obstructions to the existence of any smooth structure lie in the groups Hk+1(M, Γk) for various values of k, while if such a smooth structure exists then all such smooth structures can be classified using the groups Hk(M, Γk). In particular the groups Γk vanish if k<7, so all PL manifolds of dimension at most 7 have a smooth structure, which is essentially unique if the manifold has dimension at most 6.
    
    The following finite abelian groups are essentially the same:
    
    The group Θn of h-cobordism classes of oriented homotopy n-spheres.
    
    The group of h-cobordism classes of oriented n-spheres.
    
    The group Γn of twisted oriented n spheres.
    
    The homotopy group πn(PL/DIFF)
    
    If n≠3, the homotopy πn(TOP/DIFF) (if n=3 this group has order 2; see Kirby-Siebenmann invariant).
    
    The group of smooth structures of an oriented PL n-sphere.
    
    If n≠4, the group of smooth structures of an oriented topological n-sphere.

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