Answer:
The sum is 1575.
Step-by-step explanation:
Consider the provided information.
It is given that positive integers smaller than 1000 and that can be written in the form [tex]100\cdot 2^n[/tex]
Where n is integer that means the value of n can be a positive number or a negative number.
For n = 0
[tex]100\cdot 2^{0}=100[/tex]
For n=-1
[tex]100\cdot 2^{-1}=50[/tex]
For n=-2
[tex]100\cdot 2^{-2}=25[/tex]
For n = -3 the obtained number is not an integer.
Now consider the positive value of n.
For n=1
[tex]100\cdot2^1 = 200[/tex]
For n=2
[tex]100\cdot2^2 = 400[/tex]
For n=3
[tex]100\cdot2^3 = 800[/tex]
For n=4 the obtained number is greater than 1000.
Now add all the numbers.
[tex]100+50+25+200+400+800=1575[/tex]
Hence, the sum is 1575.
