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- What does it mean when something says (in thousands)
I'm doing a research report, and I need to determine a companies assets So I found their annual report online, and for the assets, it says (in thousands) One of the rows is: Net sales $ 26,234
- How much zeros has the number $1000!$ at the end?
yes it depends on $2$ and $5$ Note that there are plenty of even numbers Also note that $25\times 4 = 100$ which gives two zeros Also note that there $125\times 8 = 1000$ gives three zeroes and $5^4 \times 2^4 = 10^4$ Each power of $5$ add one extra zero So, count the multiple of $5$ and it's power less than $1000$
- How to calculate a Modulo? - Mathematics Stack Exchange
I really can't get my head around this "modulo" thing Can someone show me a general step-by-step procedure on how I would be able to find out the 5 modulo 10, or 10 modulo 5
- Numbers in a list which are perfect squares and perfect cubes of . . .
Cubes: 1, 8, 27, 64, 125, 216, 343, 512, 729, 1000, 1331, and 1728 44 squares and 12 cubes Numbers with both perfect squares and cubes in common : 1, (1^2 and 1^3) 64, (8^2 and 4^3) and 729 (27^2 and 9^3)
- Solution Verification: How many positive integers less than $1000$ have . . .
A positive integer less than $1000$ has a unique representation as a $3$-digit number padded with leading zeros, if needed To avoid a digit of $9$, you have $9$ choices for each of the $3$ digits, but you don't want all zeros, so the excluded set has count $9^3 - 1 = 728$ Hence the count you want is $999 - 728 = 271$
- probability - 1 1000 chance of a reaction. If you do the action 1000 . . .
So for your example, it would be 1-((1–1 1000)^1000) which equals 1-(0 999^1000), which turns out to be about 0 63230457, or 63 230457% There is a lot of confusion about this topic, as intuitively, you would think that if the odds are 1 1000 playing 1000 times would guarantee a win
- How many bits needed to store a number
How many bits are needed to represent the integers 3^1000 and 2^1000? 0
- functions - Difference between multiplying and dividing numbers by . . .
Basically, what is the difference between $1000\times1 03$ and $1000 97$? For some reason I feel like both should result in the same number I only ask because I'm working a problem with a percentage of waste added in For $3\%$ waste, I would think that you could multiply the amount by $1 03$ to add $3\%$ However, my professor divided by $ 97$
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