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- arithmetic - Factorial, but with addition - Mathematics Stack Exchange
Is there a notation for addition form of factorial? $$5! = 5\times4\times3\times2\times1$$ That's pretty obvious
- Real life example to explain the Difference between Algebra and Arithmetic
So a little arithmetic will suffice to solve this simple problem: We begin with the husband, who gets 25% The son gets two shares and three daughters each get one share of the remaining 75% The son gets two shares and three daughters each get one share of the remaining 75%
- Arithmetic mean vs Harmonic mean - Mathematics Stack Exchange
The same principle applies to more than two segments: given a series of sub-trips at different speeds, if each sub-trip covers the same distance, then the average speed is the harmonic mean of all the sub-trip speeds; and if each sub-trip takes the same amount of time, then the average speed is the arithmetic mean of all the sub-trip speeds
- arithmetic - What are the formal names of operands and results for . . .
I'm trying to mentally summarize the names of the operands for basic operations I've got this so far: Addition: Augend + Addend = Sum Subtraction: Minuend - Subtrahend = Difference Multiplicati
- arithmetic - Rules for rounding (positive and negative numbers . . .
Of these, I'm personally rather fond of "round $\frac 1 2$ to nearest even number", also known as "bankers' rounding" It's also the default rounding rule for IEEE 754 floating-point arithmetic as used by most modern computers According to that rule,
- numerical methods - How do you mathematically round a number . . .
How does someone mathematically round a number to its nearest integer? For example 1 2 would round down to 1 and 1 7 would round up to 2
- Arithmetic Overflow and Underflowing - Mathematics Stack Exchange
The term arithmetic underflow (or "floating point underflow", or just "underflow") is a condition in a computer program where the result of a calculation is a number of smaller absolute value than the computer can actually store in memory
- What is Arithmetic Continuum - Mathematics Stack Exchange
while the Cantor-Dedekind theory succeeds in bridging the gap between the domains of arithmetic and of standard Euclidean geometry, it only reveals a glimpse of a far richer theory of continua I believed the term "arithmetic continuum" refers to, specifically, a bridge between arithmetic and Euclidean Geometry, and this made sense for me
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