476748 not ha ha
ALU
6
The arithmetic logic unit or ALU performs arithmetic, logic, and integer operations. ALU was created by mathematician John von Neumann in 1945.
Error message, mainly. The following operations are legal: ptr + integer (pointer) ptr - integer (pointer) ptr - ptr (integer)
An integer (not interger!) sequence is an ordered set of numbers such that each number in the set is an integer, or a whole number.
312 is not a sequence: it is a single 3 digit integer and one number cannot define a sequence.
6(six)
Yes, it is an integer sequence.
The advantages of integer arithmetic over floating point arithmetic is the absence of rounding errors. Rounding errors are an intrinsic aspect of floating point arithmetic, with the result that two or more floating point values cannot be compared for equality or inequality (or with other relational operators), as the exact same original value may be presented slightly differently by two or more floating point variables. Integer arithmetic does not show this symptom, and allows for simple and reliable comparison of numbers. However, the disadvantage of integer arithmetic is the limited value range. While scaled arithmetic (also known as fixed point arithmetic) allows for integer-based computation with a finite number of decimals, the total value range of a floating point variable is much larger. For example, a signed 32-bit integer variable can take values in the range -231..+231-1 (-2147483648..+2147483647), an IEEE 754 single precision floating point variable covers a value range of +/- 3.4028234 * 1038 in the same 32 bits.
given any positive integer n and any integer a , if we divide a by n, we get an integer quotient q and an integer remainder r that obey the following relationship where [x] is the largest integer less than or equal to x
0 and 1 are the Sign Magnitudes0 is used as +ve1 is used as -vee.g if we see+1810 = 100102 but in the arithmetic representation well be 0100102-1810 = 100102 but in the arithmetic representation well be 1100102
P. D. T. A. Elliott has written: 'Arithmetic functions and integer products' -- subject(s): Arithmetic functions, Natural Numbers, Numbers, Natural