The greatest integer function, [x], rounds down to the lower integer or "floor." There is no formal name for the round up function other than round up or "ceiling." There is no formal name for the rounds to the nearest integer or multiple. ...
Greatest Common Divisor: The Greatest Common Divisor or GCD is the highest integer number that could be used to divide the bunch of numbers in question and give and an integer value. Should you need to find the lowest common denominator of a bunch of numbers in Excel, place those numbers s...
How do I represent owing $50 as an integer? With the fractional addition problem, 84/90 + 32/29, this problem can be roughly estimated into whole numbers, but how do you know when a fraction is close to the whole number of 1?
free help solving algebra with integer or a decimal find answers to math problems (fractions from least to greatest) factorization calculator solve math problems using tables and graphs online for free solving simultaneous equations on excel lesson plan +physics+grade 11 pre-algebra combine ...
He may have been first to note that the square root of any integer, if not itself an integer, must be irrational. (The case √2 is attributed to a student of Pythagoras.) TopPlato of Athens (428-347 BC) Greece -- [ #151 (tied) ]...
He may have been first to note that the square root of any integer, if not itself an integer, must be irrational. (The case √2 is attributed to a student of Pythagoras.) TopPlato of Athens (428-347 BC) Greece -- [ #151 (tied) ]...
that generates 40 consecutive primes for consecutiven:n2+ n + 41. Now consider Martin Gardner's famous "April Fool's integer":e√163 π= 6403203+ 744. (In this "equality" the left-side is actually smaller than the right-side integer, but by less than a trillionth of a unit. Too ...
He may have been first to note that the square root of any integer, if not itself an integer, must be irrational. (The case √2 is attributed to a student of Pythagoras.) TopPlato of Athens (428-347 BC) Greece -- [ #151 (tied) ]...
He may have been first to note that the square root of any integer, if not itself an integer, must be irrational. (The case √2 is attributed to a student of Pythagoras.) TopPlato of Athens (428-347 BC) Greece -- [ #151 (tied) ]...