1ftx12ft=12 feet
There are 128 possible notes on a MIDI device, numbered 0 to 127 (where Middle C is note number 60).
No, not all. All numbers are Real Numbers. * * * * * All numbers are not real numbers: there are complex numbers and others. Also, all real number are not whole numbers. sqrt(2) or pi, for example are real numbers but not whole numbers.
numbers why numbers it is letters {CDEFGABC
It's possible that pianos of the era didn't have serial numbers.
The link below goes to a list of Leblanc clarinet serial numbers. If I understand this chart, it was probably made in 1998, but since they restarted the numbers in 1984-85, it might have been made in 1983 during the earlier run of numbers. Since 1983 began with D25636 and ended with E13604, if the D-numbers ran all the way up to D35614 before they went to E-numbers, that would have been a run of 23,582 Vito instruments made that year. In 1982 they made 24,056 Vitos, so that's possible. What I don't know is when the V40 model came out. Somebody else?
The length is 10 meters and the width is 5 meters
If the dimensions are restricted to whole numbers, then the only possibilities are 1 x 4 and 2 x 3.
There are, of course, infinitely many solutions here. Choose any two positive numbers for the first two dimensions. Then divide 336 by the product of the two numbers, to get the third dimension.
me
6 in by 8 in by 10 in.
6*7
to get the perimeter you take 12 x 2 and 22 x 2 get those numbers then add them and you have your perimeter
In whole numbers of feet 3000 long by 1 wide. I suspect that more accurate wording might help answerers.
No, they are the only numbers that are NOT rectangular in shape. (I think you knew this and screwed up your question.) That is, all non-primes can be arranged into the form of a rectangle - e.g. 21 can be organized as a rectangle with dimensions of 3 x 7. But prime numbers cannot be organized as rectangles.
Rectangular numbers are a subset of composite numbers. The squares of prime numbers will be composite but not rectangular.
A rectangular number sequence is the sequence of numbers of counters needed to construct a sequence of rectangles, where the dimensions of the sides of the rectangles are whole numbers and change in a regular way. The individual sequences representing the sides are usually arithmetic progressions, but could in principle be given by difference equations, geometric progressions, or functions of the dimensions of the sides of previous rectangles in the sequence.
Grams are a measure of mass, with dimensions [M]. A number has no dimensions and it is not possible to convert from one to the other in any meaningful way.