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... 3. A positive integer is written on each face of a cube. To each vertex, we assign the product of the numbers written on the three faces meeting at that vertex. The sum of the numbers assigned to the vertices is 1001. What is the sum of the numbers written on the faces ? ...
                        	... 3. A positive integer is written on each face of a cube. To each vertex, we assign the product of the numbers written on the three faces meeting at that vertex. The sum of the numbers assigned to the vertices is 1001. What is the sum of the numbers written on the faces ? ...
									Section 7.7
									
... Thus far we have mainly dealt with the real number system which excludes some roots of negative numbers (square root of -4 or -9, for example, do not exist in the real number system) This section covers a number system that contains these roots (in addition to the subset of real numbers) and allows ...
                        	... Thus far we have mainly dealt with the real number system which excludes some roots of negative numbers (square root of -4 or -9, for example, do not exist in the real number system) This section covers a number system that contains these roots (in addition to the subset of real numbers) and allows ...
									for_bacchus_only
									
... The maximum no. of elements in a function is the cardinality of A. So, if the function has to be onto, then A should have atleast as many elements as B. 5) The blue box at the top of page 262 gives a formula for the number of onto functions from domain A onto range B. With |A| = m and |B| = n, what ...
                        	... The maximum no. of elements in a function is the cardinality of A. So, if the function has to be onto, then A should have atleast as many elements as B. 5) The blue box at the top of page 262 gives a formula for the number of onto functions from domain A onto range B. With |A| = m and |B| = n, what ...
									A question on linear independence of square roots Martin Klazar1
									
... linearly independent over the rationals? That is, we want to prove that if the k integers 0 < n1 < n2 < · · · < nk are squarefree (a number is called squarefree if it is a products of mutually distinct prime numbers) and ...
                        	... linearly independent over the rationals? That is, we want to prove that if the k integers 0 < n1 < n2 < · · · < nk are squarefree (a number is called squarefree if it is a products of mutually distinct prime numbers) and ...
									Scientific Notation Notes
									
... NOTES FOR SCIENTIFIC NOTATION In Science, numbers can range from very large to very small. IE. Avogadro’s number is 602 213 674 000 000 000 000 000 IE. Mass of electron is 0.000 000 000 000 000 000 000 000 000 000 9109 kg Because it’s hard to write and read such large or small numbers, scientists us ...
                        	... NOTES FOR SCIENTIFIC NOTATION In Science, numbers can range from very large to very small. IE. Avogadro’s number is 602 213 674 000 000 000 000 000 IE. Mass of electron is 0.000 000 000 000 000 000 000 000 000 000 9109 kg Because it’s hard to write and read such large or small numbers, scientists us ...
									Determining Maximum and Minimum Values of a Quadratic Function
									
... Simplify – your final expression should be in vertex form. ...
                        	... Simplify – your final expression should be in vertex form. ...
 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									 
									