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... sequence g(n), which may be converted into a binary sequence b(n) by mapping each even number to 0 and each odd number to 1. The resulting binary sequences may be used as pseudorandom sequences in communications and computing and also in cryptography to generate random keys. ...
... sequence g(n), which may be converted into a binary sequence b(n) by mapping each even number to 0 and each odd number to 1. The resulting binary sequences may be used as pseudorandom sequences in communications and computing and also in cryptography to generate random keys. ...
Number Theory
... 10, but not by 60. Since 60 is equal to 3 4 5 and 3, 4, and 5 are relatively prime, any number divisible by 60 must be divisible by 3, 4, and 5. Therefore X, Y, and Z are equal to 3, 4, and 5 in some order. Checking the three possible combinations we can find that the minimum value of Y·(X+Z) is the ...
... 10, but not by 60. Since 60 is equal to 3 4 5 and 3, 4, and 5 are relatively prime, any number divisible by 60 must be divisible by 3, 4, and 5. Therefore X, Y, and Z are equal to 3, 4, and 5 in some order. Checking the three possible combinations we can find that the minimum value of Y·(X+Z) is the ...
Chapter 5 Review - Westerville City Schools
... homes every month. Write a sequence for the number of houses built, then write an equation for the sequence. Fully describe a graph of this sequence. The sequence is 21, 27, 33, 39, …. Note that sequences usually begin with the first term, where the number of months n = 1. The common difference is m ...
... homes every month. Write a sequence for the number of houses built, then write an equation for the sequence. Fully describe a graph of this sequence. The sequence is 21, 27, 33, 39, …. Note that sequences usually begin with the first term, where the number of months n = 1. The common difference is m ...
Infinite Sets and Infinite Sizes
... into the issue of infinity, and in the process invented both set theory and the theory of infinite numbers. We have already discussed the basic insight – that two sets are equally large precisely when one can set up a one-to-one correspondence between them. What we haven’t discussed, however, is how ...
... into the issue of infinity, and in the process invented both set theory and the theory of infinite numbers. We have already discussed the basic insight – that two sets are equally large precisely when one can set up a one-to-one correspondence between them. What we haven’t discussed, however, is how ...
Holt McDougal Algebra 2 - Effingham County Schools
... Example 5: Iteration of Fractals Find the number of triangles in the 7th and 8th iterations of the Sierpinski triangle. By removing the center of each triangle, each iteration turns every triangle into 3 smaller triangles. So the number of triangles triples with each iteration. The number of triangl ...
... Example 5: Iteration of Fractals Find the number of triangles in the 7th and 8th iterations of the Sierpinski triangle. By removing the center of each triangle, each iteration turns every triangle into 3 smaller triangles. So the number of triangles triples with each iteration. The number of triangl ...
day 39 intro to sequences lesson (1)
... Example 5: Iteration of Fractals Find the number of triangles in the 7th and 8th iterations of the Sierpinski triangle. By removing the center of each triangle, each iteration turns every triangle into 3 smaller triangles. So the number of triangles triples with each iteration. The number of triangl ...
... Example 5: Iteration of Fractals Find the number of triangles in the 7th and 8th iterations of the Sierpinski triangle. By removing the center of each triangle, each iteration turns every triangle into 3 smaller triangles. So the number of triangles triples with each iteration. The number of triangl ...
Adding Integers 1.2
... protons and negatively charged electrons. The sum of the charges represents the charge of the lithium atom. Find the charge of the atom. 41. OPEN-ENDED Write two integers with different signs that have a sum of −25. Write two integers with the same sign that have a sum of −25. ALGEBRA Evaluate the e ...
... protons and negatively charged electrons. The sum of the charges represents the charge of the lithium atom. Find the charge of the atom. 41. OPEN-ENDED Write two integers with different signs that have a sum of −25. Write two integers with the same sign that have a sum of −25. ALGEBRA Evaluate the e ...
C. CONTINUITY AND DISCONTINUITY
... the difference between the right- and left-hand limits (it is 2 in Example 2, for instance). Though jump discontinuities are not common in functions given by simple formulas, they occur frequently in engineering — for example, the square waves in electrical engineering, or the sudden discharge of a ...
... the difference between the right- and left-hand limits (it is 2 in Example 2, for instance). Though jump discontinuities are not common in functions given by simple formulas, they occur frequently in engineering — for example, the square waves in electrical engineering, or the sudden discharge of a ...
