Hello, Can someone please help me proof the following theorem from number theory? thank you! please be legible. 1 11.3.2 LAW OF QUADRATIC RECIPROCITY Restatement) Let p and q be odd primes with p...
Hello, Can someone please show me two examples on how this proposition is being used? Please be legible. Thank you. 11.3.2 LAW OF QUADRATIC RECIPROCITY (Restatement) Let p and q be odd primes with p q. Then 1 q-1 = (-1) Not surnrisingly it has turned out that Phil 's ansuwer from the berin 11.3.2 LAW OF QUADRATIC RECIPROCITY (Restatement) Let p and q be odd primes with p q. Then 1 q-1 = (-1) Not surnrisingly it has turned...
please do 7.19 7.20 and 7.21 7.19 Theorem (Quadratic Reciprocity Theorem and q be odd primes, then Reciprocity Part). Let p (e)99 (mod 4) if p (mod 4) or q1 i p 3 (mod 4). (i)) (llint: Iry to use the techniquets used in the case of Putting together all our insights, the Law of Quadratic Reciprocity. we can write one theorem that we call Theorem (Iaw of Quadratic Reciprocity). Let p and q be odd primes, then if p...
Hello, can someone show me the correct steps in solving this number theory practice question? (Please be legible). Thank you. 21. . Let a and n be natural numbers such that n 1 and a" - 1 is prime a. Prove that a-2. b. Prove that n must be prime. [Hint: Use your result from part a.]
7.23 Theorem. Let p be a prime congruent to 3 modulo 4. Let a be a natural number with 1 a< p-1. Then a is a quadrutic residue modulo pif and only ifp-a is a quadratic non-residue modulo p. 7.24 Theorem. Let p be a prime of the form p odd prime. Then p 3 (mod 4). 241 where q is an The next theorem describes the symmetry between primitive roots and quadratic residues for primes arising from odd Sophie...
Hello, can someone show me the correct steps in solving this number theory practice question? (Please be legible). Thank you. Prove that there are infinitely many composite numbers of the where k e N. 2. a. form 5k +2, Prove that there are infinitely many composite numbers of the form 3k t where ke N b. Let a and b be natural numbers. Prove that there are infinitely many composite numbers of the form ak + b, where ke N....
Hello, Can someone please show me the correct steps in solving this practice problem from Geometry, so that I can learn how to do it? Thank you! Please be legible.
Hello, Can someone please show examples on how this proposition is being used ( please make sure the example include i, ii, iii ? Please be legible. Thank you. COROLLARY 11.2.6 Ltp2 be prime, and let a, b e Z, with a, b + 0. Then: (i) lf-andb are both quadratic residues, then so is ab. ii) If a and b are both quadratic nonresidues, then ab is a quadratic residue. (ii) If one of a and b is a...
Please prove the 3 theorems, thank you! 7.6 Theorem. Let p be a prime. Then half the numbers not congruent to 0 modulo p in any complete nesidue system modulo p are quadratic residuess modulo p and half are quadratic non-residues modulo p. From clementary school days, we have known that the product of a pos- itive number and a positive number is positive, a positive times a negative is negative, and the product of two negative numbers is positive....
Can someone please help me understand the correct steps in solving this Number Theory practice question? Thank you! Prove that the sequence Bn we have... n- j Bn = 1 + rt j-1 we have Bn F+1 for neN.
Hello, Can someone please help me understand the correct steps in solving the following question from Number Theory? Its regarding Modular Arithmetics: The Gregorian Calendar . Please be legible. Thank you! 17. The true length of the solar year (how long it takes Earth to orbit the Sun) is approximately 365.2424 days a. Find the average length of a year in the Gregorian calendar b. The Gregorian calendar was aligned with the solar year in 1582. Use your answer to...