Targil 6. This targil is inspired by SEEMOUS 2010. 1. a.* Question
... Every matrix A can be written as A = MV + MU + W, for any huge positive number M. But if M is sufficiently huge, W/M is very close to a specific diagonal matrix with positive numbers at the ends (8 in both corners and 18 elsewhere) hence it will have square root by problem 2. It remains to prove th ...
... Every matrix A can be written as A = MV + MU + W, for any huge positive number M. But if M is sufficiently huge, W/M is very close to a specific diagonal matrix with positive numbers at the ends (8 in both corners and 18 elsewhere) hence it will have square root by problem 2. It remains to prove th ...
Advanced Precalculus Notes 8.3 The Complex Plane: De
... Advanced Precalculus Notes 8.3 The Complex Plane: De Moivre’s Theorem Absolute value of a number: distance from zero (origin) Complex number: z = a + bi Conjugate: z = a - bi Magnitude or modulus: ...
... Advanced Precalculus Notes 8.3 The Complex Plane: De Moivre’s Theorem Absolute value of a number: distance from zero (origin) Complex number: z = a + bi Conjugate: z = a - bi Magnitude or modulus: ...
Solutions to RMO-2014 problems
... squares, with one number in each square, such that the product of the numbers in each 2×2 sub-grids AM RG, GRN D, M BHR and RHCN is divisible by 16? Solution: NO! If the product in each 2 × 2 sub-square is divisible by 16, then the product of all the numbers is divisible by 16 × 16 × 16 × 16 = 216 . ...
... squares, with one number in each square, such that the product of the numbers in each 2×2 sub-grids AM RG, GRN D, M BHR and RHCN is divisible by 16? Solution: NO! If the product in each 2 × 2 sub-square is divisible by 16, then the product of all the numbers is divisible by 16 × 16 × 16 × 16 = 216 . ...
