the King’s Factor Year 12 questions 2
... 1. For each of the following statements either prove that it is true or give a counter-example to show that it is false: (a) The product of any two even numbers is a multiple of 4. (b) The product of any two even numbers is a multiple of 8. (c) The product of any two odd numbers is a multiple of 3. ...
... 1. For each of the following statements either prove that it is true or give a counter-example to show that it is false: (a) The product of any two even numbers is a multiple of 4. (b) The product of any two even numbers is a multiple of 8. (c) The product of any two odd numbers is a multiple of 3. ...
Problems
... Answer the following 3 questions, and show your detailed solution in the space provided after each question. Write down the question number in each paper. Each question is worth 20 points. 1. Let a, b and c be real numbers such that a bc b ca c ab 501 . If M is the maximum value of a b ...
... Answer the following 3 questions, and show your detailed solution in the space provided after each question. Write down the question number in each paper. Each question is worth 20 points. 1. Let a, b and c be real numbers such that a bc b ca c ab 501 . If M is the maximum value of a b ...
Babylonian Mathematics: Classroom Activities 1
... Difference of two numbers, (a - b) and their Product ab Sum of two numbers, (a + b) and the sum of their Squares (a2 + b2) Difference of two numbers, (a - b) and the sum of their Squares (a2 + b2) In each case, what would be the procedures for finding solutions? ...
... Difference of two numbers, (a - b) and their Product ab Sum of two numbers, (a + b) and the sum of their Squares (a2 + b2) Difference of two numbers, (a - b) and the sum of their Squares (a2 + b2) In each case, what would be the procedures for finding solutions? ...
Linn.pdf
... distinct binomials such as (x + a)(x + b) show up in assorted problems. And possibly will think of the distributive property when (x + a)(x + a) shows up as well. But when (x + a)2 happens to appear in a problem, there remains a tendency is to square the binomial as if it were the sum of the squares ...
... distinct binomials such as (x + a)(x + b) show up in assorted problems. And possibly will think of the distributive property when (x + a)(x + a) shows up as well. But when (x + a)2 happens to appear in a problem, there remains a tendency is to square the binomial as if it were the sum of the squares ...