3 - NEHSMath
... Rules for Multiplying derived from the Properties Numbers with the same sign The product of 2 positive numbers or 2 negative numbers is positive. Example 2 ∙ 5 = 10 and (-2)(-5) = 10 ...
... Rules for Multiplying derived from the Properties Numbers with the same sign The product of 2 positive numbers or 2 negative numbers is positive. Example 2 ∙ 5 = 10 and (-2)(-5) = 10 ...
1.3 - Exploring Real Numbers
... Any number that cannot be written as a fraction Non-terminating, non-repeating wacky decimals Examples? If a number is irrational, it cannot belong to any other set ...
... Any number that cannot be written as a fraction Non-terminating, non-repeating wacky decimals Examples? If a number is irrational, it cannot belong to any other set ...
ARITHMETIC SERIES
... let t1 be 1 since the first term is 1. let n be 100 since there are 100 terms. let tn be 100 since the nth term is 100. ...
... let t1 be 1 since the first term is 1. let n be 100 since there are 100 terms. let tn be 100 since the nth term is 100. ...
Full text
... Let us therefore examine (ii), which is true for m = 2 (even) leading to c2 = 1, cx = 2 from (ii) and (8). Now c2 = 1 = a2 - h2 implies that a2 = 2 (b2 = 1) or a2 - 1 (b2 = 0), i.e., a2 ^ 0, which contradicts cx = 2 = ax -bx since this means that ax - 2 {bx - 0) and, hence, ax = 2 => a2 = 0 by (1). ...
... Let us therefore examine (ii), which is true for m = 2 (even) leading to c2 = 1, cx = 2 from (ii) and (8). Now c2 = 1 = a2 - h2 implies that a2 = 2 (b2 = 1) or a2 - 1 (b2 = 0), i.e., a2 ^ 0, which contradicts cx = 2 = ax -bx since this means that ax - 2 {bx - 0) and, hence, ax = 2 => a2 = 0 by (1). ...
