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===Multiplication=== [[File:Multiplication of Positive and Negative Numbers.svg|thumb|A multiplication by a negative number can be seen as a change of direction of the [[Vector (mathematics and physics)|vector]] of [[Magnitude (mathematics)|magnitude]] equal to the [[absolute value]] of the product of the factors.]] When multiplying numbers, the magnitude of the product is always just the product of the two magnitudes. The [[sign (mathematics)|sign]] of the product is determined by the following rules: * The product of one positive number and one negative number is negative. * The product of two negative numbers is positive. Thus {{block indent | em = 1.5 | text = {{math|1= (β2) Γ 3 β=β β6}} }} and {{block indent | em = 1.5 | text = {{math|1= (β2) Γ (β3) β=β 6}}. }} The reason behind the first example is simple: adding three {{math|β2}}'s together yields {{math|β6}}: {{block indent | em = 1.5 | text = {{math|1= (β2) Γ 3 β=β (β2) + (β2) + (β2) β=β β6}}. }} The reasoning behind the second example is more complicated. The idea again is that losing a debt is the same thing as gaining a credit. In this case, losing two debts of three each is the same as gaining a credit of six: {{block indent | em = 1.5 | text = {{math| (β2}} debts {{math|) Γ (β3}} each{{math|1=) β=β +6}} credit. }} The convention that a product of two negative numbers is positive is also necessary for multiplication to follow the [[distributive law]]. In this case, we know that {{block indent | em = 1.5 | text = {{math|1= (β2) Γ (β3) β+β 2 Γ (β3) β=β (β2 + 2) Γ (β3) β=β 0 Γ (β3) β=β 0}}. }} Since {{math|1=2 Γ (β3) = β6}}, the product {{math|(β2) Γ (β3)}} must equal {{math|6}}. These rules lead to another (equivalent) ruleβthe sign of any product ''a'' Γ ''b'' depends on the sign of ''a'' as follows: * if ''a'' is positive, then the sign of ''a'' Γ ''b'' is the same as the sign of ''b'', and * if ''a'' is negative, then the sign of ''a'' Γ ''b'' is the opposite of the sign of ''b''. The justification for why the product of two negative numbers is a positive number can be observed in the analysis of [[complex numbers]].
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