A positive number divided by a negative number is a ___________ number??? (positive or negative)
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AnonymouslyMe
ANSWERS: 9
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postive number
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positive number
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positive number
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positive number example... 5 divided by -1 answer= 5
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NEGATIVE! Look at it like a fraction 20/-5= -4 Positive x Positive = Positive Positive x Negative = Negative Negative x Negative = Positive Inverse holds true for division. Positive / Positive = Positive Positive / Negative = Negative Negative / Negative = Positive
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negative number
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It is a negative number.
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obviously negative..
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( Arithmetic of LB ) --------------------------------------------------------------- * LB = Liuhui and Brahmaguta [ N = Number ] [ Negative number = Negative = (-N) ] = [ Debt = Bill ] [ Positve number = Positive = (+N) = (N) = N ] = [ Credit = Fortune ] [ Natural number = Natural ] --------------------------------------------------------------- The definition of Liuhui and Brahmaguta in arithmetic, Definition is only 5 With (Same Natural), 1. [ (Positive) - (Positive) = ( 0 ) ] * [ (+1) - (+1) = ( 0 ) ] [ (Natural) - (natural) = ( 0 ) ] * [ 1 - 1 = ( 0 ) ] 2. [ (Positive) + (Negative) = ( 0 ) ] * [ (+1) + (-1) = ( 0 ) ] 3. [ (Negative) + (Positive) = ( 0 ) ] * [ (-1) + (+1) = ( 0 ) ] 4. [ (Negative) - (Negative) = ( 0 ) ] * [ (-1) - (-1) = ( 0 ) ] 5. [ ( 0 ) ] = [ We have no (Partial Fortune and Debt). ] = [ Extinguishment of obligation ] [^^^] = [ { (+1) + (-1) } = < ( 0 ) > ] = [ { Living ( 0 ) } = < Dead ( 0 ) > ] [^^^] = [ (-1) ] = [ (+1) + (-2) ] = [ (+1) - (+2) ] <---- [ Living ( 0 ), Hidden ] = [ Living ( 0 ) changes Negative for (Subtraction of Positives). ] [^^^] = [ (-1) X (-1) ] = [ { (+1) - (+2) } X { (+1) - (+2) } ] [^^^] = [ Rebirth of < Dead ( 0 ) > ] = [ In pockets, no (Partial Fortune and Debt), Rebirth of < Dead ( 0 ) >.] = [ If we borrow $1, have money $1 and Debt $1. ] = [ (Fortune, money $1) + (Debt, Bill $1) ] = [ (+1) + (-1) ] = [ Living ( 0 ) ] ---------------------------------------------------------------- [ Law of obligations ] [ Negative number ] = [ Debt ] [ Positive number ] = [ Credit ] [ Zero ( 0 ) ] = [ Extinguishment of obligation ] [ (Negative) - (Negative) ] = [ (Debt) - (Debt) ] = [ Offset ] = [ ( 0 ) ] ----------------------------------------------------------------- The law of Liuhui and Brahmagupta in arithmetic [06]. [ { + (-N) } = { - (+N) } ] * [ { + (-1) } = { - (+1) } ] [07]. [ { + (+N) } = { - (-N) } ] * [ { + (+1) } = { - (-1) } ] [08]. [ N X (+N) ] = [ + ( N X N ) ] * [ (-2) X (+3) ] = [ + { (-2) X 3 } ] [09]. [ N X (-N) ] = [ - ( N X N ) ] * [ (-2) X (-3) ] = [ - { (-2) X 3 } ] [10]. [ N ÷ (+N) ] = [ + ( N ÷ N ) ] * [ (-12) ÷ (+2) ] = [ + { (-12) ÷ 2 } ] [11]. [ N ÷ (-N) ] = [ - ( N ÷ N ) ] * [ (-12) ÷ (-2) ] = [ - { (-12) ÷ 2 } ] [12]. [ - ( 0 ) ] = [ + ( 0 ) ] = [ ( 0 ) ] * [ - ( 1 - 1 ) ] = [ + ( 1 - 1 ) ] [13]. [ + N - N ] = [ + ( N - N ) ] = [ ( N - N ) ] * [ + 1 - 2 ] = [ + ( 1 - 2 ) ] = [ ( 1 - 2 ) ] [14]. [ - N - N ] = [ - ( N + N ) ] * [ - 1 - 2 ] = [ - ( 1 + 2 ) ] [15]. [ - N + N ] = [ - ( N - N ) ] * [ - 1 + 2 ] = [ - ( 1 - 2 ) ] [16]. Commutative law of < - N > and < + N > is natural. ---------------------------------------------------------------------- [ (+N) X (+N) = (+N) ], proof [^^^] = [ (+2) X (+3) ] = [ + { (+2) + (+2) + (+2) } ] = [ + { (+2) X (3) } ] = [ + { (+6) } ] = [ + (+6) ] = [ (+6) ] = [ (6) ] = [ 6 ] [^^^] = [ (+2) X (+3) ] = [ (2) X (3) ] = [ 2 X 3 ] = [ 6 ] = [ (6) ] = [ (+6) ] [ (+2) X (+3) ] = [ The (Increase) of (Fortune) ] = [ Sell 3 goods in $2 for cash $6. ] [^^^] = [ (+2) X (+3) ] = [ (Fortune, prices of goods $2) X (+3) ] = [ (Fortune, prices of goods $2), add to add 3 times. ] = [ (Fortune, prices of goods $2), add to multiply 3 times. ] = [ Sell 3 goods in $2 for cash $6. ] ------------------------------- [ (-N) X (+N) = (-N) ], proof [^^^] = [ (-2) X (+3) ] = [ + { (-2) + (-2) + (-2) } ] = [ + { (-2) X (3) } ] = [ + { (-6) } ] = [ + (-6) ] = [ (-6) ] [^^^] = [ (-2) X (+3) ] = [ { (-2) } X (+3) ] = [ { (+1) + (-3) } X (+3) ] = [ { (+1) - (+3) } X (+3) ] = [ { (+1) X (+3) } - { (+3) X (+3) } ] = [ { (+3) } - { (+9) } ] = [ (+3) - (+9) ] = [ (+3) + (-9) ] = [ (-9) + (+3) ] = [ (-9) - (-3) ] = [ (-6) ] [ (-2) X (+3) ] = [ The (Increase) of (Debt) ] = [ Buy 3 goods in $2 on credit $6. ] [^^^] = [ (-2) X (+3) ] = [ (Debt, Bill $2) X (+3) ] = [ (Debt, Bill $2), add to add 3 times. ] = [ (Debt, Bill $2), add to multiply 3 times. ] = [ 3 goods in (prices of goods $2), buy on credit $6. ] --------------------------- [ (+N) X (-N) = (-N) ], proof [^^^] = [ (+2) X (-3) ] = [ - { (+2) + (+2) + (+2) } ] = [ - { (+2) X (3) } ] = [ - { (+6) } ] = [ - (+6) ] = [ + (-6) ] = [ (-6) ] [^^^] = [ (+2) X (-3) ] = [ (+2) X { (-3) } ] = [ (+2) X { (+1) + (-4) } ] = [ (+2) X { (+1) - (+4) } ] = [ { (+2) X (+1) } - { (+2) X (+4) } ] = [ { (+2) } - { (+8) } ] = [ { (+2) } + { (-8) } ] = [ { (-8) } + { (+2) } ] = [ (-8) + (+2) ] = [ (-8) - (-2) ] = [ (-6) ] [^^^] = [ (+2) X (-3) ] = [ (+2) X { (-3) } ] = [ (+2) X { (-1) X (+3) } ] = [ (+2) X (-1) X (+3) ] = [ { (+2) X (-1) } X (+3) ] = [ { (-2) } X (+3) ] = [ (-2) X (+3) ] = [ { (-2) } X (+3) ] = [ { (+1) + (-3) } X (+3) ] = [ { (+1) - (+3) } X (+3) ] = [ { (+1) X (+3) } - { (+3) X (+3) } ] = [ { (+3) } - { (+9) } ] = [ (+3) - (+9) ] = [ (+3) + (-9) ] = [ (-9) + (+3) ] = [ (-9) - (-3) ] = [ (-6) ] [ (+2) X (-3) ] = [ The (Decrease) of (Fortune) ] = [ Buy 3 goods in $2 for cash $6. ] [ (+2) X (-3) ], The meaning of economic action [ (+2) X (-3) ] = [ (Fortune, prices of goods $2) X (-3) ] = [ (Fortune, prices of goods $2), subtract to add 3 times. ] = [ (Fortune, prices of goods $2), subtract to multiply 3 times. ] = [ (3 goods in prices of goods $2), buy for cash $6. ] ----------------------------- [ (-N) X (-N) = (+N) ], proof * [ Subtract debt ] = [ Offset = Setoff ] 0. (One party of Offset) [^^^] = [ (-6) - (-6) = ( 0 ) ] = [ (-6) { - (-6) } = ( 0 ) ] = [ (-6) { - < (-6) > } = ( 0 ) ] = [ (-6) { - < (-2) X (+3) > } = ( 0 ) ] = [ (-6) { - < (-2) X (3) > } = ( 0 ) ] = [ (-6) { - < (-2) + (-2) + (-2) > } = ( 0 ) ] = [ (-6) - < (-2) + (-2) + (-2) > = ( 0 ) ] [^^^] = [ (-2) X (-3) ] = [ - { (-2) + (-2) + (-2) } ] = [ - { (-2) X (3) } ] = [ - { (-6) } ] = [ - (-6) ] = [ + (+6) ] = [ (+6) ] = [ (6) ] = [ 6 ] [^^^] = [ (-2) X (-3) ] = [ { (-2) } X { (-3) } ] = [ { (+1) + (-3) } X { (+1) + (-4) } ] = [ { (+1) - (+3) } X { (+1) - (+4) } ] = [ { (+1) - (+3) } X (+1) - { (+1) - (+3) } X (+4) ] = [ { (+1) - (+3) } - { (+4) - (+12) } ] = [ { (+1) - (+3) } - { (+4) + (-12) } ] = [ (+1) - (+3) - (+4) - (-12) ] = [ (+1) - (+3) - (+4) + (+12) ] = [ (+1) + (+12) - (+3) - (+4) ] = [ { (+1) + (+12) } - { (+3) + (+4) } ] = [ { (+13) } - { (+7) } ] = [ (+13) - (+7) ] = [ (+6) ] = [ (6) ] = [ 6 ] [ (-2) X (-3) ] = [ One party of Offset, Let us Offset 3 cases in (Debt, Bill $2). ] = [ One party of Offset, Let us Offset (Debt, Bill $6). ] [ (-2) X (-3) ], The meaning of economic action [ (-2) X (-3) ] = [ (Debt, Bill $2) X (-3) ] = [ (Debt, Bill $2), subtract to add 3 times. ] = [ (Debt, Bill $2), subtract to multiply 3 times. ] = [ (Debt, Bill $2), come down to add 3 times. ] = [ (Debt, Bill $2), come down to multiply 3 times. ] = [ 3 cases in (Debt, Bill $2), com down. ] = [ 3 cases in (Debt, Bill $2), Let us offset. ] --------------------------------- In 50 to 50 partnership of 2 partners, 2 partners are liable for it, it is divided by 2 partners It is 4 cases of Increase of Positive(Credit, Fortune) -> [ (+N) / (+N) ] Decrease of Negative(Debt, Bill) -> [ (-N) / (-N) ] Decrease of Positive(Credit, Fortune) -> [ (+N) / (-N) ] Increase of Negative(Debt, Bill) -> [ (-N) / (+N) ] [ (+N) ÷ (+N) = (+N) ], proof [^^^] = [ (+N) X (+N) = (+N) ] = [ { (+N) } X (+N) = (+N) ] = [ { (+N) } = (+N) ÷ (+N) ] = [ (+N) = (+N) ÷ (+N) ] = [ (+N) ÷ (+N) = (+N) ] [ (-N) ÷ (+N) = (-N) ], proof [^^^] = [ (-N) X (+N) = (-N) ] = [ { (-N) } X (+N) = (-N) ] = [ { (-N) } = (-N) ÷ (+N) ] = [ (-N) = (-N) ÷ (+N) ] = [ (-N) ÷ (+N) = (-N) ] [ (+N) ÷ (-N) = (-N) ], proof [^^^] = [ (-N) X (-N) = (+N) ] = [ { (-N) } X (-N) = (+N) ] = [ { (-N) } = (+N) ÷ (-N) ] = [ (-N) = (+N) ÷ (-N) ] = [ (+N) ÷ (-N) = (-N) ] [ (-N) ÷ (-N) = (+N) ], proof [^^^] = [ (+N) X (-N) = (-N) ] = [ { (+N) } X (-N) = (-N) ] = [ { (+N) } = (-N) ÷ (-N) ] = [ (+N) = (-N) ÷ (-N) ] = [ (-N) ÷ (-N) = (+N) ] ----------------------------------- [^^^] = [ ( 0 ) + 1 = 1 ], Proof = [ { ( 0 ) } + 1 = 1 ] = [ { ( 1 - 1 ) } + 1 = 1 ] = [ ( 1 - 1 ) + 1 = 1 ] = [ 1 - 1 + 1 = 1 ] = [ 1 + 1 - 1 = 1 ] = [ ( 1 + 1 ) - 1 = 1 ] = [ ( 2 ) - 1 = 1 ] = [ 2 - 1 = 1 ] = [ 1 = 1 ] ------------------------------------ [^^^] = [ ( 0 ) + ( 0 ) = ( 0 ) ], Proof = [ { ( 0 ) } + { ( 0 ) } = ( 0 ) ] = [ { 1 - 1 } + { 1 - 1 } = ( 0 ) ] = [ 1 - 1 + 1 - 1 = ( 0 ) ] = [ 1 + 1 - 1 - 1 = ( 0 ) ] = [ ( 1 + 1 ) - ( 1 + 1 ) = ( 0 ) ] = [ ( 2 ) - ( 2 ) = ( 0 ) ] = [ 2 - 2 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] ------------------------------------ [^^^] = [ ( 0 ) - ( 0 ) = ( 0 ) ], Proof = [ { ( 0 ) } - { ( 0 ) } = ( 0 ) ] = [ { 1 - 1 } - { 1 - 1 } = ( 0 ) ] = [ { 1 - 1 } + { 1 - 1 } = ( 0 ) ] = [ 1 - 1 + 1 - 1 = ( 0 ) ] = [ 1 + 1 - 1 - 1 = ( 0 ) ] = [ ( 1 + 1 ) - ( 1 + 1 ) = ( 0 ) ] = [ ( 2 ) - ( 2 ) = ( 0 ) ] = [ 2 - 2 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] ------------------------------------- [^^^] = [ ( 0 ) X ( 0 ) = ( 0 ) ], Proof = [ { 1 - 1 } X { 1 - 1 } = ( 0 ) ] = [ { 1 - 1 } X 1 - { 1 - 1 } X 1 } = ( 0 ) ] = [ { 1 X 1 - 1 X 1 } - { 1 X 1 - 1 X 1 } } = ( 0 ) ] = [ { 1 - 1 } - { 1 - 1 } = ( 0 ) ] = [ { 1 - 1 } + { 1 - 1 } = ( 0 ) ] = [ 1 - 1 + 1 - 1 = ( 0 ) ] = [ 1 + 1 - 1 - 1 = ( 0 ) ] = [ ( 1 + 1 ) - ( 1 + 1 ) = ( 0 ) ] = [ ( 2 ) - ( 2 ) = ( 0 ) ] = [ 2 - 2 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] ----------------------------------- Proof, [ at the proof of { ( 0 ) X ( 0 ) = ( 0 ) } ] [^^^] = [ ( 0 ) X ( 0 ) = ( 0 ) ] = [ < ( 0 ) > X { ( 0 ) } = ( 0 ) ] = [ < ( 0 ) > = ( 0 ) ÷ { ( 0 ) } ] = [ ( 0 ) ÷ { ( 0 ) } = < ( 0 ) > ] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] Proof, ( directly ) [^^^] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] = [ { ( 0 ) } ÷ { ( 0 ) } = { ( 0 ) } ] = [ { ( 0 ) } / { ( 0 ) } = { ( 0 ) / ( 0 ) } ] = [ { 1 - 1 } / { 1 - 1 } = { ( 0 ) / ( 0 ) } ] = [ ( 1 - 1 ) / ( 1 - 1 ) = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) ] = [ { 1 / ( 0 ) } - { 1 / ( 0 ) } = ( 0 ) ] = [ 1 - 1 / ( 0 ) = ( 0 ) ] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] ---------------------------------- [^^^] = [ 1 - ( 0 ) = 1 ], Proof = [ 1 - { ( 0 ) } = 1 ] = [ 1 - { 1 - 1 } = 1 ] = [ 1 + { 1 - 1 } = 1 ] = [ 1 + 1 - 1 = 1 ] = [ ( 1 + 1 ) - 1 = 1 ] = [ ( 2 ) - 1 = 1 ] = [ 2 - 1 = 1 ] = [ 1 = 1 ] * [ - ( 0 ) ] = [ + ( 0 ) ] --------------------------------------- [ ( 0 ) - 1 = - 1 ], Proof Proof ( at definition ) [^^^] = [ N – N = ( 0 ) ] = [ ( 0 ) = N - N ] = [ ( 0 ) - N = - N ] [^^^] = [ 1 – 1 = ( 0 ) ] = [ ( 0 ) = 1 - 1 ] = [ ( 0 ) - 1 = - 1 ] ------------------------------------------ [^^^] = [ ( 0 ) X 1 = ( 0 ) ], Proof = [ { ( 0 ) } X 1 = ( 0 ) ] = [ { 1 - 1 } X 1 = ( 0 ) ] = [ { 1 X 1 } - { 1 X 1 } = ( 0 ) ] = [ { 1 } - { 1 } = ( 0 ) ] = [ 1 - 1 = ( 0 ) ] ------------------------------------ [^^^] = [ 1 X ( 0 ) = ( 0 ) ], Proof = [ 1 X { ( 0 ) } = ( 0 ) ] = [ 1 X { 1 - 1 } = ( 0 ) ] = [ { 1 X 1 } - { 1 X 1 } = ( 0 ) ] = [ { 1 } - { 1 } = ( 0 ) ] = [ 1 - 1 = ( 0 ) ] --------------------------------- [ 1 ÷ ( 0 ) = (∞ ) ] [ (∞) ] = [ 1, 10, 100, 1000, 10000, 100000, 1000000, 10000000, 100000000, ........... ] 1 ÷ (1) = ( 1 ) 1 ÷ (0.1) = ( 10 ) 1 ÷ (0.01) = ( 100 ) 1 ÷ (0.001) = ( 1000 ) 1 ÷ (0.0001) = ( 10000 ) 1 ÷ (0.00001) = ( 100000 ) 1 ÷ (0.000001) = ( 1000000 ) 1 ÷ (0.0000001) = ( 10000000 ) 1 ÷ (0.00000001) = ( 100000000 ) ........................................... [ 1 ÷ ( 0 ) = (∞ ) ] ---------------------------------- [^^^] = [ ( 0 ) ÷ 1 = ( 0 ) ], Proof = [ { ( 0 ) } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } ÷ 1 = ( 0 ) ] = [ { 1 - 1 } / 1 = ( 0 ) ] = [ { 1 / 1 } - { 1 / 1 } = ( 0 ) ] = [ { 1 } - { 1 } = ( 0 ) ] = [ 1 - 1 = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] ----------------------------------------------------------------- Hypothesis [^^^] = [ ( 0 ) = { no (Partial fortune and debt) } ] [^^^] = [ ( 0 ) = (no Partial fortune) + (no Partial debt) ] [^^^] = [ (no Partial fortune) = (+0) ] [^^^] = [ (no Partial debt) = (-0) ] [^^^] = [ ( 0 ) = { no (Partial fortune and debt)} ] = [ ( 0 ) = (no Partial fortune) + (no Partial debt) ] = [ ( 0 ) = (+0) + (-0) ] = [ ( 0 ) = (-0) + (+0) ] [^^^] = [ (no Partial fortune) = (+0) ] = [ (+1) - (+1) = (+0) ] [^^^] = [ (no Partial debt) = (+0) ] = [ (-1) - (-1) = (+0) ] The conclusion of hypothesis 1. [ (+0) - (+0 ) = (+0) ] 2. [ (+0) + (+0) = (+0) ] 3. [ (-0) + (-0) = (-0) ] 4. [ (-0) - (-0) = (-0) ] 5. [ (-0) + (+0) = ( 0 ) ] 6. [ (+0) + (-0) = ( 0 ) ] 1. [ (-0) X (-0) = (+0) ] 2. [ (+0) X (+0) = (+0) ] 3. [ (-0) X (+0) = (-0) ] 4. [ (+0) X (-0) = (-0) ] 1. [ (-0) ÷ (-0) = (+0) ] 2. [ (+0) ÷ (+0) = (+0) ] 3. [ (-0) ÷ (+0) = (-0) ] 4. [ (+0) ÷ (-0) = (-0) ] ------------------------------------------------------------------- 4-05. If, Defintion [ 1 ÷ ( 0 ) = (1∞) = (∞) ] [ 2 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 2 = (2∞) ] [ 3 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 3 = (3∞) ] [ 4 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 4 = (4∞) ] [ 5 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 5 = (5∞) ] [ 6 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 6 = (6∞) ] [ 7 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 7 = (7∞) ] [ 8 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 8 = (8∞) ] [ 9 ÷ ( 0 ) = { 1 ÷ ( 0 ) } X 9 = (9∞) ] ........................................... 4-06. (Infinity) = (Number) = ( Alsu ) [^^^] = [ (∞) - (∞) = ( 0 ) ] = [ 1 / ( 0 ) - 1 / ( 0 ) = ( 0 ) ] = [ 1 - 1 / ( 0 ) = ( 0 ) ] = [ ( 0 ) / ( 0 ) = ( 0 ) ] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] = [ ( 0 ) = ( 0 ) ] 4-07. [^^^] = [ 1 / ( 0 ) - 1 / ( 0 ) = ( 0 ) ] = [ (∞) - (∞) = ( 0 ) ] 4-08. [^^^] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] = [ { ( 0 ) } ÷ { ( 0 ) } = { ( 0 ) } ] = [ { ( 0 ) } / { ( 0 ) } = { ( 0 ) / ( 0 ) } ] = [ { 1 - 1 } / { 1 - 1 } = { ( 0 ) / ( 0 ) } ] = [ ( 1 - 1 ) / ( 1 - 1 ) = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) ] = [ { 1 / ( 0 ) } - { 1 / ( 0 ) } = ( 0 ) ] = [ (∞) - (∞) = ( 0 ) ] 4-09. [^^^] = [ ( 0 ) ÷ ( 0 ) = ( 0 ) ] = [ { ( 0 ) } ÷ { ( 0 ) } = { ( 0 ) } ] = [ { ( 0 ) } / { ( 0 ) } = { ( 0 ) / ( 0 ) } ] = [ { 1 - 1 } / { 1 - 1 } = { ( 0 ) / ( 0 ) } ] = [ ( 1 - 1 ) / ( 1 - 1 ) = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) / ( 0 ) ] = [ { 1 / ( 1 - 1 ) } - { 1 / ( 1 - 1 ) } = ( 0 ) ] = [ { 1 / ( 0 ) } - { 1 / ( 0 ) } = ( 0 ) ] = [ A - A = ( 0 ) ] *{ 1 / ( 1 - 1 ) } = A = { 1 / ( 0 ) } = Number ? --------------------------------------------------------------- http://www.youtube.com/user/trapassing http://www.flickr.com/photos/trapassing I cannot english. 1/5. [ Copyright of Image and Sentence ] 2/5. Copyright Notice : Copyright © (Coupdetat.net) 3/5. Do not Editing 4/5. Free Copyright (Use Only) : Personal Homepage and Blog 5/5. Copyright (No Use) : Profit-Making, Enterprise, Government
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