Schoolhouse Rock is ageless.

Let them figure it out with cady something like small marshmellows if they get the question right they get to eat the candy evntually Let them figure out with out the candy.But if they get it right still give them a reward like a sticker or something.

LB123. [ Negative X Negative = Positive ], Proof 1. [ N = Number ] [ Negative number = Negative = (-N) ] [ Positive number = Positive = (+N) = (N) = N ] [ Natural number = Natural ] [ Dead Zero ( 0 ) ] = [ ( 0 ) ] = [ Nothing ] [ Living Zero ( 0 ) ] = [ (+1) - (+1) ] = [ (+N) - (+N) ] = [ (+1) + (-1) ] = [ (+N) + (-N) ] = [ (-1) + (+1) ] = [ (-N) + (+N) ] = [ (-1) - (-1) ] = [ (-N) - (-N) ] [^^^] = [ (-N) = (+N) + (-2N) ] = [ (-N) = { Living Zero ( 0 ) } + (-N) ] = [ (-N) = { Living Zero ( 0 ) } - (+N) ] = [ (-N) = { (+N) - (+N) } - (+N) ] = [ (-N) = (+N) - (+N) - (+N) ] = [ (-N) = (+N) - { (+N) + (+N) } ] = [ (-N) = (+N) - { (+2N) } ] = [ (-N) = (+N) - (+2N) ] = [ (Negative) = (Subtraction of Positives) ] Change Negative for (Subtraction of Positives). [ (-N) = (+N) + (-N) + (-N) = ( 0 ) + (-N) = (+N) + (-2N) = (+N) - (+2N) ] [ (-N) ] = [ (+N) - (+2N) ] [ (-1) = (+1) + (-1) + (-1) = ( 0 ) + (-1) = (+1) + (-2) = (+1) - (+2) ] [ (-1) ] = [ (+1) - (+2) ] [ - (+N) = + (-N) ] [ - (-N) = + (+N) ] [ { - N - N } = { - ( N + N ) ] [ + N - N ] = [ - N + N ] [ ( A - B ) X ( A - B ) ] = [ ( A - B ) X A - ( A - B ) X B ] 2. Proof [^^^] = [ Negative numer X Negative number = Positive number ] = [ Negative X Negative = Positive ] = [ (Negative) X (Negative) = (Positive) ] = [ (-N) X (-N) = (+N) ] = [ { (-N) } X { (-N) } = (+N) ] = [ { (+N) + (-2N) } X { (+N) + (-2N) } = (+N) ] = [ { (+N) - (+2N) } X { (+N) - (+2N) } = (+N) ] = [ { (+N) - (+2N) } X (+N) - { (+N) - (+2N) } X (+2N) = (+N) ] = [ { (+N^2) - (+2N^2) } - { (+2N^2) - (+4N^2) } = (+N) ] = [ { (+N^2) - (+2N^2) } - { (+2N^2) + (-4N^2) } = (+N) ] = [ (+N^2) - (+2N^2) - (+2N^2) - (-4N^2) = (+N) ] = [ (+N^2) - (+2N^2) - (+2N^2) + (+4N^2) = (+N) ] = [ (+N^2) + (+4N^2) - (+2N^2) - (+2N^2) = (+N) ] = [ { (+N^2) + (+4N^2) } - { (+2N^2) + (+2N^2) } = (+N) ] = [ { (+5N^2) } - { (+4N^2) } = (+N) ] = [ (+5N^2) - (+4N^2) = (+N) ] = [ (+N^2) = (+N) ] = [ (+N) = (+N) ] = [ (N) = (N) ] = [ N = N ] 3. Example [^^^] = [ (-1) X (-1) ] = [ {(-1)} X {(-1)} ] = [ {(+1) + (-2)} X {(+1) + (-2)} ] = [ {(+1) - (+2)} X {(+1) - (+2)} ] = [ {(+1) - (+2)} X (+1) - {(+1) - (+2)} X (+2) ] = [ {(+1) - (+2)} - {(+2) - (+4)} ] = [ {(+1) - (+2)} - {(+2) + (-4)} ] = [ (+1) - (+2) - (+2) - (-4) ] = [ (+1) - (+2) - (+2) + (+4) ] = [ (+1) + (+4) - (+2) - (+2) ] = [ {(+1) + (+4)} - {(+2) + (+2)} ] = [ {(+5)} - {(+4)} ] = [ (+5) - (+4) ] = [ (+1) ] = [ (1) ] = [ 1 ] 4. Example [^^^] = [ (-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 ] 5. [ (-2) X (-3) ], The meaning of economic action [ (-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). ] 6. [ (-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. ] 7. [^^^] = [ (-2) X (-3) ] = [ - { (-2) + (-2) + (-2) } ] = [ - { (-2) X (3) } ] = [ - { (-6) } ] = [ - (-6) ] = [ + (+6) ] = [ (+6) ] = [ (6) ] = [ 6 ] LB128. Proof of Stendhal, [ (Debt 10,000 franc) X (Debt 500 franc) = (Fortune 5,000,000 franc) ] 0. Conclusion [ Offset of law of obligation ] = [ (-5,000,000) - (-5,000,000) = ( 0 ) ] [^^^] = [ (-10,000) X (-500) = - (-5,000,000) ] = [ - { (-10,000) X (500) } = - (-5,000,000) ] = [ One party of Offset, Let us Offset 500 cases in (Debt, Bill 10,000 franc). ] = [ One party of Offset, Let us Offset (Debt, Bill 5,000,000 franc). ] 1. Proof [^^^] = [ (Debt 10,000 franc ) X (Debt 500 franc) = (Fortune 5,000,000 franc) ] = [ (-10,000) X (-500) = - (-5,000,000) ] = [ { (-10,000) } X { (-500) } = - (-5,000,000) ] = [ { (+1) + (-10,001) } X { (+1) + (-501) } = - (-5,000,000) ] = [ { (+1) - (+10,001) } X { (+1) - (+501) } = (+5,000,000) ] = [ { (+1) - (+10,001) } X (+1) - { (+1) - (+10,001) } X (+501) = - (-5,000,000) ] = [ { (+1) - (+10,001) } - { (+501) - (+5,010,501) } = - (-5,000,000) ] = [ { (+1) - (+10,001) } - { (+501) + (-5,010,501) } = - (-5,000,000) ] = [ (+1) - (+10,001) - (+501) - (-5,010,501) = - (-5,000,000) ] = [ (+1) - { (+10,001) } - (+501) - (-5,010,501) = - (-5,000,000) ] = [ (+1) - { (+1) + (+10,000) } - (+501) - (-5,010,501) = - (-5,000,000) ] = [ (+1) - (+1) - (+10,000) - (+501) - (-5,010,501) = - (-5,000,000) ] = [ (+1) - (+1) + (-10,000) + (-501) - (-5,010,501) = - (-5,000,000) ] = [ (-10,000) + (-501) - (-5,010,501) = - (-5,000,000) ] = [ { (-10,000) + (-501) } - (-5,010,501) = - (-5,000,000) ] = [ { (-10,501) } - (-5,010,501) = - (-5,000,000) ] = [ (-10,501) - (-5,010,501) = - (-5,000,000) ] = [ (-10,501) - { (-5,010,501) } = - (-5,000,000) ] = [ (-10,501) - { (-10,501) + (-5,000,000) } = - (-5,000,000) ] = [ (-10,501) - (-10,501) - (-5,000,000) = - (-5,000,000) ] = [ - (-5,000,000) = - (-5,000,000) ] 2. Discovery [^^^] = [ (Debt 10,000 franc ) X (Debt 500 franc) = (Fortune 5,000,000 franc) ] = [ (-10,000) X (-500) = - (-5,000,000) ] = [ - { (-10,000) X (500) } = - (-5,000,000) ] = [ - (-5,000,000) = - (-5,000,000) ] 3. Proof [^^^] = [ (Debt 10,000 franc ) X (Debt 500 franc) = (Fortune 5,000,000 franc) ] = [ (-10,000) X (-500) = (+5,000,000) ] = [ { (-10,000) } X { (-500) } = (+5,000,000) ] = [ { (+1) + (-10,001) } X { (+1) + (-501) } = (+5,000,000) ] = [ { (+1) - (+10,001) } X { (+1) - (+501) } = (+5,000,000) ] = [ { (+1) - (+10,001) } X (+1) - { (+1) - (+10,001) } X (+501) = (+5,000,000) ] = [ { (+1) - (+10,001) } - { (+501) - (+5,010,501) } = (+5,000,000) ] = [ { (+1) - (+10,001) } - { (+501) + (-5,010,501) } = (+5,000,000) ] = [ (+1) - (+10,001) - (+501) - (-5,010,501) = (+5,000,000) ] = [ (+1) - (+10,001) - (+501) + (+5,010,501) = (+5,000,000) ] = [ (+1) + (+5,010,501) - (+10,001) - (+501) = (+5,000,000) ] = [ { (+1) + (+5,010,501) } - { (+10,001) + (+501) } = (+5,000,000) ] = [ { (+5,010,502) } - { (+10,502) } = (+5,000,000) ] = [ (+5,010,502) - (+10,502) = (+5,000,000) ] = [ (+5,000,000) = (+5,000,000) ] = [ (5,000,000) = (5,000,000) ] = [ 5,000,000 = 5,000,000 ] 4. Offset of law of obligation [^^^] = [ (-10,000) X (-500) = - (-5,000,000) ] = [ - { (-10,000) X (500) } = - (-5,000,000) ] = [ (Debt, Bill 10,000 franc), subtract thing to multiply 500 times. ] = [ (Debt, Bill 10,000 franc), subtract thing to add 500 times. ] = [ (Debt, Bill 10,000 franc), come down thing to multiply 500 times. ] = [ (Debt, Bill 10,000 franc), come down thing to add 500 times. ] = [ One party of Offset, Let us Offset 500 cases in (Debt, Bill 10,000 franc). ] = [ One party of Offset, Let us Offset (Debt, Bill 5,000,000 franc). ] 5. Conclusion [ Offset of law of obligation ] = [ (-5,000,000) - (-5,000,000) = ( 0 ) ] [^^^] = [ (-10,000) X (-500) = - (-5,000,000) ] = [ - { (-10,000) X (500) } = - (-5,000,000) ] = [ One party of Offset, Let us Offset 500 cases in (Debt, Bill 10,000 franc). ] = [ One party of Offset, Let us Offset (Debt, Bill 5,000,000 franc). ] Law of Liuhui Brahmagupta [ N X (-N) ] = [ - ( N X N ) ], [ N X (+N) ] = [ + ( N X N ) ] [^^^] = [ Negative number X Positive number = Negative number ] = [ Negative X Positive = Negative ] = [ (-N) X (+N) = (-N) ] = [ { (-N) } X (+N) = (-N) ] = [ { (+N) + (-N) + (-N) } X (+N) = (-N) ] = [ { (+N) + (-2N) } X (+N) = (-N) ] = [ { (+N) - (+2N) } X (+N) = (-N) ] = [ { (+N) X (+N) } - { (+2N) X (+N) } = (-N) ] = [ { (+N^2) } - { (+2N^2) } = (-N) ] = [ (+N^2) - (+2N^2) = (-N) ] = [ (+N^2) + (-2N^2) = (-N) ] = [ (-2N^2) + (+N^2) = (-N) ] = [ (-2N^2) - (-N^2) = (-N) ] = [ (-N^2) = (-N) ] = [ (-N) = (-N) ] [^^^] = [ Negative number X Positive number = Negative number ] = [ Negative X Positive = Negative ] = [ (-1) X (+1) = (-1) ] = [ { (-1) } X (+1) = (-1) ] = [ { (+1) + (-1) + (-1) } X (+1) = (-1) ] = [ { (+1) + (-2) } X (+1) = (-1) ] = [ { (+1) - (+2) } X (+1) = (-1) ] = [ { (+1) X (+1) } - { (+2) X (+1) } = (-1) ] = [ { (+1) } - { (+2) } = (-1) ] = [ (+1) - (+2) = (-1) ] = [ (+1) + (-2) = (-1) ] = [ (-2) + (+1) = (-1) ] = [ (-2) - (-1) = (-1) ] = [ (-1) = (-1) ] Explanation [ (-1) ] = [ ( 0 ) + (-1) ] = [ (+1) + (-1) + (-1) ] = [ (+1) + (-2) ] = [ (+1) - (+2) ] [ - (-1) ] = [ + (+1) ], [ - (+1) ] = [ + (-1) ] [^^^] = [ (-1) = (+1) - (2) ] = [ (Negative) = Subtraction of (Positives) ] (-N^2) -> always, (Negative number) [ N = Number ] [ (-N) = Negative number = Negative ] [ (+N) = Positive number = Positive = N ] [^^^] = [ (+5) X (-3) = (-15) ] = [ (+5) X { (-3) } = (-15) ] = [ (+5) X { (+1) + (-4) } = (-15) ] = [ (+5) X { (+1) - (+4) } = (-15) ] = [ { (+5) X (+1) } - { (+5) X (+4) } = (-15) ] = [ { (+5) } - { (+20) } = (-15) ] = [ (+5) - (+20) = (-15) ] = [ (+5) + (-20) = (-15) ] = [ (-20) + (+5) = (-15) ] = [ (-20) - (-5) = (-15) ] = [ (-15) = (-15) ] [^^^] = [ (-5) X (+3) = (-15) ] = [ { (-5) } X (+3) = (-15) ] = [ { (+1) + (-6) } X (+3) = (-15) ] = [ { (+1) - (+6) } X (+3) = (-15) ] = [ { (+1) X (+3) } - { (+6) X (+3) } = (-15) ] = [ { (+3) } - { (+18) } = (-15) ] = [ (+3) - (+18) = (-15) ] = [ (+3) + (-18) = (-15) ] = [ (-18) + (+3) = (-15) ] = [ (-18) - (-3) = (-15) ] = [ (-15) = (-15) ] [^^^] = [ (-3) X (-5) = (+15) ] = [ { (-3) } X { (-5) } = (+15) ] = [ { (+1) + (-4) } X { (+1) + (-6) } = (+15) ] = [ { (+1) - (+4) } X { (+1) - (+6) } = (+15) ] = [ { (+1) - (+4) } X (+1) - { (+1) - (+4) } X (+6) = (+15) ] = [ { (+1) - (+4) } - { (+6) - (+24) } = (+15) ] = [ { (+1) - (+4) } - { (+6) + (-24) } = (+15) ] = [ (+1) - (+4) - (+6) - (-24) = (+15) ] = [ (+1) + (-4) + (-6) + (+24) = (+15) ] = [ (+1) + (+24) + (-4) + (-6) = (+15) ] = [ { (+1) + (+24) } + { (-4) + (-6) } = (+15) ] = [ { (+25) } + { (-10) } = (+15) ] = [ (+25) + (-10) = (+15) ] = [ (+25) - (+10) = (+15) ] = [ (+15) = (+15) ] Law of Liuhui Brahmagupta [ N X (-N) ] = [ - ( N X N ) ], [ N X (+N) ] = [ + ( N X N ) ] [^^^] = [ (-3) X (-5) = (+15) ] = [ - { (-3) X (+5) } = (+15) ] = [ - { (-15) } = (+15) ] = [ - (-15) = (+15) ] = [ + (+15) = (+15) ] = [ (+15) = (+15) ] 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

I taught my son the basics with money because this child is in LOVE with cash. Once he knew the basics, I would talk about math no matter where we were....grocery store, in the car, at a restaurant. I quiz him constantly and he loves it. Grade 3 student and he learns at grade 7 level!