Question
Find the solution to this system of equations.
![](data:image/png;base64,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)
- (1,0)
- (-3, -1)
- (-1,-3)
- (1,3)
The correct answer is: (-3, -1)
Related Questions to study
The 'b" in y=mx+b represents ____________________.
In the equation 'y = mx + b', 'b' is the point, where the line intersects the 'y axis' and 'm' denotes the slope of the line. The slope or gradient of a line describes how steep a line is. It can have either a positive or a negative value.
The 'b" in y=mx+b represents ____________________.
In the equation 'y = mx + b', 'b' is the point, where the line intersects the 'y axis' and 'm' denotes the slope of the line. The slope or gradient of a line describes how steep a line is. It can have either a positive or a negative value.
If a system of linear equations is consistent and independent, the lines are_________.
A system of linear equations is consistent independent when it has exactly one solution. When this is the case, the graphs of the lines in the system cross at exactly one point.
If a system of linear equations is consistent and independent, the lines are_________.
A system of linear equations is consistent independent when it has exactly one solution. When this is the case, the graphs of the lines in the system cross at exactly one point.
Diego scores 11 more points than Travis. Together they score 21 points. Find the number of points each person scored.
You can also use elimination method to solve the answer.
Diego scores 11 more points than Travis. Together they score 21 points. Find the number of points each person scored.
You can also use elimination method to solve the answer.
Find the solution to the system of equations.
y = 3x - 8
y = 4 - x
You can also use the elimination method to find the answer.
Find the solution to the system of equations.
y = 3x - 8
y = 4 - x
You can also use the elimination method to find the answer.
Solve for x and y
3x + 2y = 16
7x + y = 19
You can also use the elimination method to find the answer.
Solve for x and y
3x + 2y = 16
7x + y = 19
You can also use the elimination method to find the answer.
Lisa and Tammy are selling items at the craft show. Which might be a reasonable solution from the graph showing the number of items sold when they both have earned the same amount?
![](data:image/png;base64,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)
Lisa and Tammy are selling items at the craft show. Which might be a reasonable solution from the graph showing the number of items sold when they both have earned the same amount?
![](data:image/png;base64,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)
Solve the system of equations by graphing.
![open curly brackets table attributes columnalign left end attributes row cell y equals 3 x minus 5 end cell row cell 2 x plus y equals 5 end cell end table close](data:image/png;base64,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)
You can also use the elimination method to solve the answer.
Solve the system of equations by graphing.
![open curly brackets table attributes columnalign left end attributes row cell y equals 3 x minus 5 end cell row cell 2 x plus y equals 5 end cell end table close](data:image/png;base64,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)
You can also use the elimination method to solve the answer.
Find the slope of the line.
![](data:image/png;base64,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)
The slope of the equation is the ratio of the change in the y-axis to the change in the x-axis.
Find the slope of the line.
![](data:image/png;base64,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)
The slope of the equation is the ratio of the change in the y-axis to the change in the x-axis.
Solve the system of equations by graphing.
![open curly brackets table row cell y equals 2 end cell row cell y equals 5 over 2 x minus 3 end cell end table close](data:image/png;base64,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)
You can also use elimination method to solve the answer.
Solve the system of equations by graphing.
![open curly brackets table row cell y equals 2 end cell row cell y equals 5 over 2 x minus 3 end cell end table close](data:image/png;base64,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)
You can also use elimination method to solve the answer.
The number of solutions to the system of equations is,
![](data:image/png;base64,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)
The system of an equation has infinitely many solutions when the lines are coincident, and they have the same y-intercept.
The number of solutions to the system of equations is,
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUEAAAE3CAYAAAA0dfPtAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADzeSURBVHhe7Z0JfFRVnu9jL3ZP95vp1+rY8/rN6xl0psW2p5npRQgBN3DDbtBuRdxFBLInRFRQEVxRWWRfg2yyhS0LSSB7UlkNgQQSwpaNbBASsm+Qqt+7/1M3YSuQJFXn3Gv/v5/P0VSdm3Dq1P987/+cu7kxDMMwDMMwDMMwDMMwDMMwDMMwDMMwDMMwzHef57QyVStTuHDhwuXvqJD3nnO79dZbbT4+PvD09MSzzz4L+tnf398UZfLkyRg7dix8fX0d1huxvP7663jyyScN1WY/Pz/xvXt5eeG5557DH//4Rzz99NPi/YCAALzwwgsYMGCA6Gt67ehvGK2YMTbs/T/OYZ1Ry8SJE0WsqOzngMAAvOzjj2G/88DI//w9Xn31dYfbUaH4pTH4zDPPCOfddtttNrff/OY3qKurQ3V1FZKSknDu3Dk0NzejqanJ0KWlpQXl5eWIi4tDQ0ODadpcXFyM8PBww/RzY2OjaBfR3t6O+fPnIygoCGVlZT3vffPNN3j88ccRHx+PtrY2h3/HSOWy2KivN0lsNGtjsBrJycmivWaJ55KSEuzbtw/19YrGYEcHmrusqNgTj5N3/A45L/uiou7a33n3GKTYqKqqxD333AO3O++8EykpKUhIiMfq1auRmpqKjIwMpKenG7pkZWUhJiYGK1euFK/N0ObMzExERUVhwYIFhulnakdOTo6QhbWrS8gvLCwMwcFrUFFRgdzcXGzZsgUeHh4iPmhbR3/HSOXS2DBLPFNs0MAMDg4W7TXLGKR4Xrp0KdLS0uS2mf6tgweRqvVboX8Qzv/sfwNubjgx5Q2kHci5ZluozZGRkVixYoXob/Kf23/913+hQ7MpZVP0i/Sz1Wo1RaEMloK8s7PTYb0RC+3t9+7da6g2t7W1Y+vWrTh+/LjI/goKCjBr1iycPn0aVpsNhw4dwl/+8hcR6I5+34iltrZOtPf8+fMO641YaAzSIHVUZ9RCMULZ6/nzEuNZi1FRjhxBlzYVt2nyIwHS/21rv3L8O5cUGoMWi0XLXuvxu9/9zi7BCxcuiFSRvgD62SzQhyC7d2kZjFk4c+aMyFKM1GYKjNDQUMydOxcbN27U9pIrxR6+Oxby8/OFBGknaRbqz9WL9tJnMws0BrOzs/VX5qCmpkYIRWo8t7fD9vUm4Ne/FvLrLkKCm7T3vwVqM+0gqb97JEh7S1obopScfjYLtK5GH8ZM4qY9J62hGK3NNi3jo2mvt7c3tm0L0eRh02uAw4cPCwnSDscsnKs7Z7odJI1BWn81E7RTp+U0mfFsXbiwJ/u7SoI7duhbXRtqM80gqb9ZggowqgSvB0tQDizBG8NWWAjre+/B9tOfXi7Bm26CLSJC3+rasAQVwxKUA0tQDiokSFgbGmG9++7LJCiKNra+DZagYliCcmAJykFJJqiV84uXAN//vj0DfOAB2P72N+AnPwFiY+0bXQeWoGJYgnJgCcpBhQStJ07Cets/2zO/W26BLeeAWNO27dotpsrfBktQMSxBObAE5SBbgnSs/8K06T3TX9t07edewhJUDEtQDixBOciW4PmMLHT98+1CgNbbb4ft2DG95sZhCSqGJSgHlqAcZEqQ1gK7Xnr5Yha4cJG9opewBBXDEpQDS1AOMiXYkZHZc1qM7a67gJqzek3vYAkqhiUoB5agHGRJ0NrRga5HHrUL8Hvfg23NV3pN72EJKoYlKAeWoBxkSJCmwRcio2G7+Wa7BOmUmH78eyxBxbAE5cASlIMMCVrrG3Defah9LfAHP4QtJESv6RssQcWwBOXAEpSDDAl2rQ6+eKeYceM0K/bvphgsQcWwBOXAEpSDqyVoq6qC9b9+ZxegNh22JSfrNX2HJagYlqAcWIJycLUErbNm2afBJEFPT/3d/sESVAxLUA4sQTm4UoIXSstg/fd/twvwtttgO3JEr+kfLEHFsATlwBKUg0sl6ON7MQsMekObG1+8x2V/YAkqhiUoB5agHFwlQevBXNh+/nO7AO+6CzZt3DgLlqBiWIJyYAnKwSUSpGeBvDr+4hHhL77QK5wDS1AxLEE5sATl4AoJ2uLiYPvhD+0C/OOfYKup0WucA0tQMSxBObAE5eB0CWrfV9eoJy6uBW7cqFc4D5agYliCcmAJysHZErRq0qNrg0mAXcPvg625Ra9xHixBxbAE5cASlIMzJWhrboZ1qH553I//AV37YvQa58ISVAxLUA4sQTk4S4J08ot1xYqL0+DRY4DOTnulk2EJKoYlKAeWoBycJsHqalj/4z/sArz1Vlgzs/Qa58MSVAxLUA4sQTk4S4LWTz7pOSXGOmmSyAxdBUtQMSxBObAE5eAMCXYdKYTt//zSngX+8pewavHmSliCimEJyoElKAdnSNA6JahnLbDrgw9cmgUSLEHFsATlwBKUQ38laMvSPu8//cyeBQ4YAGtpqV7jOliCimEJyoElKIf+SFA8MP2553uyQOvyFXqNa2EJKoYlKAeWoBz6JcGYGOCn/8suwN//HlbtO5MBS1AxLEE5sATl0FcJ2trbYR0xwp4F/uAHwKZNeo3rYQkqhiUoB5agHPoiQXFidMj2izdJeOwxaH/AXikBlqBiWIJyYAnKoU8SPFMjpr/dWaAtOlqvkQNLUDFGluDJkycRGxuLoqIi/R07LEE5/N1IcPlyuwBpLfCll2Dr59PjegtLUDFGlCAdpcs9eBDTp0/HhAkTMHPmTBRpQuyGJSiHvwcJ2sorxJ2ixTT4H/8JtvQMvUYeDiVIH6CpqQlZWVmmEkp9fb3pAp2+gJiYGEO1uaOjA5/N/gwRERHi+9+1axdWrVoFq76Hzs/PFxLMyJAfsH2l/ly9aG/3ZzADNAazs7P1V+agpqYGFovlhuPZ+u67PVmgzd9ff1cu1GZKnqi/L8sE6Q3aC5kpE+yWoJnETRKkKaeR2kwBXFVVhU79rh2hoaFYvXp1j0C6M0GaKZgFmiVQe820g2zWxuD+/fv1V+aAhEJZ1Y3Es/XoMdj+36/sEvzl/wVOXJxtyITGIHmjJxO88847hcnj4xO0wA8WH4iChzYycqGslTKqlStXCqvTXt/RdkYq1ObIyEgsWLBA9LNR2kz9V1ZWJgLkpBaYn332GQoLC3HkyBGRmWzduhUeHh4iO8zJyXH4N4xUqJ9pycFMsUFjjnaOwcHBor1maDMlTVFRUVi2bNl1vZGmvZ+ZnYP6p5+1Z4BaOfrCq7Ds12JJsmuozTQGV6xYgbi4OJD/3O7S5ufHjx/XpjwFIgOgxfHS0lIUFxcbulAb8/LyxNSNXpeUlFy1jdEKtZn29Bs3bjRcPzc3N4s2LVy4UAQ0UVlZpcnxlAiWESNGYOfOnSgvL3f4+0YqJPTc3DzR3qKik6aJjYKCAoSFhYmfzdBm6mfaKYaEhIh+vmY8V1aidPtOdPz4J3YJ3vNbVB8uwEntfYfbu7B0t3nHjh1imWfgwIFwo3SQaGtrM10qTgOX9vpmoq6uTsu64/VXxiEnZz8CAwNFcFC/tre36zUQWeGYMWNMtWjf3NRsuoMMNAYPHDigvzIHtOxAGdZ1oWWVsfYsUEhQmwmppHuphPp70KBBfHRYNkY8OkzB4OPjA4qFZ555Bo899hiWL1/es57GR4fl8J09OrwnEviBfmL0UA+gpVmvUIPDo8MsQXkYUYIkikptakLTMcpEaB3w1KlT4tQZgiUoh++iBG2dnbDpl8fRA5S6tm7Va9TBElQMXzEiB5agHL5Ngta16y5Og0eNgq21Va9RB0tQMSxBObAE5XBdCTY3w/ane+0C/PGPYU1O0SvUwhJUDEtQDixBOVxPgrbPP+/JArtefAm288aIeZagYliCcmAJyuFaErRVVok7RZMArf98O6x5h/Qa9bAEFcMSlANLUA7XkqD1vRk9WaBV0eVx14IlqBiWoBxYgnJwJEFb7kHYbrnFLsBf/Qo2/Woko8ASVAxLUA4sQTlcKUFxUpWXV08WeGH25+J9I8ESVAxLUA4sQTlclQnGabH9Dz/BwZ/dibZBvwfKy+3vGwiWoGJYgnJgCcqhW4I2ygG7OlD9iidmD/XF5HGr0Lb+a30rY8ESVAxLUA4sQTmQUDLSLeLntKhcvPzy1/hjQCb8P06FtVHt5XHXgiWoGJagHFiCcmhuOIvI6HgsCjmKJ95Mg8eUDAzzt2Daslx9C+PBElQMS1AOLEHXc6HLipT95Xju3VgM9U7GA4GpGBmUiuG+KfjwqwJ9K+PBElQMS1AOLEHXc/xUE56ZmYXBvmkYocmPBEhlmCbBeVuP6VsZD5agYliCcmAJup7mtguw5FRhfFAUHgxIEQIkGZIEF+84oW9lPFiCimEJyoElKIn8g5jzt48xfEqGNh22aFPhZAz2TMKaPaX6BsaDJagYlqAcWIJyyFv0NUa/uhNDAtIx6YscrIsqxrhZWVgXzRKUAktQDixBOZhOgrkH8NH45RjsnyGmw3HZp8XbZadbcKS0QfxsRFiCimEJyoEl6GLaW5D+9gI89vIuDPZLg++XB9HWYY6+ZgkqhiUoB5aga2nPzkHAq1/h3qAsPDo1DZkFdXqN8WEJKoYlKAeWoAtpakB80Fw8NGkvBvukYvryXFit5ulnlqBiWIJyYAm6jnN7E/HqyxvgPiULI/3jsT0iW3vXPPHMElQMS1AOLEEXcaYKIW+swDDvRAwLzMD7y9ORlZGq9TNLUAksQTmwBOVgBgmWfh2KZ5/fiCGBmXj6/W+QcbBISNBM8cwSVAxLUA4sQRdw7ixWBAZjsH+6uCpkS2w5murPwmK5+vb6RoYlqBiWoBxYgk7G2oWSRWvx9MtbxSkxdEJ0XeMFNNbXOnzGiJFhCSqGJSgHlqBz6SouwizPr0QWeH+ABdvj7c8NqdGEwhJUCEtQDixBORhWgl3tKPgiGKNe34N7fe0nRnd02vuVhMISVAhLUA4sQTkYVYJt+w9i2rhFGBJIl8dZsDezWq9hCSqHJSgHlqAcDCnB8+1InL0BD3jGYoivBTOC83GhSzxTTsASVAxLUA4sQTkYUYJN0TEIfHYphkzJxEOBFmTmn9Vr7LAEFcMSlANLUA6Gk6CWBe6YuQHDvBLgrmWBczYf1frzYhZIsAQVwxKUA0tQDkaTYMOOMLz+ygbcG5CB0dPTUVTRpNdchCWoGJagHFiCcjCUBOvOIth3KTy0LHCoTwoWbj8Om+3yLJBgCSqGJeh88vLyYLFYLpMHS1AOxpGgFRXbozF2/HYM1rLAFz78BrWNHXrd5bAEFcMSdB5trW2IjY3Fk08+idmzZ8Nqteo1LEFZGEWCtpIiLBy/AEP9UjHEKxkb99lPjHbEd0KC9B8K+JaWFmRnZ18W/EanW9yO0nSjcvbsWSEbo7X5xIkTWLp0Kd5++22sXLnysvYdOXIEo0ePRlZWlv6O8WlsaDRVe4nW1lbk5OTor9RxeE0oHp8QLi6P856fh4bWa+9IamtrRSJipjFIbc7IyBDOGzRoENwGDhyIkpISHDt2DBERe1BWVobKykpUVFQYulRVVaGwsBDh4eE4deqUadqcm5uHLVu2GKqfy8vLRaGsac+ePVi9erWWZdeJOtprJiUlYeTIkaKv6fWVv2+0Qv1M4o6IiDBVbBw/fhxRUVHiZxVtrqypwbm0DHw8abXIAof5JGNdWB5qa6ocbl9dXY1Dhw5h165dpvEGtZmWfMLCwjTnHcXdd98NtwEDBojpWWRkpMgEKEtJSEhAXFycoUtiYqIYlIsXLxav4+Pjr9rGaIXavHPnTsyZMwcxMTGGaTN95xQYtGfcvXs31qxZow3IY+J92stv2LAB7u7uWLJkCdJS0xz+DSMVkjYFOcUGfQazxAbtgJYtWyZ+lt5m7d9Mi9uHdf5z8fDkGHgEZGDy7EzExiUiMcHB9lqhfiYBLliwwDTeoDbTGFy0aKHYSd5xxx32NcHOzk40NTaJ6UP3miClt0YuBK0J0rpP93qEo+2MVIjTZ04LARqtn7vZsWMHVqxYcdkaT35+/mVrgo5+30iF6F4TNFNsNDU1iSWpbhxt56pCXMg5gKmvrxMHQx4OSkVWQa1439H2VAiaGdCBNDP1s31NMO3yAyP0AegLIAleGvxGp76+XmQqZlr8pi+AMm+jtnnTpk348ssvL4uD7gMjtI5iFurP1Yv2mmmN+0oJSuV8O6JmrMGDE+m5IRa8s/KwtqP+9r6r0abQV55NYHSozeQN6m8+OqwAo58iQ8KjOOCjw/JReXS40ZKJ8a9vE7fKGj0tDQUlN/bcYNqp8ykyCmEJyoElKAdlEqw7jZ1vrcBw7wQM9k7B3M1H9YpvhyWoGJagHFiCclAlwYqoZIx7LURkgWPfz0RJZYte8+2wBBXDEpQDS1AOSiRYXY7VQcHi0rihvsnYEF2iV9wYLEHFsATlwBKUg3wJ2nAieDuefGmbOCL8/AdZOF3XrtfdGCxBxbAE5cASlIN0CVaU4bOAjRgSkI77/ZIRYanQK24clqBiWIJyYAnKQa4ErTiwaDNGvRaGe31TMXlODppbez/2WYKKYQnKgSUoB5kSPF94FG9N3oAh/mnijtEx31x8bkhvYAkqhiUoB5agHKRJsL0Flk/XYeRrERjsl4o3lx7S+qlvJ5WzBBXDEpQDS1AOsiRYn3UQXhO+xpDATIwITEFmvv3yuL7AElQMS1AOLEE5SJHghQ6EfbgR93nGw90nBV9sKqQLfvXK3sMSVAxLUA4sQTnIkOCZmGS89spGMQ0ePS0DhaWNek3fYAkqhiUoB5agHFwuwaZ6rHl3M9y9k+DhZ8GyXSf1ir7DElQMS1AOLEE5uFqCFbtjMW68/fK4cTOzUFnTqtf0HZagYliCcmAJysGVErTVnMH8oI3i+cHDfJOxMbpUr+kfLEHFsATlwBKUg+skaMORr6PwlwmhYi3w9c/3o765U6/rHyxBxbAE5cASlIOrJHj+xEnM9F6HIZoAh/ulYHdSuV7Tf1iCimEJyoElKAfXSNCKjFUReHhiNAb7pmLKoly0dTgv9liCimEJyoElKAdXSLD9YB6mTlwvssCHAlKQlHNar3EOLEHFsATlwBKUg9Ml2HUeEXN34L5JMeKAyMzgfHR2OjfuWIKKYQnKgSUoB2dLsCHtG3hO2IQhARkY9VYaDhfV6zXOgyWoGJagHFiCcnCqBNtbsPmDLRjqlYgh3vbL47q6+n553LVgCSqGJSgHlqAcnCnBM3FpeH7SLnFKzNgZGSiratZrnAtLUDEsQTmwBOXgNAnW1mD5m2vhoWWBQ31TsCq0SK9wPixBxbAE5cASlIOzJHh8dyJGTwwTl8e9+FEWztS16TXOhyWoGJagHFiCcnCGBG0V5ZjruwbudGK0bxK2xzvn8rhrwRJUDEtQDixBOThDglkb9uHR1/dgsK8Fnl9ko6GxQ69xDSxBxbAE5cASlEN/JXi+qAjv+G4WJ0aPCLQgLqtSr3EdLEHFsATlwBKUQ78k2NWBuEW78eCEKHF53BuLD6Kt3fVjmSWoGJagHFiCcuiPBNuOHIOP307xDOGRUyz45kjfnxvSG1iCimEJyoElKIc+S7CzFaGfbsMDE/dhiI8Fs9YUoMvq/BOjHcESVAxLUA4sQTn0VYI1mQfx0sTt4pSY0W9ZkH9CThZIsAQVwxKUA0tQDn2SYFMjvv44BMO87ZfHLd5aoFfIgSWoGJagHFiCcuiLBEsiU/DUxDC4+6fhr++ko6i8Qa+RA0tQMSxBObAE5dBrCTY3YtGMHXD3TsZwv2Rs2lusV8iDJagYlqAcWIJy6JUEbV3I37IXYyaEYoiWBb40Kx215/r/9Lje8p2RoNVqRXNzs/gCzBQ0DQ0NyMjIgK0fT9CXTU1NDWJjY03V5oKCAowePVrsJM1CQ32DqdpL0Bjcv3+//ur6XDhdjXenhODegAw8EGBBeNIpvUYuZ8+eFUIxUzxTm2kHSf0tJEj/IfG1tLSIL4CEaBaampqQlZVlqi+gtrYW8fHxpmpzYWEhxowZ0/tFe4X0emppAFpbW3HgwAH91XWwdiFn5W48Mjka7r6pCFp8WMvE1IzburpaMRsz2xikHSQ5b9CgQXD7+c9/jtdeew2vvvoqnnrqKfHz66+/jgkTJhi6UBtfeeUVMTjN1OYXX3wRo0aN6nl95TZGK5MnT8YzTz+Nf/u3fxN9Ta8dbWekMnHiRLz88suivfTaLLFBY/DJJ58UP1+rza9OnICPvPwwccIG3P9GNu7zisGYZ30x6fXx2u9cvb0rC/UzxfOf//xn04xBavMLL7wgZjbkj1tuuQVut99+O2bMmIF33nlHfBD6+YMPPsCsWbMMXT788EO89dZbos0zZ850uI3RCrV56tSpInDef/99U/TzRx99BF8fH/z6P/9TBBG9drSdkQr189tvv22q2KBYmDZtmtbHrzusF0Xb5tN33kLg4954yCcR903JgveHsZg/93PM1OLJ4e+4sFA/v/nmm5q8x5smnrvbPH78eEyfPh2/+MUv7NNhor29/YbXI4wCzenNtu5DB3NoOmwmjh07JrKq7Oxs/R3j073GbSY6Ojpw8OBB/ZVj2vIK4TtpK9wDM/HolGRk5Tn36XG9pb6+Hulp5jlgRjQ01ItlNHKemA7TgRE6skPzY1qPMNOaIK370MA0U5u7D4yYqc35+fni6DAdhDILNDhpB2mmtSpaE8zNzdVfOcB2AVsXRsPDJxnuXkmYt/GwFkdqP19tXR2ytH422xhMTU0TO8oeCXZ2dopKetNs0MERM0F7n9qz9suajDhAHQWzGU+RoZimnaTZuF48n0lIxysTtmGwXxpGT0vFiTLnPz2ut1AMm62fKeGrqqoSMSKODv/3f/+3ONUkPDwcAQEBWLVqldjI6NBec+PGjaLNCxYsEHt+s3DwwEFxruD5TuOck9nQ0IhFixbD29tbrO1UVFToNeaUIEHLO1FRUaY47Yvief369SKeFy5ceLVYtARl4cxdcPdMhIdvCpZIvjzOESSRXbt2IzAwEMHBwWhtkX+eYl+h/l69erX9wMgf/vAHbN26DbNnzxbT4cWLF2P79u2GTm+pbevWrcMnn3wipg8bNmwQr7szWqNCmXZERASeeOIJvPvuu4Y5wZT6MyQkBMuXL8ehQ4dEDNCA7M5UzSZByqZCQ8Pw6KOPiYNnRp8SU/9//fXX+PTTT5GXlydimXbwl164UBabgb9NDrc/N2RmOuoUnBh9JVu2bBEHG2gMzps3D7s1IZph+YH6m5K+ESNG4Ec/+pH9wAitnRQVFYngoYFAH87IH4b27LTofeL4cfGaMquZM2cZPi0/ceK4yLTpCOuiRYsMI23K/OnoXoYuOdoZUlB3Z9dmkyDFMsUxHf2bP3++4TNBah9lrSUl9sve6Gc6qt09NbadOY0Pp24TT45z90rEurBj4n2VkB/o4AKtF1M7KZ4peTKDBI9r3qD20ukyN998s31NsJulS5fC19cXOTk5pvgwBKW1tOeMjIw0fLC3tdmf+pWQkCC+BDoaaAQoQ6VB1312AB0NpikZrZsQZpNgZ6e9XykmSOZmuqSL1owpC6flku54PhCegYcnRYvb5k/+PBv154yzXEXZ6pIlS+Dn5/etR7aNAPkiMnKPSPzee+89fP/734fbPb+9R5icpFdXV4fk5GQxNaZrXI0EBcfmzZvF+YyUyhLU5tDdoVi2bJlW77rHCvYVajNl1dTmsLCwnqCOjo4WkjGSBCkguk8poStEvvzyS1RXV4vXZl0T3L17N+bOnWsaCdKR3h07dogstnuW0FlSivcDNounx93nm4TIlDLxvmpo7F240CX6lryRlJSEzz//XFyXa1SozbRz2bFju1jzDgoKskvwt/f8Flu3bhXZH0FTCTqht6SkRLw2ChQUcXFxYjGTBiMdzNm5c6eWBa437EGRS9t86Y0eaLGeDuYYRYIka1pfpR0gQRkhZVDd0zGzSnDXrl2YM2eOKSRIfb1t2zaxFnjpsk7MugQMmxyPoZoEg+ako7nRGAcfaF1t27YQWCwW8Zq8QSeol5W69hGf/YHGG4marhihGS8dFL7pppvg9vvf/16cvEuL4cuXrxBZFU0jjDJAr8UCLVNxd3cXe/qvvvpKTDHNcgcckiCtVRmlj2kPSf33zvTpYkmEDiZ0Z9uEWSVIO8nPPvvM8BKk/qflEYpn2vl89dVapKRZ0H6kEFOCQjHENxUPT0lB5iFjzc6StexvzpwvhDeWLl2GvXv3GnoMkrjpHMGjR4+KqTtdUfS9730PbnSyIGUCNBWiARAdFW34oKH2kbipvXRofumypSLjMosEKRWnBWUjrWGSkENDQ8U0mDKSS0+TMqsEy8rKxNFuCn4jQ/GcmJh4STwvR3rcXmyduxsPeMbB3ScF0xfnaPFtvHFJJ9BTu0mAZsi4L4XWBf/1X//VfmCkOyPpnv6YCTOdH0i0NLeg1MBTBkeYUYK0Yz+tr2maiUZ9DLYeK8UrfuG41z8DT75twZETZ8X7RoN25LQ0ZSZoueHEiRNiuYqmxEKClEFRBQW5UU7buBFoQZbWJMy0B6KDDXRgxCxZK2FGCVJs0H3ujH7GwKXQGPyGjtC3NmH9zG0Y5p2EwZ5J+OKrXG3ObMxslg6gUhZrpjFIB2+Sk1NEf4srRi6VIKW2ZhqcdDMCCnQzfQEUNGabOphVgnQwykwSpKt2DhXkoTjtMMZ4RYlTYp6dkYaSU+f0LYyHXSjJppOgxcK311cG315fDma8vX5zWxvyYvdi2Udh4sTood7J+Cr0qF5rTEgo/IwRhbAE5cASlENXVwc2zw7GnyeEwz0gHePeS8WpCmOvt7EEFcMSlANLUA6201WY5r8FQ/zTcb9vIvYkyn96XG9hCSqGJSgHlqAMbEhbvw+PTY7GYB8LJn6SjiaDnBh9PViCimEJyoEl6Ho6qs8gYGo4BvumYkRAMhIzzHEaFUtQMSxBObAEXUxXJ2JXRmLE5H1aFpiKNxfl4IJJxiFLUDEsQTmwBF3LuYLjeNV7F4YEpOOJoGRkHrh4Q1ujwxJUDEtQDixBF6JlgdsWRWO4ZwKGeCfj02B67rA5bmNHsAQVwxKUA0vQdZRmHsa4ybsxVMsCH/KOwe4w8/QxwRJUDEtQDixBF3GhA8tn79EywBQM90/FZyvTsT/LPE/0I1iCimEJyoEl6BpKEvfjr54R4lZZY99Nw5FjFcg/bPy7M18KS1AxLEE5sASdj7X+HD6eqWWBPim4zycR63YeRkdrE/bvN88D7gmWoGJYgnJgCTqfvL37MWriHrj7p2HCxxloqG9Fe2sLsrPtjzgwCyxBxbAE5cASdC5tFVV4+81dQoDDvOOwI6pQvN/c3NTznBezwBJUDEtQDixB55IUkoYHveLg7puKKeK5IfYbqdIYZAm6HpagYliCcjCqBJuPnoRvULh4etxDfklITL/4QDOWoBxYgophCcrBmBK0YkdwEoZPjBVPj5u+MAOd7e16HUtQFixBxbAE5WBECTYcLsSEgAhxedyoKUnIPnhKr7HDEpQDS1AxLEE5GE6C5zuwdl4kPLyT4O6djA+WZWtvXf48H5agHFiCimEJysFoEizffxRP+0WLtcC/vZWEo8eufhIeS1AOLEHFsATlYCQJWpua8eUHYfDwShTPEF789QHAdvX3zxKUA0tQMSxBORhJggWxOXhicpR4bsgL05NQXub4GcIsQTmwBBVjdAnm5OSIZzlfKg+WYN/pqq3DR+/s0jJAC4b7JmJzWIH2ruNbZbEE5cASVIxRJdjW1ob4+Hg88sgj+OSTT2CzXRyoLMG+YwnPxgjPGHFi9PiZKTh75tpPj2MJyuEqCdJ/KOBbW1uRnZ19WfAbnaamJiFuM1FbW4u4uDj9lXE4duwY1q1bh5kzZ2LFihWXxcGRI0cwevRoZGVl6e8Yn6bGJuXt7aypxdQ3dmOIXxpGBKYgOqlIr3EMjUHKxM1E90PuzQS1OSMjQ/T3oEGD4HbXXXfh+PHjyM/Px+7du3HixAmUlpaiuLjY0IXamJeXh507d+LkyZMoKSlxuJ2RCrV5//792Lhxo+hnFW0uKioSIr4SCgwSX1RUFFatWoWamhqxfWVlJWJjYzFy5EgRHxUVFVf9TaOVsrIytbFRUozqsmLsXhmLBybFYKgmwVfficah3MM4VeZ4bFFs0BgMDw8XP5shnqmfKZ5DQkJEP5vBG91t3rFjh5jhDBw4EG4DBgzA3r17ERERgcWLF4upGk2LKFsxcklISEBYWBgWLVokBqmjbYxWqM3U+V988YWSfqZ+on+XApYkt2nTJgQHB4sskJYWmpubhejWrFmjvXdUbEvrg2vXrsWQIUO0+FgiXjv620YqiYmJIjYWLlyImJgY6f2cmJKE6LWb8bzXLnhMycSowCSs3RCD5ORrxym1kcbgsmXLxM9mGIPUzxTP8+bNN403uttMsUE7nDvuuOPimiBNLWn6YKY1wfr6erHuY7b1CBqYqttM0qOsj6RHe/BuKEBoOnxp+yhDoTVBmkKYhfpz9aK9atYEz2Pb6mQM94zHUJ8UvEOXx7W16XXXhsYgLUmZCdqZpqRYTDcGaQpP/d1zYIQ+QLcEzfRhuiVohNMgbpRuCRq1zZQdLliw4DsjQavVqr8jj4qCUjzvF4UhARkYHRSP7P3Fes31MasErzybwOhQm6+SIB8dlofRT5GhqfGBAwcukwcfHe4F59uxalEcPLyT4eGTjPlrvoHtwo2NKT46LIerjg6zBOXCJ0vLQZUECxMP4C/ee+Hul4a/TYnBsYLLb5JwPViCcmAJKoYlKAclEuxox5w5CXD3TsJwnySsCcmDzXrj/z5LUA4sQcWwBOWgQoI5e3PwuNc+kQW+9G4iKiscXx53LViCcmAJKoYlKAfZEjxf34C3ZkSLE6Mf8EnAll05gK13/zZLUA4sQcWwBOUgV4JWWHZl4GHvOHGNsNcHiag/W6/X3TgsQTmwBBXDEpSDTAk2VJyG55tR4iHqD/kmIGKf/elxvYUlKAeWoGJYgnKQJ0Ebwjal4z6veAz1teDNLyxoarA/Pa63sATlwBJUDEtQDrIkWFNYipe8w8UzhB/1j0dy2jHt3b7dhIQlKAeWoGJYgnKQIkHrBaxdkwYPnyTx7JCPF6agq+Pi0+N6C0tQDixBxbAE5SBDgqUHTuAZ30gM1bLA0W8k4tDhcr2mb7AE5cASVAxLUA4ul+D5Tsyfn4QhXskY5p2IBWsy0dV5+dPjegtLUA4sQcWwBOXgagkWpuRjjO9euPunY+xbsTh5vH9ZIMESlANLUDEsQTm4UoJdDQ14/8NYDPFOwX3eCVi1MatXl8ddC5agHFiCimEJysGVEsyKP4yHvWPEWuCr78SiqrxGr+kfLEE5sAQVwxKUg6sk2HKmDlOmR2OoXyru17LALbsOaO8657k8LEE5sAQVwxKUg6skuCckS5wY7e5rgfesGNRVn9Fr+g9LUA4sQcWwBOXgCgm2llfDR5v+0uVxI33jsTeOniHsPFiCcmAJKoYlKAenS9DahY1r0jDUMwEefhZM/SQOLX28PO5asATlwBJUDEtQDs6W4NmSajwXtE+cEvNEQDwyvzmhvevcZ3SzBOXAElQMS1AOTpVgRztWLozFMO8kDNXKrLkJN/T0uN7CEpQDS1AxLEE5OFOCJw8WYbR/rLhJwl+n7MPB7KN6jXNhCcqBJagYlqAcnCVBa1sL5s+LE88PppskfLk6HTYXfXcsQTmwBBXDEpSDsySYnXQEIz33wiMgHc9M3YeCwyV6jfNhCcqBJagYlqAcnCFBa3Mj3p+dAHdf+4nRa9dnAF2uGx8sQTmwBBXDEpSDMyQYG7ofD07eKy6Pe/ntfSgvrtJrXANLUA4sQcWwBOXQXwm21TfBd1YSBvul4mHfOGzdQXKy2itdBEtQDixBxbAE5dBfCe5cn4oHPWPhrknQ+6MknDtzTq9xHSxBObAEFcMSlEN/JHi6pBrjptgfov6Y117sCd+v17gWlqAcWIKKYQnKoc8S7DqPzRsy4OFtvzzu3U9j0FTX+2cI9wWWoBxYgophCcqhrxI8kV+BJ333wSMwHaO8opCcmK/XuB6WoBxYgophCcqhrxJcuDwNQ3xSMNw3GR/Oi0WrNi5kwRKUA0tQMSxBOfRegjYUfHMco/1jMNQvDU/678WBb+gZwvJgCcqBJagYlqAceivBC22tePfzZNzrk4r7fRKwcGEszrf3/RnCfYElKAeWoGKMLMHy8nJkZGSgoqJCf8fO34ME8zJO4BGfOHFi9Atvx+Jogesuj7sWLEE5sAQVY0QJ2mw2WCwWvP/++/joo49Eyc+/eEDguy7B9roG+L4Xa788zjMWq9ckA1b53w9LUA4OJUgfoKmpCVlZWab6MPX19UKCvV38Vgl9ASRBI7W5o6MDc+fORXxCvHi9Z88eLF26tKeN3RKkLNEs1J+rF+21Wr/9Ko990fni2mAP/1R4vrsXlcX9f4ZwX6AxmJ2drb8yBzU1NWIHaqYxSG0mb1B/X5YJNjXaJdidCVJ2YORCUCZIe/tucTvazkiFOH3mNGJiYpT385W0trb2vL9z504EBwf3CISywksleOXfMlohbiQ2iLrSSkycTvcKTMdDWha4IySLtna4vSsLcaUEHW1npELQTp0kaKYxSG0mCfZkggMGDBCZSWRkpNj7x8bGIiEhAXFxcYYuiYmJCA8Px+LFi8Xr+Pj4q7YxWqE2k2DmzJkjRKiizfTvHj9+XGR/tAZYWloqgqG5uVkESGFhoZgOFxcVITc3V0x1NmzYAHd3dyxZsgRpqWkO/66RSlJSEsLCwkRsUDw76md6Ly0lAZ/Pj8Jwn2TcH5iG1wJ2IDQkFEnJiVdt7+pCsUEZ+LJly8T4M0M8Uz/v2rULCxYsMI03qM00BhcuXIiIiAjccccdcBs4cCBKSkpw7Ngx8WZZWRkqKyvF4riRS1VVFY4cOSKC/dSpU6Zpc25uHjZv3qysn0l8JDz692fOnImpU6f2rENRxjdv3jzs32+/TIymDdXV1WKAjhw5Uux0aC/q6O8aqXTHBrX3WrFRXV2Fg0mZGOsbAY/ADDzqG4eI0EzUnK5CReXl28oo1GYag1FaMmKGWKZCsXHo0CEhQrN4g9qcl5eH0NBQHD16FHfffTfcKB2kaU9LS4tIxW9kDcUodB/M6U5zzcDZs2fFXlN1m7u/cxIiTc2pTZMnTxYBTQcVaGrWDQll9OjRYrnELDQ2NH5re5euzICHVxKG+aZg2odRaKyp02vUQEsSB3Jy9FfmoLa2VkwtzTQGqc20tEPxP2jQID46LBsjHh2mqfG0adPw4IMPwtPTE8+/8Dw2rF9/1YGR79LR4dIj5XjqjUS4B2TgSd9oZKQc1mvUQWOQjw67HmoznyKjECNKkLJCOtJOUzKa1tDySF1dXc/e/bsmwQudnfh4TqJ4bsgw70R8PC8eHS32NVGVsATlwBJUDF8xIofrSTAnsxgP+8bDwz8NYwP2ICerQK9RC0tQDixBxbAE5XAtCbY3NOGdT7VpMN0kQcsCl6xIgvWCMWKeJSgHlqBiWIJyuJYE98UdxX2a/IYHpOEl3904kntSr1EPS1AOLEHFsATl4EiCHc2t8J+lZYF+aXjIJx7r1yWjq1PuTRKuB0tQDixBxbAE5XC1BG3YvjMX93vFw8PXgglvRKC86PIbRaiGJSgHlqBiWIJyuFKCdZW1eGV6Atz90/Co1z6EbEiEzXr5VFk1LEE5sAQVwxKUQ7cErTarlgR2Yf2m/fDwTsJw3xQEvReJs9U1+pbGgSUoB5agYliCcuiWIFF64gyeCtKmwYHpeGJSBPbuphtBGO8KB5agHFiCimEJyoEkmKHFMy6cx+I12RhKWaBfCmbMjsE5xZfHXQuWoBxYgophCcqBYuNAzjfYn34UfwmIw9CAdIyZFI7U2IP6FsaDJSgHlqBiWIJyaGxsQEZiEt6fnwp3v1Q86JOIj2fvQYsW50aFJSgHlqBiWIJyaG9pwLoV4XjYJx7DAtPxrF8kctKMcXnctWAJyoElqBiWoBwaa+vh9V4Mhvpa8IBXLBZ8GY3O1la91piwBOXAElQMS1AGVuyLPIyHfBLEEeHxgeEoOCD3GcJ9gSUoB5agYliCrqeupgGvvZsoHp/5sOc+rFkZB2tnp15rXFiCcmAJKoYl6Hq27T6E4T5JuM8/FV5vhqLkWKleY2xYgnJgCSqGJehayovP4PmpcRjql4pHvGOwY7PFcJfHXQuWoBxYgophCboQWxdWrt8Pd+9k3OeXgqlv70ZlibFuknA9WIJyYAkqhiXoOk4WVuKpwFh4BGZi1MQwbAyO0mvMAUtQDixBxbAEXUTXBXy8XMsCfVIwwj8ZvoEbEBMVo1eaA5agHFiCimEJuoac7BKM8ouDR0A6xgZEIXTLPmRmZZjuEbIsQdfDElQMS9D5dDa1YNqcVAzRssAHveLw2aeRKC8pQ3b2N7hwxe31jQxLUA4sQcWwBJ1PUvJJPOSbKC6Pe8FrB75JykNjUwMytPZe+YwRI8MSlANLUDEsQefS0tgK749SMdTPgoe0LJAujzvf3q7Fc4NoL0vQtbAEFcMSlIORJbgz4jCGeyeIp8e95rcdh7LtN0mg2GAJuh6WoGJYgnIwqgRrq8/htfdTxOVxj3hGY+2qWHRoWSBx9YOWjA9LUA4sQcWwBPvH/sJzyDpyDhfOX8D6zQfg7pOM+/wt8A3YhuKCi88QZgnKgSWoGJagHIwkwRWhxXg4KBVvLMjBX9+24P7ANPx58h5sXhev9enF2GUJyoElqBiWoByMJMHVe0rEZXEeWgb4YKAmQf8UBE0PR82pSn0LOyxBObAEFcMSlIOhMsGwYgzzTcaIKakYqWWEDwam4JlpyQiOKMKZOvt6IMESlANLUDEsQTkYSYJLdhVdIUGLuFTupY+zkXu8Xt+KJSgLlqBiWIJyMJIE528/KR6iPkITIB0QeUCbDn++6Shq6jv0LeywBOXAElQMS1AOhpFgRxu+mJuIIb4Wcdv8Z6ZbEJVWAZvt6gepswTlwBJUDEvQebS3t2Pz5s146623sHPnTnRecjt6w0hwwzrM+Mun8JiSjgmvbUB8YqFecTUsQTmwBBXDEnQOdKeV9evXY/bs2cjPz8cXX3yB6OhovdYgEmxqhO2Pf8Dy/3kZy+4dj+i356Ch7fIp8KWwBOXwnZAg/Ydoa2vD/v37xc9mobm5GVlZWforc1BXV4f4+Hj9lTEgCdLgKykpQVNTExYsWIDw8HC9FigsLMSYMWOUDlDbokWwff8HaPvezSgceC8OHSzSaxzT3NRsOqHQGDxw4ID+yhxQIqJ8htBLqM2U8FF/Dxo0CG533XUXjh8/LjKA0NBQnDhxAqWlpWJAGLmUlZUhLy8Pu3btQnFxscNtjFaozTk5Odi4cSNOnjwpvZ+pn4qKilBbW6uHw+W0tLRg/vz5CHrjDRwtPCqmyBUVFYiNjcWIESPENLm8vNzh33ZVKaqsRHX2ftgG3AG4uaFBk+CmgM9xuLgUZafKHP7OKe393Nw80V76vGaJZxqDYWFhor1maPOpU6dEPIeEhJimn7vbvGPHDtHfAwcOhNudd94p0lnKTlavXg2LxYKMjAxhdyMXMnlMTAxWrlwpUltH2xitUJsjIyNFpqWin2npgPqKAqFSk8vixYvF1Dc3NxcdHR1i6tjQ0CD6ddGixWJgHjp0SKwVDh06VOvrVWK24Ohvu6Ro/WPRMqOjr7wqBEgl5d5R2BVpQWZ2luPf0QrNDvbt26u1d4X4vGaJZ9rZBAcHi/aaoc3UzxTPy5YtM403utu8YsUK0d/kv541QZoG0QZmWhOsr68XH8xs6xEkGdVtpmyQsmjaix85cgRr165FQYH9Diy0Bvjhhx+gpqZGvKY9Jq0JZmRkitcysRUcAW67TQjw7A//F/bN34A2ve560JSH2mumNcFmbQyabUmKYoR2NGYbg+SNyw6M0AfolqCZPky3BM0U6N0SNFqbExIS8Nlns7Fw4UKRISYlJfbcmv6iBDPEa6n4+QsBdmkl/rEXUFDmeCp/JfXn6kV7zXR7fRqD2dnZ+itzQBKkLNBMY5DaTLMi6m8+OqwAI58nSNMDWhNMTEy87Nw7VUeHbZrEbLfcIiRY8dNbEbduD250qPHRYTl8J44OswTlwidL3yBaBmcbO1YI8LxWIv/mg+IzTXrlt8MSlANLUDEsQTmokKAtPgG2n/xESPD47XcgMSrzhrNAgiUoB5agYliCcpAtQVuTlvENHy4E2OF2E/aMn47qpmufGO0IlqAcWIKKYQnKQbYErSHbgZtuEhI8eMf/IDYuV6+5cViCcmAJKoYlKAepEjx7FrY//EEIsM3t+4ieMhu1bb2PSZagHFiCimEJykGmBG3z5gsBUkm5ZxgSMo/rNb2DJSgHlqBiWIJykCVBW2UVbAPvFgJsuOlmhH+0Guc6+iYxlqAcWIKKYQnKQZYErW+80ZMFJriPRk7+Kb2m97AE5cASVAxLUA4yJGgrKoLtF/8iBFj1Dz9HyJdb0dKPiz1YgnJgCSqGJSgHKRJ87TUhQJtWEkc8i6Pl5/SavsESlANLUDEsQTm4WoLi8rjuE6Nv+RW2rduH/kYhS1AOLEHFsATl4EoJ2jo7YR03rmctMPpvXjh66sZuknA9WIJyYAkqhiUoB5dKcOeuHgEe+pe7ELkjGVc/Nqn3sATlwBJUDEtQDi6T4PkLsD38sBBgp9tN2DZ+Bk6cbdEr+wdLUA4sQcWwBOXgKglaly4VB0JIgnm/+i3iYnL0mv7DEpQDS1AxLEE5uESCDQ2waQFIAmz43o+w+Y0vcbq5dzdJuB4sQTmwBBXDEpSDKyRomzOnZy0w655hSEq79jOE+wJLUA4sQcWwBOXgbAnaioth+8UvhABP/+gfsfXDYDSed8bhkIuwBOXAElQMS1AOTpfgjBk9WWCc+2hk5FfoNc6DJSgHlqBiWIJycKYEbdog735uSOVPb0Pol1vRet75D0NiCcqBJagYlqAcnClB64QJQoB0VHj3qAnIPnFGr3EuLEE5sAQVwxKUg7MkaNMGi+0f/1FIsOyf/gVha/ago8u5a4HdsATlwBJUDEtQDs6QoE2LK+tjjwsBdmrl67FBKCyv02udD0tQDixBxbAE5eCUTDAyEvjRj4UED//LXQjbmYpOq2uyQIIlKAeWoGJYgnLotwS178n2pz8JATa7fR/bJ8xA6dlmvdI1sATlwBJUDEtQDv2VoO2rr3ouj8v6z3sRHnfIKTdJuB4sQTmwBBXDEpRDfyRoKy2D7W77c0Pa3G7CrqnzcLalU691HSxBObAEFcMSlEO/JPjRR0KAVGJ+NwJxqc69PO5asATlwBJUDEtQDn2WYEkJbAMGCAHW/vCn2PzhGpyRkAUSLEE5sAQVwxKUQ18laPPyFgK0aiV68GikHyrXa1wPS1AOLEHFsATlcKMStFHml2UfxDbtd3DrrUKCZT+9HevmhaCxQ95nZgnKgSWoGJagHG5Ygtrnst3+C9g8vWD7y2ghwAtuNyHssVdw4Fi1vpUcWIJyYAkqhiUohxueDu/ZI8R3aTl82x3YsikRclYCL8ISlANLUDEsQedD0qioqEBbW5v+Ti8ywZCQqyR49sc/Q+V7nwClJfpWcmAJyoElqBiWoPNJSEjAM2PHouhkkf5OLyS4Zs1VEuwu1uXL9a3kwBKUw3dGgvQBmpqakJWVZaoPU19fb7pApy8gJibGkG2ura3FBx98iDFPPomi4osSzM/PFxLMyMjQ33GMbfHiqwVIp8h89RXQ4pynyN0o9efqRXutVuffq9BV0BjMzs7WX5mDmpoaWCwWU41BajMlT9TfPRLs6OhAQ0ODCJpOehi2FjhmKHV1dcLoZmpzdXU19u7dq7X5vMN6GcVmc3zRWkREBFasWIFp06bh5MmTYjva/tChQ0KCFDhX/q3LysfatFeXH50W0/LI4+g6bL9EjorD33FRqautE+2lmY2jeiMWGoOUiDiqM2qhmU1ycrKp+rlaazOJm/pbSPDOO+8U6Wx8fDxWrVolKkmGlGEZuVCwUEa1cuVK8doMbablhsjISCxcuFDIW3abSQr0/ZaVlYk1v8LCQiE4CobS0lIkJCairLQMs2bNQmVlJRq193NycrBlyxZ4eHhg9erV4rWjv205cADVL70sBNjwo58gcuTz2LsnDpmH8pAu+XPaY2OfiA0V/dyXQrERFxeH4OBgU7SXCvVzVFQUli5dqsWWOfqZ2kxjkHb21N/kP7ff/OY3IqOqqqpCojYIaJ2tublZpIpGLtTG8vJy8UFoEDvaxmiF2lxcXIzw8HBtKn/O4TauLrQOQhledXUVZsyYgalTpwo5Llq0CEuWLMHGjRsxZswYsW5JkCxpnerxxx8XO0p67fDvtrfDOnkSTvzyHnz+4ufYZzmK5vYOh9u6urS0UGycssdGfb3DbYxWKDboO0lOTnJYb8TS0tKCkpISESu0NGUGb1CbaQzGxcWKHf1vf/tbuN16663w8/ODl5cXxo0bJ34ODAxEQECA4YunpyfGjh0r2uyo3ohl0qRJeOqpp+Dv76+sn6m/PD0n44UXXsCLL76IV155BQMGDMDNN98sipuWzf3617/G5MmTERQUJLah+mefffaabab3vf90L4bccS/uHvJXjB//utI4otig9lI/O6o3XtH6z9sbzz33nGnGHxWK52eeeUZpPPemUBupzeQNct5tt91G8e72vFbe1EoQFy5cuPwdFfIe+Y9hGIZhGIZhGIZhGIZhGIZhGIZhGIZhGIZhvru4uf1/GoCzqSepwtIAAAAASUVORK5CYII=)
The system of an equation has infinitely many solutions when the lines are coincident, and they have the same y-intercept.
Identify the number of solutions does this system of equations have
![](data:image/png;base64,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)
The system of an equation has infinitely many solutions when the lines are coincident, and they have the same y-intercept.
Identify the number of solutions does this system of equations have
![](data:image/png;base64,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)
The system of an equation has infinitely many solutions when the lines are coincident, and they have the same y-intercept.
Solve the system of equations by graphing.
![open curly brackets table attributes columnalign left end attributes row cell 3 x minus y equals negative 4 end cell row cell 2 y equals 6 x plus 2 end cell end table close](data:image/png;base64,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)
An equation with no solution is one that is never true, regardless of which values we choose for the variables in the equation.
Solve the system of equations by graphing.
![open curly brackets table attributes columnalign left end attributes row cell 3 x minus y equals negative 4 end cell row cell 2 y equals 6 x plus 2 end cell end table close](data:image/png;base64,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)
An equation with no solution is one that is never true, regardless of which values we choose for the variables in the equation.