For the constraint of a linear optimizing function $z={{x}_{1}}+{{x}_{2}}$ , given by ${{x}_{1}}+{{x}_{2}}\le 1,\ 3{{x}_{1}}+{{x}_{2}}\ge 3$ and ${{x}_{1}},\ {{x}_{2}}\ge 0$
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Linear Programming  ETEA Model Test MCQS  Part  II
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For the constraints of a L.P. problem given by ${{x}_{1}}+2{{x}_{2}}\le 2000$ , ${{x}_{1}}+{{x}_{2}}\le 1500$ , ${{x}_{2}}\le 600$ and ${{x}_{1}},\ {{x}_{2}}\ge 0$ , which one of the following points does not lie in the positive bounded region0(1000, 0)0%0(0, 500)0%0(2, 0)0%0(2000, 0)0%0
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If the number of available constraints is 3 and the number of parameters to be optimized is 4, then0The objective function can be optimized0%0The constraints are short in number0%0The solution is problem oriented0%0None of these0%0
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