Linear inequations of two variables
A company makes two hat models: Bae and Viz. The manufacture of every Bae model needs $2$ hours to manufacture, while that of the model Viz needs $3$ hours. The manufacturing section of molded has a $1500$ hour a month maximum. Determine the region of validity of the inequation (and to draw it).
a) Identify the variables.
b) Express the restriction as an inequation of the variables.
c) Give the expression of the straight line associated with the restriction (and draw it).
a) $x=$ number of hats Bae. $\ y=$ number of hats Viz.
b) $2\cdot x+3\cdot y \leqslant 1500$
c) $2\cdot x+3\cdot y=1500 \Rightarrow 3\cdot y=-2\cdot x +1500 \Rightarrow y=-\dfrac{2}{3}\cdot x +500$
Trying point $(x=0,y=0)$ eit is seen that the inequation is satisfied: $ 2\cdot 0+3\cdot 0 \leqslant 1500 $. Therefore the validity region is the semiplane below the straight line.
The validity region is the semiplane below the straight line.
An wine-producing industry produces wine and vinegar. Twice the production of wine is always smaller than or equal to than the vinegar production plus four units. Determine the region of validity of the inequation (and to draw it).
a) Identify the variables.
b) Express the restriction as an inequation of the variables.
c) Give the expression of the straight line associated with the restriction (and draw it).
a) $x=$ production of wine. $\ y=$ production of vinegar.
b) $2\cdot x \leqslant y+4 \Rightarrow 2\cdot x-y \leqslant 4$
c) $2\cdot x=y+4 \Rightarrow y=2x-4$
Trying point $(x=0,y=0)$ it is seen that the inequation is satisfied: $2\cdot 0-0 \leqslant 4$. Therefore the validity region is the semiplane over the straight line.
The validity region is the semiplane over the straight line.