1 Answer

Luke Dunstan · Answer 1 · 2023-01-09T16:26:22+0000

Given:

$\begin{gathered} y\leq(1)/(4)x+3 \\ y\ge-x+5 \end{gathered}$

For the given inequality,

$\begin{gathered} y\leq(1)/(4)x+3 \\ \text{for x=0}\Rightarrow y=3 \end{gathered}$

So, this inequality contains all the points below point (0,3). that means it contains region D and C

$\begin{gathered} y\ge-x+5 \\ \text{for x=0}\Rightarrow y=5 \end{gathered}$

This inequality contains all the points above (0,5) and it will include the region B and C.

From above discussion, region C is common in both the inequalities.

Answer: option B)

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