Answer:
[tex]x + y \leq 35\\\\100x + 60y\leq2100\\\\x\geq 0\\\\y\geq 0[/tex]
Step-by-step explanation:
Call x the amount of blinds that Manny buys.
Let's call and the amount of curtains that Manny buys
There are only 35 windows, so the number of curtains and windows can not be greater than 35.
[tex]x + y \leq 35\\x\geq 0\\y\geq 0[/tex]
Manny can only spend $ 2100
Then we can represent this by an inequality in the following way.
[tex]100x \leq 2100[/tex]
and
[tex]60y\leq 2100[/tex]
We can write this as a single inequality:
[tex]100x +60y \leq2100[/tex]
Finally, the set of inequalities to model this problem is:
[tex]x + y \leq 35\\\\100x + 60y\leq2100\\\\x\geq 0\\\\y\geq 0[/tex]
