Irina wants to build a fence around a rectangular vegetable garden so that it has a width of at least 10 feet. She can use a maximum of 150 feet of
fencing. The system of inequalities that models the possible lengths, l, and widths, w, of her garden is shown.

w ≥ 10

2l + 2w ≤ 150

a = 20 ft; w = 5 ft

b= 20 ft; w = 10 ft

c = 60 ft; w = 20 ft

d = 55 ft; w = 30 ft

In option a, w < 10
in option b, w = 10 and 2(20) + 2(10) = 40 + 20 = 60 < 150
in option c, w > 10 but 2(60) + 2(20) = 120 + 40 = 160 > 150
In option d, w > 10 but 2(55) + 2(30) = 110 + 60 = 170 > 150

Therefore the corect answer is option b.

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RenatoMattice RenatoMattice · Answer 2 · 2019-02-14T07:11:11+01:00

Answer: Only Option 2 is correct.

Step-by-step explanation:

Since we have given that

Rectangular vegetable garden has width of at least 10 feet i.e.

[tex]w\geq 10[/tex]

She can use a maximum of 150 feet of fencing.

i.e.

[tex]Perimeter\leq 150\\\\2(l+w)\leq 150\\\\2l+2w\leq 150[/tex]

So, Option 1 get rejected as it has w = 5 which less than 1. But width has at least 10 feet.

Option 2) b= 20 ft; w = 10 ft

[tex]\\\\2\times 20+2\times 10\leq 150\\\\40+20\leq 150\\\\60\leq 150\\\\True.[/tex]

Option 3) c = 60 ft; w = 20 ft

[tex]\\\\2\times 60+2\times 20\leq 150\\\\120+40\leq 150\\\\160>150\\\\False.[/tex]

Option 4) d = 55 ft; w = 30 ft

[tex]\\\\2\times 55+2\times 30\leq 150\\\\110+60\leq 150\\\\170>150\\\\False.[/tex]

Hence, only Option 2 is correct.