QUESTION IMAGE
Question
find the area of each figure.
1.
2.
3.
4.
5.
6.
find the area of the shaded region in each figure.
- yard with a sandbox
yard – 15 ft by 20 ft
sandbox – 6 ft by 7 ft
- wall with windows
wall – 8 ft by 16 ft
each window – 5 ft by 4 ft
- sidewalk around pool
sidewalk – 30 ft by 30 ft
pool – 27 ft by 27 ft
- a bedroom is 15 ft long and 12 ft wide. how much will it cost to carpet the room if carpeting costs $22 per square yard? (1 yd = 3 ft)
- a rose garden in the city park is rectangular and is 9 m wide. if the area of the rectangle is 144 m², what is the length of the garden?
Step1: Calculate area of rectangle
$A_1 = 6 \times 4 = 24$ $\text{m}^2$
Step2: Split into 2 rectangles, calculate sum
$A_2 = (6 \times 4) + (2 \times 2) = 24 + 4 = 28$ $\text{m}^2$
Step3: Subtract cutout from big rectangle
$A_3 = (6 \times 4) - (3 \times 2) = 24 - 6 = 18$ $\text{m}^2$
Step4: Split into 2 rectangles, calculate sum
$A_4 = (8 \times 6) + (5 \times (10-6)) = 48 + 20 = 68$ $\text{in}^2$
Step5: Split into 2 rectangles, calculate sum
$A_5 = (12 \times 7) + (7 \times (12-7)) = 84 + 35 = 119$ $\text{in}^2$
Step6: Split into 2 rectangles, calculate sum
$A_6 = (18 \times 5) + (9 \times (10-5)) = 90 + 45 = 135$ $\text{cm}^2$
Step7: Subtract sandbox from yard
$A_7 = (15 \times 20) - (6 \times 7) = 300 - 42 = 258$ $\text{ft}^2$
Step8: Subtract 2 windows from wall
$A_8 = (8 \times 16) - 2\times(5 \times 4) = 128 - 40 = 88$ $\text{ft}^2$
Step9: Subtract pool from sidewalk area
$A_9 = (30 \times 30) - (27 \times 27) = 900 - 729 = 171$ $\text{ft}^2$
Step10: Find area, convert to yards, calculate cost
Room area: $15 \times 12 = 180$ $\text{ft}^2$
Convert to yards: $\frac{180}{9} = 20$ $\text{yd}^2$
Total cost: $20 \times 22 = 440$ dollars
Step11: Solve for length using area formula
Length $l = \frac{144}{9} = 16$ $\text{m}$
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