QUESTION IMAGE
Question
find the area of each polygon.
- square with side 8 m
- rectangle with length 12 in and width 7 in
find the value of x in each polygon.
- rectangle with height 2 m and area 16 m², solving for x (length)
- square with area 144 ft², solving for x (side)
find the area of each parallelogram.
- parallelogram with base 5 yd and height 10 yd
- parallelogram with base 12 in and height 6 in
the area of each parallelogram is 120 ft². find the value of x in each parallelogram.
- parallelogram with height 12 ft, solving for x (base)
- parallelogram with height 6 ft, solving for x (base)
- parallelogram with base 8 ft, solving for x (height)
Problem 1: Find the area of the square (8 m side)
Step1: Identify the formula for square area
The area of a square is given by \( A = s^2 \), where \( s \) is the side length.
Step2: Substitute the side length
Here, \( s = 8 \, \text{m} \), so \( A = 8^2 \).
Step3: Calculate the result
\( 8^2 = 64 \).
Step1: Recall the rectangle area formula
The area of a rectangle is \( A = l \times w \), where \( l \) is length and \( w \) is width.
Step2: Substitute the values
Here, \( l = 12 \, \text{in} \) and \( w = 7 \, \text{in} \), so \( A = 12 \times 7 \).
Step3: Compute the product
\( 12 \times 7 = 84 \).
Step1: Use the rectangle area formula
\( A = l \times w \), so \( l = \frac{A}{w} \) (where \( l = x \), \( A = 16 \), \( w = 2 \)).
Step2: Substitute the values
\( x = \frac{16}{2} \).
Step3: Perform the division
\( \frac{16}{2} = 8 \).
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The area of the square is \( 64 \, \text{m}^2 \).