angle) 1) 2) 3.8 in 6.1 ft .コ. 3 in 6 in 9.1 ft 3) 4) 11.6 yd S.2 ft 7 yd 7 fti 7.9 yd

Elementary Geometry For College Students, 7e
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ISBN:9781337614085
Author:Alexander, Daniel C.; Koeberlein, Geralyn M.
Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.
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### Finding the Area of Parallelograms

#### Part 1: Find the area of each parallelogram. 

The formula for the area of a parallelogram is given by \( A = bh \), where \( b \) is the base and \( h \) is the height. Make sure you are using the numbers that form the right angle.

1. **Parallelogram 1:**
   - Base (\( b \)): 6 inches
   - Height (\( h \)): 3 inches
   - Side: 3.8 inches

   ![Parallelogram 1](image1.png)
   
2. **Parallelogram 2:**
   - Base (\( b \)): 9.1 feet
   - Height (\( h \)): 6.1 feet 
   - Side: Not provided

   ![Parallelogram 2](image2.png)

3. **Parallelogram 3:**
   - Base (\( b \)): 9.1 feet
   - Height (\( h \)): 7 feet
   - Side: 8.2 feet

   ![Parallelogram 3](image3.png)

4. **Parallelogram 4:**
   - Base (\( b \)): 7.9 yards
   - Height (\( h \)): 7 yards
   - Side: 11.6 yards

   ![Parallelogram 4](image4.png)

5. **Parallelogram 5:**
   - Base (\( b \)): 6 feet
   - Height (\( h \)): 3.5 feet
   - Side: 5.7 feet

   ![Parallelogram 5](image5.png)

### Explanation of Graphs/Diagrams

Each diagram included above shows a parallelogram with the base (\( b \)) and height (\( h \)) clearly marked. The length of other sides of the parallelograms is provided for context, but for area calculation purposes, only the base and height measurements should be used. The right angle (formed between the base and the height) is indicated by a small square symbol. 

To find the area, multiply the base by the height:

\[ A = b \times h \]

Please ensure you match the correct base and height that form the
Transcribed Image Text:### Finding the Area of Parallelograms #### Part 1: Find the area of each parallelogram. The formula for the area of a parallelogram is given by \( A = bh \), where \( b \) is the base and \( h \) is the height. Make sure you are using the numbers that form the right angle. 1. **Parallelogram 1:** - Base (\( b \)): 6 inches - Height (\( h \)): 3 inches - Side: 3.8 inches ![Parallelogram 1](image1.png) 2. **Parallelogram 2:** - Base (\( b \)): 9.1 feet - Height (\( h \)): 6.1 feet - Side: Not provided ![Parallelogram 2](image2.png) 3. **Parallelogram 3:** - Base (\( b \)): 9.1 feet - Height (\( h \)): 7 feet - Side: 8.2 feet ![Parallelogram 3](image3.png) 4. **Parallelogram 4:** - Base (\( b \)): 7.9 yards - Height (\( h \)): 7 yards - Side: 11.6 yards ![Parallelogram 4](image4.png) 5. **Parallelogram 5:** - Base (\( b \)): 6 feet - Height (\( h \)): 3.5 feet - Side: 5.7 feet ![Parallelogram 5](image5.png) ### Explanation of Graphs/Diagrams Each diagram included above shows a parallelogram with the base (\( b \)) and height (\( h \)) clearly marked. The length of other sides of the parallelograms is provided for context, but for area calculation purposes, only the base and height measurements should be used. The right angle (formed between the base and the height) is indicated by a small square symbol. To find the area, multiply the base by the height: \[ A = b \times h \] Please ensure you match the correct base and height that form the
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