Angles in Quadrilaterals Worksheets - Free Printable
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Step-by-step solution for: Angles in Quadrilaterals Worksheets
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Show Answer Key & Explanations
Step-by-step solution for: Angles in Quadrilaterals Worksheets
To solve the problem of finding the value of \( x \) in each quadrilateral, we need to use the property that the sum of the interior angles of a quadrilateral is always 360 degrees. This property holds true for all types of quadrilaterals (e.g., squares, rectangles, parallelograms, trapezoids, etc.).
The general formula for the sum of the interior angles of a quadrilateral is:
\[
\text{Sum of interior angles} = 360^\circ
\]
We will apply this formula to each quadrilateral in the image and solve for \( x \).
---
#### Quadrilateral 1:
The given angles are:
- \( 90^\circ \)
- \( 120^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
90^\circ + 120^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 1:
\[
\boxed{80}
\]
---
#### Quadrilateral 2:
The given angles are:
- \( 110^\circ \)
- \( 80^\circ \)
- \( 90^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
110^\circ + 80^\circ + 90^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 2:
\[
\boxed{80}
\]
---
#### Quadrilateral 3:
The given angles are:
- \( 100^\circ \)
- \( 120^\circ \)
- \( 60^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
100^\circ + 120^\circ + 60^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 3:
\[
\boxed{80}
\]
---
#### Quadrilateral 4:
The given angles are:
- \( 130^\circ \)
- \( 90^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
130^\circ + 90^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
290^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 290^\circ = 70^\circ
\]
Answer for Quadrilateral 4:
\[
\boxed{70}
\]
---
#### Quadrilateral 5:
The given angles are:
- \( 140^\circ \)
- \( 100^\circ \)
- \( 60^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
140^\circ + 100^\circ + 60^\circ + x = 360^\circ
\]
Simplify:
\[
300^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 300^\circ = 60^\circ
\]
Answer for Quadrilateral 5:
\[
\boxed{60}
\]
---
#### Quadrilateral 6:
The given angles are:
- \( 150^\circ \)
- \( 90^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
150^\circ + 90^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
310^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 310^\circ = 50^\circ
\]
Answer for Quadrilateral 6:
\[
\boxed{50}
\]
---
\[
\boxed{80, 80, 80, 70, 60, 50}
\]
The general formula for the sum of the interior angles of a quadrilateral is:
\[
\text{Sum of interior angles} = 360^\circ
\]
We will apply this formula to each quadrilateral in the image and solve for \( x \).
---
Step-by-Step Solutions:
#### Quadrilateral 1:
The given angles are:
- \( 90^\circ \)
- \( 120^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
90^\circ + 120^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 1:
\[
\boxed{80}
\]
---
#### Quadrilateral 2:
The given angles are:
- \( 110^\circ \)
- \( 80^\circ \)
- \( 90^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
110^\circ + 80^\circ + 90^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 2:
\[
\boxed{80}
\]
---
#### Quadrilateral 3:
The given angles are:
- \( 100^\circ \)
- \( 120^\circ \)
- \( 60^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
100^\circ + 120^\circ + 60^\circ + x = 360^\circ
\]
Simplify:
\[
280^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 280^\circ = 80^\circ
\]
Answer for Quadrilateral 3:
\[
\boxed{80}
\]
---
#### Quadrilateral 4:
The given angles are:
- \( 130^\circ \)
- \( 90^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
130^\circ + 90^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
290^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 290^\circ = 70^\circ
\]
Answer for Quadrilateral 4:
\[
\boxed{70}
\]
---
#### Quadrilateral 5:
The given angles are:
- \( 140^\circ \)
- \( 100^\circ \)
- \( 60^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
140^\circ + 100^\circ + 60^\circ + x = 360^\circ
\]
Simplify:
\[
300^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 300^\circ = 60^\circ
\]
Answer for Quadrilateral 5:
\[
\boxed{60}
\]
---
#### Quadrilateral 6:
The given angles are:
- \( 150^\circ \)
- \( 90^\circ \)
- \( 70^\circ \)
- \( x \)
Using the sum of the interior angles:
\[
150^\circ + 90^\circ + 70^\circ + x = 360^\circ
\]
Simplify:
\[
310^\circ + x = 360^\circ
\]
Solve for \( x \):
\[
x = 360^\circ - 310^\circ = 50^\circ
\]
Answer for Quadrilateral 6:
\[
\boxed{50}
\]
---
Final Answers:
\[
\boxed{80, 80, 80, 70, 60, 50}
\]
Parent Tip: Review the logic above to help your child master the concept of quadrilateral angles worksheet.