Question

in exercises 1–4, find the sum of the measures of the interior angles of the indicated convex polygon. (see example 1.)

1. nonagon 2. 14 - gon 3. 16 - gon 4. 20 - gon

in exercises 5–8, the sum of the measures of the interior angles of a convex polygon is given. classify the polygon by the number of sides. (see example 2.)

1. 720° 6. 1080° 7. 2520° 8. 3240°

in exercises 9–14, find the value of x. (see example 3.)

1. quadrilateral with angles 100°, 130°, 66°, x° 10. quadrilateral with angles 103°, 133°, 58°, x°
2. pentagon with angles x°, 154°, 88°, 29° 12. quadrilateral with angles x°, 92°, 101°, 68°
3. hexagon with angles 102°, 146°, 120°, 124°, 158°, x° 14. pentagon with angles 86°, 140°, 138°, 59°, x°

Explanation:

Exercise 1: Nonagon

Step 1: Recall the formula for the sum of interior angles of a convex polygon.

The formula is \( S = (n - 2) \times 180^\circ \), where \( n \) is the number of sides. A nonagon has \( n = 9 \) sides.

Step 2: Substitute \( n = 9 \) into the formula.

\( S = (9 - 2) \times 180^\circ = 7 \times 180^\circ \)

Step 3: Calculate the result.

\( 7 \times 180^\circ = 1260^\circ \)

Step 1: Use the formula \( S = (n - 2) \times 180^\circ \) with \( n = 14 \).

Step 2: Substitute \( n = 14 \).

\( S = (14 - 2) \times 180^\circ = 12 \times 180^\circ \)

Step 3: Compute the product.

\( 12 \times 180^\circ = 2160^\circ \)

Step 1: Apply the formula \( S = (n - 2) \times 180^\circ \) with \( n = 16 \).

Step 2: Substitute \( n = 16 \).

\( S = (16 - 2) \times 180^\circ = 14 \times 180^\circ \)

Step 3: Calculate.

\( 14 \times 180^\circ = 2520^\circ \)

Answer:

The sum of the interior angles of a nonagon is \( 1260^\circ \).

Exercise 2: 14 - gon