Question

# The measure of angle X is ______.

Hint:

### opposite angles are equal in a parallelogram.

## The correct answer is:

### 83

In a parallelogram, opposite angles are equal .

Hence, angle X is equal to angle Z, which is equal to 83 degrees. Angle X = 83 degree.

In a parallelogram, opposite angles and sides are equal . in this case, angles W= Y and X = Z. also, WX = YZ and WZ = XY

### Related Questions to study

### The length of side CD is ________.

In a parallelogram, opposite angles and opposite sides are equal .

Given polygon is a parallelogram.

### The length of side CD is ________.

In a parallelogram, opposite angles and opposite sides are equal .

Given polygon is a parallelogram.

### The measure of angle K is _____.

the symmetry of the parallelogram can be a good tool to evaluate such angles and sides.

### The measure of angle K is _____.

the symmetry of the parallelogram can be a good tool to evaluate such angles and sides.

### The length of FG is ______.

Given polygon is a parallelogram.

Bisection means dividing into 2 equal parts in 1: 1 ratio.By property of parallelogram, we know that the diagonals of a parallelogram bisect each

### The length of FG is ______.

Given polygon is a parallelogram.

Bisection means dividing into 2 equal parts in 1: 1 ratio.By property of parallelogram, we know that the diagonals of a parallelogram bisect each

### The measure of is ________.

By angle sum property of a parallelogram, we know that sum of adjacent angles in a parallelogram = 180.

### The measure of is ________.

By angle sum property of a parallelogram, we know that sum of adjacent angles in a parallelogram = 180.

### The sum of the interior angles of a parallelogram is ______.

Sum of internal angles of a polygon =( n-2) x 180

sum of external angles of a polygon =360

### The sum of the interior angles of a parallelogram is ______.

Sum of internal angles of a polygon =( n-2) x 180

sum of external angles of a polygon =360

### The given polygon called as _____.

Nomenclature of polygons:

3 - triangle

4- qadrilateral

5- pentagon

6-hexa

7-septa

8-octa

9-nona

10-deca

and so on.

### The given polygon called as _____.

Nomenclature of polygons:

3 - triangle

4- qadrilateral

5- pentagon

6-hexa

7-septa

8-octa

9-nona

10-deca

and so on.

### Find the measure of x.

Bisection means to divide into 2 equal parts in the 1: 1 ratio. diagonals of a parallelogram bisect each other but not at right angles. a square is a special case of a parallelogram where the diagonals intersect at 90 degrees.

### Find the measure of x.

Bisection means to divide into 2 equal parts in the 1: 1 ratio. diagonals of a parallelogram bisect each other but not at right angles. a square is a special case of a parallelogram where the diagonals intersect at 90 degrees.

A parallelogram is a 2D polygon which has 2 sets of equal and parallel sides which are opposite to each other.

A parallelogram is a 2D polygon which has 2 sets of equal and parallel sides which are opposite to each other.

### Find the measure of angle Q.

A parallelogram is a 2D polygon which has 2 sets of equal and parallel sides which are opposite to each other.

### Find the measure of angle Q.

### What is the measure of side AB?

### What is the measure of side AB?

### The sum of angles of the given figure is _____.

By the property of polygons, we know that the sum of external angles of a polygon =360

Also,

Sum of internal angles of a polygon =( n-2) x 180

### The sum of angles of the given figure is _____.

By the property of polygons, we know that the sum of external angles of a polygon =360

Also,

Sum of internal angles of a polygon =( n-2) x 180

### Find the sum of measures of interior angles of a nonagon.

Sum of internal angles = (n-2) x 180

the sum of external angles of a polygon =360

these are properties of polygons.

### Find the sum of measures of interior angles of a nonagon.

Sum of internal angles = (n-2) x 180

the sum of external angles of a polygon =360

these are properties of polygons.

### What is the measure of A?

Properties of polygons state several rules for solving such problems. Sum of internal angles = (n-2) x 180 degrees. sum of external angles of a polygon = 360 degrees.

### What is the measure of A?

Properties of polygons state several rules for solving such problems. Sum of internal angles = (n-2) x 180 degrees. sum of external angles of a polygon = 360 degrees.