What is the Measure of Angle O in Parallelogram Lmno? 35° 75° 105° 155
Parallelograms are quadrilateral shapes with opposite sides that are equal in length and parallel to each other. In parallelogram LMNO, the measure of angle L is 35° and the measure of angle M is 75°. Using the properties of parallelograms, we can determine that the measure of angle N is also 75°.
With this information, we can deduce that the measure of angle O, being opposite to angle N, is 105°. Understanding the properties of parallelograms helps in solving for angles and sides of such geometric shapes.
Conclusion
The measure of angle O in parallelogram LMNO can be determined using the properties of interior angles. By knowing that opposite angles in a parallelogram are congruent, we can conclude that angle O is equal to 105°. Understanding the measures of angles in parallelograms helps us solve geometric problems and find missing angles effectively.