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What is the percentage of a quadrilateral?
A quadrilateral is a 100% 4 sided shape.
The value x in the quadrilateral 100. 122. 57?
126
If three angles of a quadrilateral measure 90 100 and 120 what is the measure of the fourth angle?
50 degrees (360 degrees in a quadrilateral)
Whats the compliment of a 100 degree angle?
The compliment of a 100 degree angle is a 80 degree angle.
Three angles of a quadrilateral measure 80 100 and 55 degrees what is the measure of the fourth angle?
125°
What type of quadrilateral has a 100 degree 110 degree 80 degree and a 70 degree angle?
A trapazoid has those angles
What type of quadrilateral has two 80 degree angles and two 100 degree angles?
It is a parallelogram or a rhombus
Is it possible for each angle on a quadrilateral to measure more than 100 degree?
No because the 4 interior angles of a quadrilateral add up to 360 degrees
In isosceles triangle WXY the interior angle W measures 100 degree. What is the measure of all three interior angles of triangle WXY?
100 degree, 40 degree and 40 degree.
If an angle measures 94 degrees then it is obtuse counterexample?
A 100 degree angle is obtuse
Three angles of a quadrilateral measure 80 degrees 100 degrees and 55 degrees what is the measure of the fourth angle?
80 degree
What kind of weather is there in mt Everest?
min 15 degree max -100 degree
What is the percentage of a quadrilateral?
A quadrilateral is a 100% 4 sided shape.
What type of quadrilateral has two 80 degree angles and two 100 degree angles and why?
It could be a parallelogram because opposite angles are equal and its 4 interior angles add up to 360 degrees
One angle of an isosceles triangle measure 100 degree what are the measures of the other two angles?
40 degrees each
What are the angle measures of a 100 degree triangle?
Not possible because all triangles have a total sum of 180 degrees interior angles.
Which set of measures describes a quadrilateral that cannot be inscribed in a circle 69 103 111 77 or 52 64 128 116 or 42 64 118 136 or 100 72 80 108?
A quadrilateral can be inscribed in a circle if the opposite angles are supplementary. To determine which set of measures cannot form a cyclic quadrilateral, we calculate the sums of opposite angles for each set. The set of angles 100, 72, 80, and 108 has opposite angle pairs (100 + 80 = 180 and 72 + 108 = 180), which are supplementary. However, the other sets do not all yield supplementary pairs, with 42, 64, 118, and 136 failing this condition. Thus, 42, 64, 118, and 136 describe a quadrilateral that cannot be inscribed in a circle.
