In general, you will need to use a protractor and measure them.
To find angle o, we need more context about the relationship between angles 2, p, and o. If angle 2 and angle p are part of a triangle or a straight line, we can use properties of triangles or supplementary angles to find angle o. For example, if angles 2 and p are part of a triangle, angle o would be calculated as 180 - (angle 2 + angle p). Please provide additional information about the angles' arrangement for a specific answer.
The question cannot be answered because the point c is undefined.
To find angle M in triangle MNO, we can use the Law of Cosines. Given side lengths m = 5.6 inches, n = 9.8 inches, and angle O = 95 degrees, we can calculate the length of side o using the formula: ( o^2 = m^2 + n^2 - 2mn \cdot \cos(O) ). Once we have side o, we can apply the Law of Sines to find angle M: ( \frac{m}{\sin(M)} = \frac{o}{\sin(O)} ). After performing these calculations, angle M is approximately 34.2 degrees.
The locus of points equidistant from two intersecting lines forms two angle bisectors of the angles created by the lines. When considering points that are at a given distance from a point O, the result is the intersection of the angle bisectors with a circle (or circles) centered at O with the specified radius. This results in two arcs for each angle bisector, forming a total of four distinct points along the angle bisectors, each at the specified distance from point O.
hexagon has 6 sides. angles in any polygon is (n-2)180ohexagon- (6-2)X180=720o.therefore each angle is (total angle/6sides)each angle=(720/6)o = (120o)eachanswer = (120o)each.
o
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The question cannot be answered because the point c is undefined.
6o (360/60)
To find angle M in triangle MNO, we can use the Law of Cosines. Given side lengths m = 5.6 inches, n = 9.8 inches, and angle O = 95 degrees, we can calculate the length of side o using the formula: ( o^2 = m^2 + n^2 - 2mn \cdot \cos(O) ). Once we have side o, we can apply the Law of Sines to find angle M: ( \frac{m}{\sin(M)} = \frac{o}{\sin(O)} ). After performing these calculations, angle M is approximately 34.2 degrees.
The locus of points equidistant from two intersecting lines forms two angle bisectors of the angles created by the lines. When considering points that are at a given distance from a point O, the result is the intersection of the angle bisectors with a circle (or circles) centered at O with the specified radius. This results in two arcs for each angle bisector, forming a total of four distinct points along the angle bisectors, each at the specified distance from point O.
hexagon has 6 sides. angles in any polygon is (n-2)180ohexagon- (6-2)X180=720o.therefore each angle is (total angle/6sides)each angle=(720/6)o = (120o)eachanswer = (120o)each.
For angle L, the adjacent angle o, and its opposite angle M, are both 158 degrees. (it's a rhomboid) In a parallelogram, adjacent angles total 180 degrees (they are supplementary), since the opposite angles must be the same and there are two of each.
180
=Strait Angle- An Angle that measures exactly 180* Degrees.=<---------------o--------------->
O
This is a physic guestion . The topic is force.