Real part = (magnitude of total impedance) x (cosine of the angle)
Imaginary part = (magnitude of total impedance) x (sine of the angle)
yes, to be exact:Angle Bisector Definition: An angle is formed by two rays with a common endpoint. The angle bisector is a ray or line segment that bisects the angle, creating two congruent angles. To construct an angle bisector you need a compass and straightedge. Bisectors are very important in identifying corresponding parts of similar triangles and in solving proofs.
the interoir angle the exterior angle and the full angle
It is dividing an angle into two equal parts.
The parts are arm vertex and ore
It is called an arm of the angle.
It is an asymptote.
You should write this in polar notation, i.e., with an angle. Visualize the imaginary axis as being 90° from the real axis. Thus, 6i = 6 (angle) 90°, that is, it has an absolute value of 6, and is at an angle of 90°. The main square root of that is equal to the square root of 6 (angle) 45°. To get the other square root, add 180° degrees to that angle (same absolute value). Now, use your calculator's polar-->rectangular conversion to separate that into real and imaginary parts (if that's what you want).
yes, to be exact:Angle Bisector Definition: An angle is formed by two rays with a common endpoint. The angle bisector is a ray or line segment that bisects the angle, creating two congruent angles. To construct an angle bisector you need a compass and straightedge. Bisectors are very important in identifying corresponding parts of similar triangles and in solving proofs.
right angle
the interoir angle the exterior angle and the full angle
It is dividing an angle into two equal parts.
The parts are arm vertex and ore
Hemisphere is the right answer
The imaginary line that cuts the earth into two equal parts is called the equator. It is an imaginary circle around the Earth that is equidistant from the North and South poles. It divides the Earth into the Northern Hemisphere and the Southern Hemisphere.
An angle bisector.
An angle bisector.
Bisecting an angle